@page @node Simple Data Types @chapter Simple Generic Data Types This chapter describes those of Guile's simple data types which are primarily used for their role as items of generic data. By @dfn{simple} we mean data types that are not primarily used as containers to hold other data --- i.e. pairs, lists, vectors and so on. For the documentation of such @dfn{compound} data types, see @ref{Compound Data Types}. One of the great strengths of Scheme is that there is no straightforward distinction between ``data'' and ``functionality''. For example, Guile's support for dynamic linking could be described @itemize @bullet @item either in a ``data-centric'' way, as the behaviour and properties of the ``dynamically linked object'' data type, and the operations that may be applied to instances of this type @item or in a ``functionality-centric'' way, as the set of procedures that constitute Guile's support for dynamic linking, in the context of the module system. @end itemize The contents of this chapter are, therefore, a matter of judgment. By @dfn{generic}, we mean to select those data types whose typical use as @emph{data} in a wide variety of programming contexts is more important than their use in the implementation of a particular piece of @emph{functionality}. The last section of this chapter provides references for all the data types that are documented not here but in a ``functionality-centric'' way elsewhere in the manual. @menu * Booleans:: True/false values. * Numbers:: Numerical data types. * Characters:: New character names. * Strings:: Special things about strings. * Regular Expressions:: Pattern matching and substitution. * Symbols:: Symbols. * Keywords:: Self-quoting, customizable display keywords. * Other Types:: "Functionality-centric" data types. @end menu @node Booleans @section Booleans @tpindex Booleans The two boolean values are @code{#t} for true and @code{#f} for false. Boolean values are returned by predicate procedures, such as the general equality predicates @code{eq?}, @code{eqv?} and @code{equal?} (@pxref{Equality}) and numerical and string comparison operators like @code{string=?} (@pxref{String Comparison}) and @code{<=} (@pxref{Comparison}). @lisp (<= 3 8) @result{} #t (<= 3 -3) @result{} #f (equal? "house" "houses") @result{} #f (eq? #f #f) @result{} #t @end lisp In test condition contexts like @code{if} and @code{cond} (@pxref{if cond case}), where a group of subexpressions will be evaluated only if a @var{condition} expression evaluates to ``true'', ``true'' means any value at all except @code{#f}. @lisp (if #t "yes" "no") @result{} "yes" (if 0 "yes" "no") @result{} "yes" (if #f "yes" "no") @result{} "no" @end lisp A result of this asymmetry is that typical Scheme source code more often uses @code{#f} explicitly than @code{#t}: @code{#f} is necessary to represent an @code{if} or @code{cond} false value, whereas @code{#t} is not necessary to represent an @code{if} or @code{cond} true value. It is important to note that @code{#f} is @strong{not} equivalent to any other Scheme value. In particular, @code{#f} is not the same as the number 0 (like in C and C++), and not the same as the ``empty list'' (like in some Lisp dialects). The @code{not} procedure returns the boolean inverse of its argument: @rnindex not @deffn {Scheme Procedure} not x @deffnx {C Function} scm_not (x) Return @code{#t} iff @var{x} is @code{#f}, else return @code{#f}. @end deffn The @code{boolean?} procedure is a predicate that returns @code{#t} if its argument is one of the boolean values, otherwise @code{#f}. @rnindex boolean? @deffn {Scheme Procedure} boolean? obj @deffnx {C Function} scm_boolean_p (obj) Return @code{#t} iff @var{obj} is either @code{#t} or @code{#f}. @end deffn @node Numbers @section Numerical data types @tpindex Numbers Guile supports a rich ``tower'' of numerical types --- integer, rational, real and complex --- and provides an extensive set of mathematical and scientific functions for operating on numerical data. This section of the manual documents those types and functions. You may also find it illuminating to read R5RS's presentation of numbers in Scheme, which is particularly clear and accessible: see @xref{Numbers,,,r5rs}. @menu * Numerical Tower:: Scheme's numerical "tower". * Integers:: Whole numbers. * Reals and Rationals:: Real and rational numbers. * Complex Numbers:: Complex numbers. * Exactness:: Exactness and inexactness. * Number Syntax:: Read syntax for numerical data. * Integer Operations:: Operations on integer values. * Comparison:: Comparison predicates. * Conversion:: Converting numbers to and from strings. * Complex:: Complex number operations. * Arithmetic:: Arithmetic functions. * Scientific:: Scientific functions. * Primitive Numerics:: Primitive numeric functions. * Bitwise Operations:: Logical AND, OR, NOT, and so on. * Random:: Random number generation. @end menu @node Numerical Tower @subsection Scheme's Numerical ``Tower'' @rnindex number? Scheme's numerical ``tower'' consists of the following categories of numbers: @itemize @bullet @item integers (whole numbers) @item rationals (the set of numbers that can be expressed as P/Q where P and Q are integers) @item real numbers (the set of numbers that describes all possible positions along a one dimensional line) @item complex numbers (the set of numbers that describes all possible positions in a two dimensional space) @end itemize It is called a tower because each category ``sits on'' the one that follows it, in the sense that every integer is also a rational, every rational is also real, and every real number is also a complex number (but with zero imaginary part). Of these, Guile implements integers, reals and complex numbers as distinct types. Rationals are implemented as regards the read syntax for rational numbers that is specified by R5RS, but are immediately converted by Guile to the corresponding real number. The @code{number?} predicate may be applied to any Scheme value to discover whether the value is any of the supported numerical types. @deffn {Scheme Procedure} number? obj @deffnx {C Function} scm_number_p (obj) Return @code{#t} if @var{obj} is any kind of number, else @code{#f}. @end deffn For example: @lisp (number? 3) @result{} #t (number? "hello there!") @result{} #f (define pi 3.141592654) (number? pi) @result{} #t @end lisp The next few subsections document each of Guile's numerical data types in detail. @node Integers @subsection Integers @tpindex Integer numbers @rnindex integer? Integers are whole numbers, that is numbers with no fractional part, such as 2, 83 and -3789. Integers in Guile can be arbitrarily big, as shown by the following example. @lisp (define (factorial n) (let loop ((n n) (product 1)) (if (= n 0) product (loop (- n 1) (* product n))))) (factorial 3) @result{} 6 (factorial 20) @result{} 2432902008176640000 (- (factorial 45)) @result{} -119622220865480194561963161495657715064383733760000000000 @end lisp Readers whose background is in programming languages where integers are limited by the need to fit into just 4 or 8 bytes of memory may find this surprising, or suspect that Guile's representation of integers is inefficient. In fact, Guile achieves a near optimal balance of convenience and efficiency by using the host computer's native representation of integers where possible, and a more general representation where the required number does not fit in the native form. Conversion between these two representations is automatic and completely invisible to the Scheme level programmer. The infinities @code{+inf.0} and @code{-inf.0} are considered to be inexact integers. They are explained in detail in the next section, together with reals and rationals. @c REFFIXME Maybe point here to discussion of handling immediates/bignums @c on the C level, where the conversion is not so automatic - NJ @deffn {Scheme Procedure} integer? x @deffnx {C Function} scm_integer_p (x) Return @code{#t} if @var{x} is an integer number, else @code{#f}. @lisp (integer? 487) @result{} #t (integer? -3.4) @result{} #f (integer? +inf.0) @result{} #t @end lisp @end deffn @node Reals and Rationals @subsection Real and Rational Numbers @tpindex Real numbers @tpindex Rational numbers @rnindex real? @rnindex rational? Mathematically, the real numbers are the set of numbers that describe all possible points along a continuous, infinite, one-dimensional line. The rational numbers are the set of all numbers that can be written as fractions P/Q, where P and Q are integers. All rational numbers are also real, but there are real numbers that are not rational, for example the square root of 2, and pi. Guile represents both real and rational numbers approximately using a floating point encoding with limited precision. Even though the actual encoding is in binary, it may be helpful to think of it as a decimal number with a limited number of significant figures and a decimal point somewhere, since this corresponds to the standard notation for non-whole numbers. For example: @lisp 0.34 -0.00000142857931198 -5648394822220000000000.0 4.0 @end lisp The limited precision of Guile's encoding means that any ``real'' number in Guile can be written in a rational form, by multiplying and then dividing by sufficient powers of 10 (or in fact, 2). For example, @code{-0.00000142857931198} is the same as @code{142857931198} divided by @code{100000000000000000}. In Guile's current incarnation, therefore, the @code{rational?} and @code{real?} predicates are equivalent. Another aspect of this equivalence is that Guile currently does not preserve the exactness that is possible with rational arithmetic. If such exactness is needed, it is of course possible to implement exact rational arithmetic at the Scheme level using Guile's arbitrary size integers. A planned future revision of Guile's numerical tower will make it possible to implement exact representations and arithmetic for both rational numbers and real irrational numbers such as square roots, and in such a way that the new kinds of number integrate seamlessly with those that are already implemented. Dividing by an exact zero leads to a error message, as one might expect. However, dividing by an inexact zero does not produce an error. Instead, the result of the division is either plus or minus infinity, depending on the sign of the divided number. The infinities are written @samp{+inf.0} and @samp{-inf.0}, respectibly. This syntax is also recognized by @code{read} as an extension to the usual Scheme syntax. Dividing zero by zero yields something that is not a number at all: @samp{+nan.0}. This is the special 'not a number' value. On platforms that follow IEEE 754 for their floating point arithmetic, the @samp{+inf.0}, @samp{-inf.0}, and @samp{+nan.0} values are implemented using the corresponding IEEE 754 values. They behave in arithmetic operations like IEEE 754 describes it, i.e., @code{(= +nan.0 +nan.0) @result{#f}}. The infinities are inexact integers and are considered to be both even and odd. While @samp{+nan.0} is not @code{=} to itself, it is @code{eqv?} to itself. To test for the special values, use the functions @code{inf?} and @code{nan?}. @deffn {Scheme Procedure} real? obj @deffnx {C Function} scm_real_p (obj) Return @code{#t} if @var{obj} is a real number, else @code{#f}. Note that the sets of integer and rational values form subsets of the set of real numbers, so the predicate will also be fulfilled if @var{obj} is an integer number or a rational number. @end deffn @deffn {Scheme Procedure} rational? x @deffnx {C Function} scm_real_p (x) Return @code{#t} if @var{x} is a rational number, @code{#f} otherwise. Note that the set of integer values forms a subset of the set of rational numbers, i. e. the predicate will also be fulfilled if @var{x} is an integer number. Real numbers will also satisfy this predicate, because of their limited precision. @end deffn @deffn {Scheme Procedure} inf? x Return @code{#t} if @var{x} is either @samp{+inf.0} or @samp{-inf.0}, @code{#f} otherwise. @end deffn @deffn {Scheme Procedure} nan? x Return @code{#t} if @var{x} is @samp{+nan.0}, @code{#f} otherwise. @end deffn @node Complex Numbers @subsection Complex Numbers @tpindex Complex numbers @rnindex complex? Complex numbers are the set of numbers that describe all possible points in a two-dimensional space. The two coordinates of a particular point in this space are known as the @dfn{real} and @dfn{imaginary} parts of the complex number that describes that point. In Guile, complex numbers are written in rectangular form as the sum of their real and imaginary parts, using the symbol @code{i} to indicate the imaginary part. @lisp 3+4i @result{} 3.0+4.0i (* 3-8i 2.3+0.3i) @result{} 9.3-17.5i @end lisp Guile represents a complex number as a pair of numbers both of which are real, so the real and imaginary parts of a complex number have the same properties of inexactness and limited precision as single real numbers. @deffn {Scheme Procedure} complex? x @deffnx {C Function} scm_number_p (x) Return @code{#t} if @var{x} is a complex number, @code{#f} otherwise. Note that the sets of real, rational and integer values form subsets of the set of complex numbers, i. e. the predicate will also be fulfilled if @var{x} is a real, rational or integer number. @end deffn @node Exactness @subsection Exact and Inexact Numbers @tpindex Exact numbers @tpindex Inexact numbers @rnindex exact? @rnindex inexact? @rnindex exact->inexact @rnindex inexact->exact R5RS requires that a calculation involving inexact numbers always produces an inexact result. To meet this requirement, Guile distinguishes between an exact integer value such as @code{5} and the corresponding inexact real value which, to the limited precision available, has no fractional part, and is printed as @code{5.0}. Guile will only convert the latter value to the former when forced to do so by an invocation of the @code{inexact->exact} procedure. @deffn {Scheme Procedure} exact? x @deffnx {C Function} scm_exact_p (x) Return @code{#t} if @var{x} is an exact number, @code{#f} otherwise. @end deffn @deffn {Scheme Procedure} inexact? x @deffnx {C Function} scm_inexact_p (x) Return @code{#t} if @var{x} is an inexact number, @code{#f} else. @end deffn @deffn {Scheme Procedure} inexact->exact z @deffnx {C Function} scm_inexact_to_exact (z) Return an exact number that is numerically closest to @var{z}. @end deffn @c begin (texi-doc-string "guile" "exact->inexact") @deffn {Scheme Procedure} exact->inexact z Convert the number @var{z} to its inexact representation. @end deffn @node Number Syntax @subsection Read Syntax for Numerical Data The read syntax for integers is a string of digits, optionally preceded by a minus or plus character, a code indicating the base in which the integer is encoded, and a code indicating whether the number is exact or inexact. The supported base codes are: @itemize @bullet @item @code{#b}, @code{#B} --- the integer is written in binary (base 2) @item @code{#o}, @code{#O} --- the integer is written in octal (base 8) @item @code{#d}, @code{#D} --- the integer is written in decimal (base 10) @item @code{#x}, @code{#X} --- the integer is written in hexadecimal (base 16). @end itemize If the base code is omitted, the integer is assumed to be decimal. The following examples show how these base codes are used. @lisp -13 @result{} -13 #d-13 @result{} -13 #x-13 @result{} -19 #b+1101 @result{} 13 #o377 @result{} 255 @end lisp The codes for indicating exactness (which can, incidentally, be applied to all numerical values) are: @itemize @bullet @item @code{#e}, @code{#E} --- the number is exact @item @code{#i}, @code{#I} --- the number is inexact. @end itemize If the exactness indicator is omitted, the integer is assumed to be exact, since Guile's internal representation for integers is always exact. Real numbers have limited precision similar to the precision of the @code{double} type in C. A consequence of the limited precision is that all real numbers in Guile are also rational, since any number R with a limited number of decimal places, say N, can be made into an integer by multiplying by 10^N. Guile also understands the syntax @samp{+inf.0} and @samp{-inf.0} for plus and minus infinity, respectively. The value must be written exactly as shown, that is, the always must have a sign and exactly one zero digit after the decimal point. It also understands @samp{+nan.0} and @samp{-nan.0} for the special 'not-a-number' value. The sign is ignored for 'not-a-number' and the value is always printed as @samp{+nan.0}. @node Integer Operations @subsection Operations on Integer Values @rnindex odd? @rnindex even? @rnindex quotient @rnindex remainder @rnindex modulo @rnindex gcd @rnindex lcm @deffn {Scheme Procedure} odd? n @deffnx {C Function} scm_odd_p (n) Return @code{#t} if @var{n} is an odd number, @code{#f} otherwise. @end deffn @deffn {Scheme Procedure} even? n @deffnx {C Function} scm_even_p (n) Return @code{#t} if @var{n} is an even number, @code{#f} otherwise. @end deffn @c begin (texi-doc-string "guile" "quotient") @deffn {Scheme Procedure} quotient Return the quotient of the numbers @var{x} and @var{y}. @end deffn @c begin (texi-doc-string "guile" "remainder") @deffn {Scheme Procedure} remainder Return the remainder of the numbers @var{x} and @var{y}. @lisp (remainder 13 4) @result{} 1 (remainder -13 4) @result{} -1 @end lisp @end deffn @c begin (texi-doc-string "guile" "modulo") @deffn {Scheme Procedure} modulo Return the modulo of the numbers @var{x} and @var{y}. @lisp (modulo 13 4) @result{} 1 (modulo -13 4) @result{} 3 @end lisp @end deffn @c begin (texi-doc-string "guile" "gcd") @deffn {Scheme Procedure} gcd Return the greatest common divisor of all arguments. If called without arguments, 0 is returned. @end deffn @c begin (texi-doc-string "guile" "lcm") @deffn {Scheme Procedure} lcm Return the least common multiple of the arguments. If called without arguments, 1 is returned. @end deffn @node Comparison @subsection Comparison Predicates @rnindex zero? @rnindex positive? @rnindex negative? @c begin (texi-doc-string "guile" "=") @deffn {Scheme Procedure} = Return @code{#t} if all parameters are numerically equal. @end deffn @c begin (texi-doc-string "guile" "<") @deffn {Scheme Procedure} < Return @code{#t} if the list of parameters is monotonically increasing. @end deffn @c begin (texi-doc-string "guile" ">") @deffn {Scheme Procedure} > Return @code{#t} if the list of parameters is monotonically decreasing. @end deffn @c begin (texi-doc-string "guile" "<=") @deffn {Scheme Procedure} <= Return @code{#t} if the list of parameters is monotonically non-decreasing. @end deffn @c begin (texi-doc-string "guile" ">=") @deffn {Scheme Procedure} >= Return @code{#t} if the list of parameters is monotonically non-increasing. @end deffn @c begin (texi-doc-string "guile" "zero?") @deffn {Scheme Procedure} zero? Return @code{#t} if @var{z} is an exact or inexact number equal to zero. @end deffn @c begin (texi-doc-string "guile" "positive?") @deffn {Scheme Procedure} positive? Return @code{#t} if @var{x} is an exact or inexact number greater than zero. @end deffn @c begin (texi-doc-string "guile" "negative?") @deffn {Scheme Procedure} negative? Return @code{#t} if @var{x} is an exact or inexact number less than zero. @end deffn @node Conversion @subsection Converting Numbers To and From Strings @rnindex number->string @rnindex string->number @deffn {Scheme Procedure} number->string n [radix] @deffnx {C Function} scm_number_to_string (n, radix) Return a string holding the external representation of the number @var{n} in the given @var{radix}. If @var{n} is inexact, a radix of 10 will be used. @end deffn @deffn {Scheme Procedure} string->number string [radix] @deffnx {C Function} scm_string_to_number (string, radix) Return a number of the maximally precise representation expressed by the given @var{string}. @var{radix} must be an exact integer, either 2, 8, 10, or 16. If supplied, @var{radix} is a default radix that may be overridden by an explicit radix prefix in @var{string} (e.g. "#o177"). If @var{radix} is not supplied, then the default radix is 10. If string is not a syntactically valid notation for a number, then @code{string->number} returns @code{#f}. @end deffn @node Complex @subsection Complex Number Operations @rnindex make-rectangular @rnindex make-polar @rnindex real-part @rnindex imag-part @rnindex magnitude @rnindex angle @deffn {Scheme Procedure} make-rectangular real imaginary @deffnx {C Function} scm_make_rectangular (real, imaginary) Return a complex number constructed of the given @var{real} and @var{imaginary} parts. @end deffn @deffn {Scheme Procedure} make-polar x y @deffnx {C Function} scm_make_polar (x, y) Return the complex number @var{x} * e^(i * @var{y}). @end deffn @c begin (texi-doc-string "guile" "real-part") @deffn {Scheme Procedure} real-part Return the real part of the number @var{z}. @end deffn @c begin (texi-doc-string "guile" "imag-part") @deffn {Scheme Procedure} imag-part Return the imaginary part of the number @var{z}. @end deffn @c begin (texi-doc-string "guile" "magnitude") @deffn {Scheme Procedure} magnitude Return the magnitude of the number @var{z}. This is the same as @code{abs} for real arguments, but also allows complex numbers. @end deffn @c begin (texi-doc-string "guile" "angle") @deffn {Scheme Procedure} angle Return the angle of the complex number @var{z}. @end deffn @node Arithmetic @subsection Arithmetic Functions @rnindex max @rnindex min @rnindex + @rnindex * @rnindex - @rnindex / @rnindex abs @rnindex floor @rnindex ceiling @rnindex truncate @rnindex round @c begin (texi-doc-string "guile" "+") @deffn {Scheme Procedure} + z1 @dots{} Return the sum of all parameter values. Return 0 if called without any parameters. @end deffn @c begin (texi-doc-string "guile" "-") @deffn {Scheme Procedure} - z1 z2 @dots{} If called with one argument @var{z1}, -@var{z1} is returned. Otherwise the sum of all but the first argument are subtracted from the first argument. @end deffn @c begin (texi-doc-string "guile" "*") @deffn {Scheme Procedure} * z1 @dots{} Return the product of all arguments. If called without arguments, 1 is returned. @end deffn @c begin (texi-doc-string "guile" "/") @deffn {Scheme Procedure} / z1 z2 @dots{} Divide the first argument by the product of the remaining arguments. If called with one argument @var{z1}, 1/@var{z1} is returned. @end deffn @c begin (texi-doc-string "guile" "abs") @deffn {Scheme Procedure} abs x @deffnx {C Function} scm_abs (x) Return the absolute value of @var{x}. @var{x} must be a number with zero imaginary part. To calculate the magnitude of a complex number, use @code{magnitude} instead. @end deffn @c begin (texi-doc-string "guile" "max") @deffn {Scheme Procedure} max x1 x2 @dots{} Return the maximum of all parameter values. @end deffn @c begin (texi-doc-string "guile" "min") @deffn {Scheme Procedure} min x1 x2 @dots{} Return the minimum of all parameter values. @end deffn @c begin (texi-doc-string "guile" "truncate") @deffn {Scheme Procedure} truncate Round the inexact number @var{x} towards zero. @end deffn @c begin (texi-doc-string "guile" "round") @deffn {Scheme Procedure} round x Round the inexact number @var{x} towards zero. @end deffn @c begin (texi-doc-string "guile" "floor") @deffn {Scheme Procedure} floor x Round the number @var{x} towards minus infinity. @end deffn @c begin (texi-doc-string "guile" "ceiling") @deffn {Scheme Procedure} ceiling x Round the number @var{x} towards infinity. @end deffn For the @code{truncate} and @code{round} procedures, the Guile library exports equivalent C functions, but taking and returning arguments of type @code{double} rather than the usual @code{SCM}. @deftypefn {C Function} double scm_truncate (double x) @deftypefnx {C Function} double scm_round (double x) @end deftypefn For @code{floor} and @code{ceiling}, the equivalent C functions are @code{floor} and @code{ceil} from the standard mathematics library (which also take and return @code{double} arguments). @node Scientific @subsection Scientific Functions The following procedures accept any kind of number as arguments, including complex numbers. @rnindex sqrt @c begin (texi-doc-string "guile" "sqrt") @deffn {Scheme Procedure} sqrt z Return the square root of @var{z}. @end deffn @rnindex expt @c begin (texi-doc-string "guile" "expt") @deffn {Scheme Procedure} expt z1 z2 Return @var{z1} raised to the power of @var{z2}. @end deffn @rnindex sin @c begin (texi-doc-string "guile" "sin") @deffn {Scheme Procedure} sin z Return the sine of @var{z}. @end deffn @rnindex cos @c begin (texi-doc-string "guile" "cos") @deffn {Scheme Procedure} cos z Return the cosine of @var{z}. @end deffn @rnindex tan @c begin (texi-doc-string "guile" "tan") @deffn {Scheme Procedure} tan z Return the tangent of @var{z}. @end deffn @rnindex asin @c begin (texi-doc-string "guile" "asin") @deffn {Scheme Procedure} asin z Return the arcsine of @var{z}. @end deffn @rnindex acos @c begin (texi-doc-string "guile" "acos") @deffn {Scheme Procedure} acos z Return the arccosine of @var{z}. @end deffn @rnindex atan @c begin (texi-doc-string "guile" "atan") @deffn {Scheme Procedure} atan z Return the arctangent of @var{z}. @end deffn @rnindex exp @c begin (texi-doc-string "guile" "exp") @deffn {Scheme Procedure} exp z Return e to the power of @var{z}, where e is the base of natural logarithms (2.71828@dots{}). @end deffn @rnindex log @c begin (texi-doc-string "guile" "log") @deffn {Scheme Procedure} log z Return the natural logarithm of @var{z}. @end deffn @c begin (texi-doc-string "guile" "log10") @deffn {Scheme Procedure} log10 z Return the base 10 logarithm of @var{z}. @end deffn @c begin (texi-doc-string "guile" "sinh") @deffn {Scheme Procedure} sinh z Return the hyperbolic sine of @var{z}. @end deffn @c begin (texi-doc-string "guile" "cosh") @deffn {Scheme Procedure} cosh z Return the hyperbolic cosine of @var{z}. @end deffn @c begin (texi-doc-string "guile" "tanh") @deffn {Scheme Procedure} tanh z Return the hyperbolic tangent of @var{z}. @end deffn @c begin (texi-doc-string "guile" "asinh") @deffn {Scheme Procedure} asinh z Return the hyperbolic arcsine of @var{z}. @end deffn @c begin (texi-doc-string "guile" "acosh") @deffn {Scheme Procedure} acosh z Return the hyperbolic arccosine of @var{z}. @end deffn @c begin (texi-doc-string "guile" "atanh") @deffn {Scheme Procedure} atanh z Return the hyperbolic arctangent of @var{z}. @end deffn @node Primitive Numerics @subsection Primitive Numeric Functions Many of Guile's numeric procedures which accept any kind of numbers as arguments, including complex numbers, are implemented as Scheme procedures that use the following real number-based primitives. These primitives signal an error if they are called with complex arguments. @c begin (texi-doc-string "guile" "$abs") @deffn {Scheme Procedure} $abs x Return the absolute value of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$sqrt") @deffn {Scheme Procedure} $sqrt x Return the square root of @var{x}. @end deffn @deffn {Scheme Procedure} $expt x y @deffnx {C Function} scm_sys_expt (x, y) Return @var{x} raised to the power of @var{y}. This procedure does not accept complex arguments. @end deffn @c begin (texi-doc-string "guile" "$sin") @deffn {Scheme Procedure} $sin x Return the sine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$cos") @deffn {Scheme Procedure} $cos x Return the cosine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$tan") @deffn {Scheme Procedure} $tan x Return the tangent of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$asin") @deffn {Scheme Procedure} $asin x Return the arcsine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$acos") @deffn {Scheme Procedure} $acos x Return the arccosine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$atan") @deffn {Scheme Procedure} $atan x Return the arctangent of @var{x} in the range -PI/2 to PI/2. @end deffn @deffn {Scheme Procedure} $atan2 x y @deffnx {C Function} scm_sys_atan2 (x, y) Return the arc tangent of the two arguments @var{x} and @var{y}. This is similar to calculating the arc tangent of @var{x} / @var{y}, except that the signs of both arguments are used to determine the quadrant of the result. This procedure does not accept complex arguments. @end deffn @c begin (texi-doc-string "guile" "$exp") @deffn {Scheme Procedure} $exp x Return e to the power of @var{x}, where e is the base of natural logarithms (2.71828@dots{}). @end deffn @c begin (texi-doc-string "guile" "$log") @deffn {Scheme Procedure} $log x Return the natural logarithm of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$sinh") @deffn {Scheme Procedure} $sinh x Return the hyperbolic sine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$cosh") @deffn {Scheme Procedure} $cosh x Return the hyperbolic cosine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$tanh") @deffn {Scheme Procedure} $tanh x Return the hyperbolic tangent of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$asinh") @deffn {Scheme Procedure} $asinh x Return the hyperbolic arcsine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$acosh") @deffn {Scheme Procedure} $acosh x Return the hyperbolic arccosine of @var{x}. @end deffn @c begin (texi-doc-string "guile" "$atanh") @deffn {Scheme Procedure} $atanh x Return the hyperbolic arctangent of @var{x}. @end deffn For the hyperbolic arc-functions, the Guile library exports C functions corresponding to these Scheme procedures, but taking and returning arguments of type @code{double} rather than the usual @code{SCM}. @deftypefn {C Function} double scm_asinh (double x) @deftypefnx {C Function} double scm_acosh (double x) @deftypefnx {C Function} double scm_atanh (double x) Return the hyperbolic arcsine, arccosine or arctangent of @var{x} respectively. @end deftypefn For all the other Scheme procedures above, except @code{expt} and @code{atan2} (whose entries specifically mention an equivalent C function), the equivalent C functions are those provided by the standard mathematics library. The mapping is as follows. @multitable {xx} {Scheme Procedure} {C Function} @item @tab Scheme Procedure @tab C Function @item @tab @code{$abs} @tab @code{fabs} @item @tab @code{$sqrt} @tab @code{sqrt} @item @tab @code{$sin} @tab @code{sin} @item @tab @code{$cos} @tab @code{cos} @item @tab @code{$tan} @tab @code{tan} @item @tab @code{$asin} @tab @code{asin} @item @tab @code{$acos} @tab @code{acos} @item @tab @code{$atan} @tab @code{atan} @item @tab @code{$exp} @tab @code{exp} @item @tab @code{$log} @tab @code{log} @item @tab @code{$sinh} @tab @code{sinh} @item @tab @code{$cosh} @tab @code{cosh} @item @tab @code{$tanh} @tab @code{tanh} @end multitable @noindent Naturally, these C functions expect and return @code{double} arguments. @node Bitwise Operations @subsection Bitwise Operations @deffn {Scheme Procedure} logand n1 n2 Return the bitwise AND of the integer arguments. @lisp (logand) @result{} -1 (logand 7) @result{} 7 (logand #b111 #b011 #b001) @result{} 1 @end lisp @end deffn @deffn {Scheme Procedure} logior n1 n2 Return the bitwise OR of the integer arguments. @lisp (logior) @result{} 0 (logior 7) @result{} 7 (logior #b000 #b001 #b011) @result{} 3 @end lisp @end deffn @deffn {Scheme Procedure} logxor n1 n2 Return the bitwise XOR of the integer arguments. A bit is set in the result if it is set in an odd number of arguments. @lisp (logxor) @result{} 0 (logxor 7) @result{} 7 (logxor #b000 #b001 #b011) @result{} 2 (logxor #b000 #b001 #b011 #b011) @result{} 1 @end lisp @end deffn @deffn {Scheme Procedure} lognot n @deffnx {C Function} scm_lognot (n) Return the integer which is the 2s-complement of the integer argument. @lisp (number->string (lognot #b10000000) 2) @result{} "-10000001" (number->string (lognot #b0) 2) @result{} "-1" @end lisp @end deffn @deffn {Scheme Procedure} logtest j k @deffnx {C Function} scm_logtest (j, k) @lisp (logtest j k) @equiv{} (not (zero? (logand j k))) (logtest #b0100 #b1011) @result{} #f (logtest #b0100 #b0111) @result{} #t @end lisp @end deffn @deffn {Scheme Procedure} logbit? index j @deffnx {C Function} scm_logbit_p (index, j) @lisp (logbit? index j) @equiv{} (logtest (integer-expt 2 index) j) (logbit? 0 #b1101) @result{} #t (logbit? 1 #b1101) @result{} #f (logbit? 2 #b1101) @result{} #t (logbit? 3 #b1101) @result{} #t (logbit? 4 #b1101) @result{} #f @end lisp @end deffn @deffn {Scheme Procedure} ash n cnt @deffnx {C Function} scm_ash (n, cnt) The function ash performs an arithmetic shift left by @var{cnt} bits (or shift right, if @var{cnt} is negative). 'Arithmetic' means, that the function does not guarantee to keep the bit structure of @var{n}, but rather guarantees that the result will always be rounded towards minus infinity. Therefore, the results of ash and a corresponding bitwise shift will differ if @var{n} is negative. Formally, the function returns an integer equivalent to @code{(inexact->exact (floor (* @var{n} (expt 2 @var{cnt}))))}. @lisp (number->string (ash #b1 3) 2) @result{} "1000" (number->string (ash #b1010 -1) 2) @result{} "101" @end lisp @end deffn @deffn {Scheme Procedure} logcount n @deffnx {C Function} scm_logcount (n) Return the number of bits in integer @var{n}. If integer is positive, the 1-bits in its binary representation are counted. If negative, the 0-bits in its two's-complement binary representation are counted. If 0, 0 is returned. @lisp (logcount #b10101010) @result{} 4 (logcount 0) @result{} 0 (logcount -2) @result{} 1 @end lisp @end deffn @deffn {Scheme Procedure} integer-length n @deffnx {C Function} scm_integer_length (n) Return the number of bits necessary to represent @var{n}. @lisp (integer-length #b10101010) @result{} 8 (integer-length 0) @result{} 0 (integer-length #b1111) @result{} 4 @end lisp @end deffn @deffn {Scheme Procedure} integer-expt n k @deffnx {C Function} scm_integer_expt (n, k) Return @var{n} raised to the non-negative integer exponent @var{k}. @lisp (integer-expt 2 5) @result{} 32 (integer-expt -3 3) @result{} -27 @end lisp @end deffn @deffn {Scheme Procedure} bit-extract n start end @deffnx {C Function} scm_bit_extract (n, start, end) Return the integer composed of the @var{start} (inclusive) through @var{end} (exclusive) bits of @var{n}. The @var{start}th bit becomes the 0-th bit in the result. @lisp (number->string (bit-extract #b1101101010 0 4) 2) @result{} "1010" (number->string (bit-extract #b1101101010 4 9) 2) @result{} "10110" @end lisp @end deffn @node Random @subsection Random Number Generation @deffn {Scheme Procedure} copy-random-state [state] @deffnx {C Function} scm_copy_random_state (state) Return a copy of the random state @var{state}. @end deffn @deffn {Scheme Procedure} random n [state] @deffnx {C Function} scm_random (n, state) Return a number in [0, N). Accepts a positive integer or real n and returns a number of the same type between zero (inclusive) and N (exclusive). The values returned have a uniform distribution. The optional argument @var{state} must be of the type produced by @code{seed->random-state}. It defaults to the value of the variable @var{*random-state*}. This object is used to maintain the state of the pseudo-random-number generator and is altered as a side effect of the random operation. @end deffn @deffn {Scheme Procedure} random:exp [state] @deffnx {C Function} scm_random_exp (state) Return an inexact real in an exponential distribution with mean 1. For an exponential distribution with mean u use (* u (random:exp)). @end deffn @deffn {Scheme Procedure} random:hollow-sphere! v [state] @deffnx {C Function} scm_random_hollow_sphere_x (v, state) Fills vect with inexact real random numbers the sum of whose squares is equal to 1.0. Thinking of vect as coordinates in space of dimension n = (vector-length vect), the coordinates are uniformly distributed over the surface of the unit n-sphere. @end deffn @deffn {Scheme Procedure} random:normal [state] @deffnx {C Function} scm_random_normal (state) Return an inexact real in a normal distribution. The distribution used has mean 0 and standard deviation 1. For a normal distribution with mean m and standard deviation d use @code{(+ m (* d (random:normal)))}. @end deffn @deffn {Scheme Procedure} random:normal-vector! v [state] @deffnx {C Function} scm_random_normal_vector_x (v, state) Fills vect with inexact real random numbers that are independent and standard normally distributed (i.e., with mean 0 and variance 1). @end deffn @deffn {Scheme Procedure} random:solid-sphere! v [state] @deffnx {C Function} scm_random_solid_sphere_x (v, state) Fills vect with inexact real random numbers the sum of whose squares is less than 1.0. Thinking of vect as coordinates in space of dimension n = (vector-length vect), the coordinates are uniformly distributed within the unit n-sphere. The sum of the squares of the numbers is returned. @end deffn @deffn {Scheme Procedure} random:uniform [state] @deffnx {C Function} scm_random_uniform (state) Return a uniformly distributed inexact real random number in [0,1). @end deffn @deffn {Scheme Procedure} seed->random-state seed @deffnx {C Function} scm_seed_to_random_state (seed) Return a new random state using @var{seed}. @end deffn @node Characters @section Characters @tpindex Characters Most of the characters in the ASCII character set may be referred to by name: for example, @code{#\tab}, @code{#\esc}, @code{#\stx}, and so on. The following table describes the ASCII names for each character. @multitable @columnfractions .25 .25 .25 .25 @item 0 = @code{#\nul} @tab 1 = @code{#\soh} @tab 2 = @code{#\stx} @tab 3 = @code{#\etx} @item 4 = @code{#\eot} @tab 5 = @code{#\enq} @tab 6 = @code{#\ack} @tab 7 = @code{#\bel} @item 8 = @code{#\bs} @tab 9 = @code{#\ht} @tab 10 = @code{#\nl} @tab 11 = @code{#\vt} @item 12 = @code{#\np} @tab 13 = @code{#\cr} @tab 14 = @code{#\so} @tab 15 = @code{#\si} @item 16 = @code{#\dle} @tab 17 = @code{#\dc1} @tab 18 = @code{#\dc2} @tab 19 = @code{#\dc3} @item 20 = @code{#\dc4} @tab 21 = @code{#\nak} @tab 22 = @code{#\syn} @tab 23 = @code{#\etb} @item 24 = @code{#\can} @tab 25 = @code{#\em} @tab 26 = @code{#\sub} @tab 27 = @code{#\esc} @item 28 = @code{#\fs} @tab 29 = @code{#\gs} @tab 30 = @code{#\rs} @tab 31 = @code{#\us} @item 32 = @code{#\sp} @end multitable The @code{delete} character (octal 177) may be referred to with the name @code{#\del}. Several characters have more than one name: @itemize @bullet @item @code{#\space}, @code{#\sp} @item @code{#\newline}, @code{#\nl} @item @code{#\tab}, @code{#\ht} @item @code{#\backspace}, @code{#\bs} @item @code{#\return}, @code{#\cr} @item @code{#\page}, @code{#\np} @item @code{#\null}, @code{#\nul} @end itemize @rnindex char? @deffn {Scheme Procedure} char? x @deffnx {C Function} scm_char_p (x) Return @code{#t} iff @var{x} is a character, else @code{#f}. @end deffn @rnindex char=? @deffn {Scheme Procedure} char=? x y Return @code{#t} iff @var{x} is the same character as @var{y}, else @code{#f}. @end deffn @rnindex char? @deffn {Scheme Procedure} char>? x y Return @code{#t} iff @var{x} is greater than @var{y} in the ASCII sequence, else @code{#f}. @end deffn @rnindex char>=? @deffn {Scheme Procedure} char>=? x y Return @code{#t} iff @var{x} is greater than or equal to @var{y} in the ASCII sequence, else @code{#f}. @end deffn @rnindex char-ci=? @deffn {Scheme Procedure} char-ci=? x y Return @code{#t} iff @var{x} is the same character as @var{y} ignoring case, else @code{#f}. @end deffn @rnindex char-ci? @deffn {Scheme Procedure} char-ci>? x y Return @code{#t} iff @var{x} is greater than @var{y} in the ASCII sequence ignoring case, else @code{#f}. @end deffn @rnindex char-ci>=? @deffn {Scheme Procedure} char-ci>=? x y Return @code{#t} iff @var{x} is greater than or equal to @var{y} in the ASCII sequence ignoring case, else @code{#f}. @end deffn @rnindex char-alphabetic? @deffn {Scheme Procedure} char-alphabetic? chr @deffnx {C Function} scm_char_alphabetic_p (chr) Return @code{#t} iff @var{chr} is alphabetic, else @code{#f}. Alphabetic means the same thing as the isalpha C library function. @end deffn @rnindex char-numeric? @deffn {Scheme Procedure} char-numeric? chr @deffnx {C Function} scm_char_numeric_p (chr) Return @code{#t} iff @var{chr} is numeric, else @code{#f}. Numeric means the same thing as the isdigit C library function. @end deffn @rnindex char-whitespace? @deffn {Scheme Procedure} char-whitespace? chr @deffnx {C Function} scm_char_whitespace_p (chr) Return @code{#t} iff @var{chr} is whitespace, else @code{#f}. Whitespace means the same thing as the isspace C library function. @end deffn @rnindex char-upper-case? @deffn {Scheme Procedure} char-upper-case? chr @deffnx {C Function} scm_char_upper_case_p (chr) Return @code{#t} iff @var{chr} is uppercase, else @code{#f}. Uppercase means the same thing as the isupper C library function. @end deffn @rnindex char-lower-case? @deffn {Scheme Procedure} char-lower-case? chr @deffnx {C Function} scm_char_lower_case_p (chr) Return @code{#t} iff @var{chr} is lowercase, else @code{#f}. Lowercase means the same thing as the islower C library function. @end deffn @deffn {Scheme Procedure} char-is-both? chr @deffnx {C Function} scm_char_is_both_p (chr) Return @code{#t} iff @var{chr} is either uppercase or lowercase, else @code{#f}. Uppercase and lowercase are as defined by the isupper and islower C library functions. @end deffn @rnindex char->integer @deffn {Scheme Procedure} char->integer chr @deffnx {C Function} scm_char_to_integer (chr) Return the number corresponding to ordinal position of @var{chr} in the ASCII sequence. @end deffn @rnindex integer->char @deffn {Scheme Procedure} integer->char n @deffnx {C Function} scm_integer_to_char (n) Return the character at position @var{n} in the ASCII sequence. @end deffn @rnindex char-upcase @deffn {Scheme Procedure} char-upcase chr @deffnx {C Function} scm_char_upcase (chr) Return the uppercase character version of @var{chr}. @end deffn @rnindex char-downcase @deffn {Scheme Procedure} char-downcase chr @deffnx {C Function} scm_char_downcase (chr) Return the lowercase character version of @var{chr}. @end deffn @node Strings @section Strings @tpindex Strings Strings are fixed-length sequences of characters. They can be created by calling constructor procedures, but they can also literally get entered at the REPL or in Scheme source files. Guile provides a rich set of string processing procedures, because text handling is very important when Guile is used as a scripting language. Strings always carry the information about how many characters they are composed of with them, so there is no special end-of-string character, like in C. That means that Scheme strings can contain any character, even the NUL character @code{'\0'}. But note: Since most operating system calls dealing with strings (such as for file operations) expect strings to be zero-terminated, they might do unexpected things when called with string containing unusual characters. @menu * String Syntax:: Read syntax for strings. * String Predicates:: Testing strings for certain properties. * String Constructors:: Creating new string objects. * List/String Conversion:: Converting from/to lists of characters. * String Selection:: Select portions from strings. * String Modification:: Modify parts or whole strings. * String Comparison:: Lexicographic ordering predicates. * String Searching:: Searching in strings. * Alphabetic Case Mapping:: Convert the alphabetic case of strings. * Appending Strings:: Appending strings to form a new string. @end menu @node String Syntax @subsection String Read Syntax The read syntax for strings is an arbitrarily long sequence of characters enclosed in double quotes (@code{"}). @footnote{Actually, the current implementation restricts strings to a length of 2^24 characters.} If you want to insert a double quote character into a string literal, it must be prefixed with a backslash @code{\} character (called an @dfn{escape character}). The following are examples of string literals: @lisp "foo" "bar plonk" "Hello World" "\"Hi\", he said." @end lisp @c FIXME::martin: What about escape sequences like \r, \n etc.? @node String Predicates @subsection String Predicates The following procedures can be used to check whether a given string fulfills some specified property. @rnindex string? @deffn {Scheme Procedure} string? obj @deffnx {C Function} scm_string_p (obj) Return @code{#t} if @var{obj} is a string, else @code{#f}. @end deffn @deffn {Scheme Procedure} string-null? str @deffnx {C Function} scm_string_null_p (str) Return @code{#t} if @var{str}'s length is zero, and @code{#f} otherwise. @lisp (string-null? "") @result{} #t y @result{} "foo" (string-null? y) @result{} #f @end lisp @end deffn @node String Constructors @subsection String Constructors The string constructor procedures create new string objects, possibly initializing them with some specified character data. @c FIXME::martin: list->string belongs into `List/String Conversion' @rnindex string @rnindex list->string @deffn {Scheme Procedure} string . chrs @deffnx {Scheme Procedure} list->string chrs @deffnx {C Function} scm_string (chrs) Return a newly allocated string composed of the arguments, @var{chrs}. @end deffn @rnindex make-string @deffn {Scheme Procedure} make-string k [chr] @deffnx {C Function} scm_make_string (k, chr) Return a newly allocated string of length @var{k}. If @var{chr} is given, then all elements of the string are initialized to @var{chr}, otherwise the contents of the @var{string} are unspecified. @end deffn @node List/String Conversion @subsection List/String conversion When processing strings, it is often convenient to first convert them into a list representation by using the procedure @code{string->list}, work with the resulting list, and then convert it back into a string. These procedures are useful for similar tasks. @rnindex string->list @deffn {Scheme Procedure} string->list str @deffnx {C Function} scm_string_to_list (str) Return a newly allocated list of the characters that make up the given string @var{str}. @code{string->list} and @code{list->string} are inverses as far as @samp{equal?} is concerned. @end deffn @deffn {Scheme Procedure} string-split str chr @deffnx {C Function} scm_string_split (str, chr) Split the string @var{str} into the a list of the substrings delimited by appearances of the character @var{chr}. Note that an empty substring between separator characters will result in an empty string in the result list. @lisp (string-split "root:x:0:0:root:/root:/bin/bash" #\:) @result{} ("root" "x" "0" "0" "root" "/root" "/bin/bash") (string-split "::" #\:) @result{} ("" "" "") (string-split "" #\:) @result{} ("") @end lisp @end deffn @node String Selection @subsection String Selection Portions of strings can be extracted by these procedures. @code{string-ref} delivers individual characters whereas @code{substring} can be used to extract substrings from longer strings. @rnindex string-length @deffn {Scheme Procedure} string-length string @deffnx {C Function} scm_string_length (string) Return the number of characters in @var{string}. @end deffn @rnindex string-ref @deffn {Scheme Procedure} string-ref str k @deffnx {C Function} scm_string_ref (str, k) Return character @var{k} of @var{str} using zero-origin indexing. @var{k} must be a valid index of @var{str}. @end deffn @rnindex string-copy @deffn {Scheme Procedure} string-copy str @deffnx {C Function} scm_string_copy (str) Return a newly allocated copy of the given @var{string}. @end deffn @rnindex substring @deffn {Scheme Procedure} substring str start [end] @deffnx {C Function} scm_substring (str, start, end) Return a newly allocated string formed from the characters of @var{str} beginning with index @var{start} (inclusive) and ending with index @var{end} (exclusive). @var{str} must be a string, @var{start} and @var{end} must be exact integers satisfying: 0 <= @var{start} <= @var{end} <= (string-length @var{str}). @end deffn @node String Modification @subsection String Modification These procedures are for modifying strings in-place. This means that the result of the operation is not a new string; instead, the original string's memory representation is modified. @rnindex string-set! @deffn {Scheme Procedure} string-set! str k chr @deffnx {C Function} scm_string_set_x (str, k, chr) Store @var{chr} in element @var{k} of @var{str} and return an unspecified value. @var{k} must be a valid index of @var{str}. @end deffn @rnindex string-fill! @deffn {Scheme Procedure} string-fill! str chr @deffnx {C Function} scm_string_fill_x (str, chr) Store @var{char} in every element of the given @var{string} and return an unspecified value. @end deffn @deffn {Scheme Procedure} substring-fill! str start end fill @deffnx {C Function} scm_substring_fill_x (str, start, end, fill) Change every character in @var{str} between @var{start} and @var{end} to @var{fill}. @lisp (define y "abcdefg") (substring-fill! y 1 3 #\r) y @result{} "arrdefg" @end lisp @end deffn @deffn {Scheme Procedure} substring-move! str1 start1 end1 str2 start2 @deffnx {C Function} scm_substring_move_x (str1, start1, end1, str2, start2) Copy the substring of @var{str1} bounded by @var{start1} and @var{end1} into @var{str2} beginning at position @var{start2}. @var{str1} and @var{str2} can be the same string. @end deffn @node String Comparison @subsection String Comparison The procedures in this section are similar to the character ordering predicates (@pxref{Characters}), but are defined on character sequences. They all return @code{#t} on success and @code{#f} on failure. The predicates ending in @code{-ci} ignore the character case when comparing strings. @rnindex string=? @deffn {Scheme Procedure} string=? s1 s2 Lexicographic equality predicate; return @code{#t} if the two strings are the same length and contain the same characters in the same positions, otherwise return @code{#f}. The procedure @code{string-ci=?} treats upper and lower case letters as though they were the same character, but @code{string=?} treats upper and lower case as distinct characters. @end deffn @rnindex string? @deffn {Scheme Procedure} string>? s1 s2 Lexicographic ordering predicate; return @code{#t} if @var{s1} is lexicographically greater than @var{s2}. @end deffn @rnindex string>=? @deffn {Scheme Procedure} string>=? s1 s2 Lexicographic ordering predicate; return @code{#t} if @var{s1} is lexicographically greater than or equal to @var{s2}. @end deffn @rnindex string-ci=? @deffn {Scheme Procedure} string-ci=? s1 s2 Case-insensitive string equality predicate; return @code{#t} if the two strings are the same length and their component characters match (ignoring case) at each position; otherwise return @code{#f}. @end deffn @rnindex string-ci< @deffn {Scheme Procedure} string-ci? @deffn {Scheme Procedure} string-ci>? s1 s2 Case insensitive lexicographic ordering predicate; return @code{#t} if @var{s1} is lexicographically greater than @var{s2} regardless of case. @end deffn @rnindex string-ci>=? @deffn {Scheme Procedure} string-ci>=? s1 s2 Case insensitive lexicographic ordering predicate; return @code{#t} if @var{s1} is lexicographically greater than or equal to @var{s2} regardless of case. @end deffn @node String Searching @subsection String Searching When searching for the index of a character in a string, these procedures can be used. @deffn {Scheme Procedure} string-index str chr [frm [to]] @deffnx {C Function} scm_string_index (str, chr, frm, to) Return the index of the first occurrence of @var{chr} in @var{str}. The optional integer arguments @var{frm} and @var{to} limit the search to a portion of the string. This procedure essentially implements the @code{index} or @code{strchr} functions from the C library. @lisp (string-index "weiner" #\e) @result{} 1 (string-index "weiner" #\e 2) @result{} 4 (string-index "weiner" #\e 2 4) @result{} #f @end lisp @end deffn @deffn {Scheme Procedure} string-rindex str chr [frm [to]] @deffnx {C Function} scm_string_rindex (str, chr, frm, to) Like @code{string-index}, but search from the right of the string rather than from the left. This procedure essentially implements the @code{rindex} or @code{strrchr} functions from the C library. @lisp (string-rindex "weiner" #\e) @result{} 4 (string-rindex "weiner" #\e 2 4) @result{} #f (string-rindex "weiner" #\e 2 5) @result{} 4 @end lisp @end deffn @node Alphabetic Case Mapping @subsection Alphabetic Case Mapping These are procedures for mapping strings to their upper- or lower-case equivalents, respectively, or for capitalizing strings. @deffn {Scheme Procedure} string-upcase str @deffnx {C Function} scm_string_upcase (str) Return a freshly allocated string containing the characters of @var{str} in upper case. @end deffn @deffn {Scheme Procedure} string-upcase! str @deffnx {C Function} scm_string_upcase_x (str) Destructively upcase every character in @var{str} and return @var{str}. @lisp y @result{} "arrdefg" (string-upcase! y) @result{} "ARRDEFG" y @result{} "ARRDEFG" @end lisp @end deffn @deffn {Scheme Procedure} string-downcase str @deffnx {C Function} scm_string_downcase (str) Return a freshly allocation string containing the characters in @var{str} in lower case. @end deffn @deffn {Scheme Procedure} string-downcase! str @deffnx {C Function} scm_string_downcase_x (str) Destructively downcase every character in @var{str} and return @var{str}. @lisp y @result{} "ARRDEFG" (string-downcase! y) @result{} "arrdefg" y @result{} "arrdefg" @end lisp @end deffn @deffn {Scheme Procedure} string-capitalize str @deffnx {C Function} scm_string_capitalize (str) Return a freshly allocated string with the characters in @var{str}, where the first character of every word is capitalized. @end deffn @deffn {Scheme Procedure} string-capitalize! str @deffnx {C Function} scm_string_capitalize_x (str) Upcase the first character of every word in @var{str} destructively and return @var{str}. @lisp y @result{} "hello world" (string-capitalize! y) @result{} "Hello World" y @result{} "Hello World" @end lisp @end deffn @node Appending Strings @subsection Appending Strings The procedure @code{string-append} appends several strings together to form a longer result string. @rnindex string-append @deffn {Scheme Procedure} string-append . args @deffnx {C Function} scm_string_append (args) Return a newly allocated string whose characters form the concatenation of the given strings, @var{args}. @end deffn @node Regular Expressions @section Regular Expressions @tpindex Regular expressions @cindex regular expressions @cindex regex @cindex emacs regexp A @dfn{regular expression} (or @dfn{regexp}) is a pattern that describes a whole class of strings. A full description of regular expressions and their syntax is beyond the scope of this manual; an introduction can be found in the Emacs manual (@pxref{Regexps, , Syntax of Regular Expressions, emacs, The GNU Emacs Manual}), or in many general Unix reference books. If your system does not include a POSIX regular expression library, and you have not linked Guile with a third-party regexp library such as Rx, these functions will not be available. You can tell whether your Guile installation includes regular expression support by checking whether the @code{*features*} list includes the @code{regex} symbol. @menu * Regexp Functions:: Functions that create and match regexps. * Match Structures:: Finding what was matched by a regexp. * Backslash Escapes:: Removing the special meaning of regexp meta-characters. @end menu [FIXME: it may be useful to include an Examples section. Parts of this interface are bewildering on first glance.] @node Regexp Functions @subsection Regexp Functions By default, Guile supports POSIX extended regular expressions. That means that the characters @samp{(}, @samp{)}, @samp{+} and @samp{?} are special, and must be escaped if you wish to match the literal characters. This regular expression interface was modeled after that implemented by SCSH, the Scheme Shell. It is intended to be upwardly compatible with SCSH regular expressions. @c begin (scm-doc-string "regex.scm" "string-match") @deffn {Scheme Procedure} string-match pattern str [start] Compile the string @var{pattern} into a regular expression and compare it with @var{str}. The optional numeric argument @var{start} specifies the position of @var{str} at which to begin matching. @code{string-match} returns a @dfn{match structure} which describes what, if anything, was matched by the regular expression. @xref{Match Structures}. If @var{str} does not match @var{pattern} at all, @code{string-match} returns @code{#f}. @end deffn Each time @code{string-match} is called, it must compile its @var{pattern} argument into a regular expression structure. This operation is expensive, which makes @code{string-match} inefficient if the same regular expression is used several times (for example, in a loop). For better performance, you can compile a regular expression in advance and then match strings against the compiled regexp. @deffn {Scheme Procedure} make-regexp pat . flags @deffnx {C Function} scm_make_regexp (pat, flags) Compile the regular expression described by @var{pat}, and return the compiled regexp structure. If @var{pat} does not describe a legal regular expression, @code{make-regexp} throws a @code{regular-expression-syntax} error. The @var{flags} arguments change the behavior of the compiled regular expression. The following flags may be supplied: @table @code @item regexp/icase Consider uppercase and lowercase letters to be the same when matching. @item regexp/newline If a newline appears in the target string, then permit the @samp{^} and @samp{$} operators to match immediately after or immediately before the newline, respectively. Also, the @samp{.} and @samp{[^...]} operators will never match a newline character. The intent of this flag is to treat the target string as a buffer containing many lines of text, and the regular expression as a pattern that may match a single one of those lines. @item regexp/basic Compile a basic (``obsolete'') regexp instead of the extended (``modern'') regexps that are the default. Basic regexps do not consider @samp{|}, @samp{+} or @samp{?} to be special characters, and require the @samp{@{...@}} and @samp{(...)} metacharacters to be backslash-escaped (@pxref{Backslash Escapes}). There are several other differences between basic and extended regular expressions, but these are the most significant. @item regexp/extended Compile an extended regular expression rather than a basic regexp. This is the default behavior; this flag will not usually be needed. If a call to @code{make-regexp} includes both @code{regexp/basic} and @code{regexp/extended} flags, the one which comes last will override the earlier one. @end table @end deffn @deffn {Scheme Procedure} regexp-exec rx str [start [flags]] @deffnx {C Function} scm_regexp_exec (rx, str, start, flags) Match the compiled regular expression @var{rx} against @code{str}. If the optional integer @var{start} argument is provided, begin matching from that position in the string. Return a match structure describing the results of the match, or @code{#f} if no match could be found. The @var{flags} arguments change the matching behavior. The following flags may be supplied: @table @code @item regexp/notbol Operator @samp{^} always fails (unless @code{regexp/newline} is used). Use this when the beginning of the string should not be considered the beginning of a line. @item regexp/noteol Operator @samp{$} always fails (unless @code{regexp/newline} is used). Use this when the end of the string should not be considered the end of a line. @end table @end deffn @deffn {Scheme Procedure} regexp? obj @deffnx {C Function} scm_regexp_p (obj) Return @code{#t} if @var{obj} is a compiled regular expression, or @code{#f} otherwise. @end deffn Regular expressions are commonly used to find patterns in one string and replace them with the contents of another string. @c begin (scm-doc-string "regex.scm" "regexp-substitute") @deffn {Scheme Procedure} regexp-substitute port match [item@dots{}] Write to the output port @var{port} selected contents of the match structure @var{match}. Each @var{item} specifies what should be written, and may be one of the following arguments: @itemize @bullet @item A string. String arguments are written out verbatim. @item An integer. The submatch with that number is written. @item The symbol @samp{pre}. The portion of the matched string preceding the regexp match is written. @item The symbol @samp{post}. The portion of the matched string following the regexp match is written. @end itemize @var{port} may be @code{#f}, in which case nothing is written; instead, @code{regexp-substitute} constructs a string from the specified @var{item}s and returns that. @end deffn @c begin (scm-doc-string "regex.scm" "regexp-substitute") @deffn {Scheme Procedure} regexp-substitute/global port regexp target [item@dots{}] Similar to @code{regexp-substitute}, but can be used to perform global substitutions on @var{str}. Instead of taking a match structure as an argument, @code{regexp-substitute/global} takes two string arguments: a @var{regexp} string describing a regular expression, and a @var{target} string which should be matched against this regular expression. Each @var{item} behaves as in @var{regexp-substitute}, with the following exceptions: @itemize @bullet @item A function may be supplied. When this function is called, it will be passed one argument: a match structure for a given regular expression match. It should return a string to be written out to @var{port}. @item The @samp{post} symbol causes @code{regexp-substitute/global} to recurse on the unmatched portion of @var{str}. This @emph{must} be supplied in order to perform global search-and-replace on @var{str}; if it is not present among the @var{item}s, then @code{regexp-substitute/global} will return after processing a single match. @end itemize @end deffn @node Match Structures @subsection Match Structures @cindex match structures A @dfn{match structure} is the object returned by @code{string-match} and @code{regexp-exec}. It describes which portion of a string, if any, matched the given regular expression. Match structures include: a reference to the string that was checked for matches; the starting and ending positions of the regexp match; and, if the regexp included any parenthesized subexpressions, the starting and ending positions of each submatch. In each of the regexp match functions described below, the @code{match} argument must be a match structure returned by a previous call to @code{string-match} or @code{regexp-exec}. Most of these functions return some information about the original target string that was matched against a regular expression; we will call that string @var{target} for easy reference. @c begin (scm-doc-string "regex.scm" "regexp-match?") @deffn {Scheme Procedure} regexp-match? obj Return @code{#t} if @var{obj} is a match structure returned by a previous call to @code{regexp-exec}, or @code{#f} otherwise. @end deffn @c begin (scm-doc-string "regex.scm" "match:substring") @deffn {Scheme Procedure} match:substring match [n] Return the portion of @var{target} matched by subexpression number @var{n}. Submatch 0 (the default) represents the entire regexp match. If the regular expression as a whole matched, but the subexpression number @var{n} did not match, return @code{#f}. @end deffn @c begin (scm-doc-string "regex.scm" "match:start") @deffn {Scheme Procedure} match:start match [n] Return the starting position of submatch number @var{n}. @end deffn @c begin (scm-doc-string "regex.scm" "match:end") @deffn {Scheme Procedure} match:end match [n] Return the ending position of submatch number @var{n}. @end deffn @c begin (scm-doc-string "regex.scm" "match:prefix") @deffn {Scheme Procedure} match:prefix match Return the unmatched portion of @var{target} preceding the regexp match. @end deffn @c begin (scm-doc-string "regex.scm" "match:suffix") @deffn {Scheme Procedure} match:suffix match Return the unmatched portion of @var{target} following the regexp match. @end deffn @c begin (scm-doc-string "regex.scm" "match:count") @deffn {Scheme Procedure} match:count match Return the number of parenthesized subexpressions from @var{match}. Note that the entire regular expression match itself counts as a subexpression, and failed submatches are included in the count. @end deffn @c begin (scm-doc-string "regex.scm" "match:string") @deffn {Scheme Procedure} match:string match Return the original @var{target} string. @end deffn @node Backslash Escapes @subsection Backslash Escapes Sometimes you will want a regexp to match characters like @samp{*} or @samp{$} exactly. For example, to check whether a particular string represents a menu entry from an Info node, it would be useful to match it against a regexp like @samp{^* [^:]*::}. However, this won't work; because the asterisk is a metacharacter, it won't match the @samp{*} at the beginning of the string. In this case, we want to make the first asterisk un-magic. You can do this by preceding the metacharacter with a backslash character @samp{\}. (This is also called @dfn{quoting} the metacharacter, and is known as a @dfn{backslash escape}.) When Guile sees a backslash in a regular expression, it considers the following glyph to be an ordinary character, no matter what special meaning it would ordinarily have. Therefore, we can make the above example work by changing the regexp to @samp{^\* [^:]*::}. The @samp{\*} sequence tells the regular expression engine to match only a single asterisk in the target string. Since the backslash is itself a metacharacter, you may force a regexp to match a backslash in the target string by preceding the backslash with itself. For example, to find variable references in a @TeX{} program, you might want to find occurrences of the string @samp{\let\} followed by any number of alphabetic characters. The regular expression @samp{\\let\\[A-Za-z]*} would do this: the double backslashes in the regexp each match a single backslash in the target string. @c begin (scm-doc-string "regex.scm" "regexp-quote") @deffn {Scheme Procedure} regexp-quote str Quote each special character found in @var{str} with a backslash, and return the resulting string. @end deffn @strong{Very important:} Using backslash escapes in Guile source code (as in Emacs Lisp or C) can be tricky, because the backslash character has special meaning for the Guile reader. For example, if Guile encounters the character sequence @samp{\n} in the middle of a string while processing Scheme code, it replaces those characters with a newline character. Similarly, the character sequence @samp{\t} is replaced by a horizontal tab. Several of these @dfn{escape sequences} are processed by the Guile reader before your code is executed. Unrecognized escape sequences are ignored: if the characters @samp{\*} appear in a string, they will be translated to the single character @samp{*}. This translation is obviously undesirable for regular expressions, since we want to be able to include backslashes in a string in order to escape regexp metacharacters. Therefore, to make sure that a backslash is preserved in a string in your Guile program, you must use @emph{two} consecutive backslashes: @lisp (define Info-menu-entry-pattern (make-regexp "^\\* [^:]*")) @end lisp The string in this example is preprocessed by the Guile reader before any code is executed. The resulting argument to @code{make-regexp} is the string @samp{^\* [^:]*}, which is what we really want. This also means that in order to write a regular expression that matches a single backslash character, the regular expression string in the source code must include @emph{four} backslashes. Each consecutive pair of backslashes gets translated by the Guile reader to a single backslash, and the resulting double-backslash is interpreted by the regexp engine as matching a single backslash character. Hence: @lisp (define tex-variable-pattern (make-regexp "\\\\let\\\\=[A-Za-z]*")) @end lisp The reason for the unwieldiness of this syntax is historical. Both regular expression pattern matchers and Unix string processing systems have traditionally used backslashes with the special meanings described above. The POSIX regular expression specification and ANSI C standard both require these semantics. Attempting to abandon either convention would cause other kinds of compatibility problems, possibly more severe ones. Therefore, without extending the Scheme reader to support strings with different quoting conventions (an ungainly and confusing extension when implemented in other languages), we must adhere to this cumbersome escape syntax. @node Symbols @section Symbols @tpindex Symbols Symbols in Scheme are widely used in three ways: as items of discrete data, as lookup keys for alists and hash tables, and to denote variable references. A @dfn{symbol} is similar to a string in that it is defined by a sequence of characters. The sequence of characters is known as the symbol's @dfn{name}. In the usual case --- that is, where the symbol's name doesn't include any characters that could be confused with other elements of Scheme syntax --- a symbol is written in a Scheme program by writing the sequence of characters that make up the name, @emph{without} any quotation marks or other special syntax. For example, the symbol whose name is ``multiply-by-2'' is written, simply: @lisp multiply-by-2 @end lisp Notice how this differs from a @emph{string} with contents ``multiply-by-2'', which is written with double quotation marks, like this: @lisp "multiply-by-2" @end lisp Looking beyond how they are written, symbols are different from strings in two important respects. The first important difference is uniqueness. If the same-looking string is read twice from two different places in a program, the result is two @emph{different} string objects whose contents just happen to be the same. If, on the other hand, the same-looking symbol is read twice from two different places in a program, the result is the @emph{same} symbol object both times. Given two read symbols, you can use @code{eq?} to test whether they are the same (that is, have the same name). @code{eq?} is the most efficient comparison operator in Scheme, and comparing two symbols like this is as fast as comparing, for example, two numbers. Given two strings, on the other hand, you must use @code{equal?} or @code{string=?}, which are much slower comparison operators, to determine whether the strings have the same contents. @lisp (define sym1 (quote hello)) (define sym2 (quote hello)) (eq? sym1 sym2) @result{} #t (define str1 "hello") (define str2 "hello") (eq? str1 str2) @result{} #f (equal? str1 str2) @result{} #t @end lisp The second important difference is that symbols, unlike strings, are not self-evaluating. This is why we need the @code{(quote @dots{})}s in the example above: @code{(quote hello)} evaluates to the symbol named "hello" itself, whereas an unquoted @code{hello} is @emph{read} as the symbol named "hello" and evaluated as a variable reference @dots{} about which more below (@pxref{Symbol Variables}). @menu * Symbol Data:: Symbols as discrete data. * Symbol Keys:: Symbols as lookup keys. * Symbol Variables:: Symbols as denoting variables. * Symbol Primitives:: Operations related to symbols. * Symbol Props:: Function slots and property lists. * Symbol Read Syntax:: Extended read syntax for symbols. * Symbol Uninterned:: Uninterned symbols. @end menu @node Symbol Data @subsection Symbols as Discrete Data Numbers and symbols are similar to the extent that they both lend themselves to @code{eq?} comparison. But symbols are more descriptive than numbers, because a symbol's name can be used directly to describe the concept for which that symbol stands. For example, imagine that you need to represent some colours in a computer program. Using numbers, you would have to choose arbitrarily some mapping between numbers and colours, and then take care to use that mapping consistently: @lisp ;; 1=red, 2=green, 3=purple (if (eq? (colour-of car) 1) ...) @end lisp @noindent You can make the mapping more explicit and the code more readable by defining constants: @lisp (define red 1) (define green 2) (define purple 3) (if (eq? (colour-of car) red) ...) @end lisp @noindent But the simplest and clearest approach is not to use numbers at all, but symbols whose names specify the colours that they refer to: @lisp (if (eq? (colour-of car) 'red) ...) @end lisp The descriptive advantages of symbols over numbers increase as the set of concepts that you want to describe grows. Suppose that a car object can have other properties as well, such as whether it has or uses: @itemize @bullet @item automatic or manual transmission @item leaded or unleaded fuel @item power steering (or not). @end itemize @noindent Then a car's combined property set could be naturally represented and manipulated as a list of symbols: @lisp (properties-of car1) @result{} (red manual unleaded power-steering) (if (memq 'power-steering (properties-of car1)) (display "Unfit people can drive this car.\n") (display "You'll need strong arms to drive this car!\n")) @print{} Unfit people can drive this car. @end lisp Remember, the fundamental property of symbols that we are relying on here is that an occurrence of @code{'red} in one part of a program is an @emph{indistinguishable} symbol from an occurrence of @code{'red} in another part of a program; this means that symbols can usefully be compared using @code{eq?}. At the same time, symbols have naturally descriptive names. This combination of efficiency and descriptive power makes them ideal for use as discrete data. @node Symbol Keys @subsection Symbols as Lookup Keys Given their efficiency and descriptive power, it is natural to use symbols as the keys in an association list or hash table. To illustrate this, consider a more structured representation of the car properties example from the preceding subsection. Rather than mixing all the properties up together in a flat list, we could use an association list like this: @lisp (define car1-properties '((colour . red) (transmission . manual) (fuel . unleaded) (steering . power-assisted))) @end lisp Notice how this structure is more explicit and extensible than the flat list. For example it makes clear that @code{manual} refers to the transmission rather than, say, the windows or the locking of the car. It also allows further properties to use the same symbols among their possible values without becoming ambiguous: @lisp (define car1-properties '((colour . red) (transmission . manual) (fuel . unleaded) (steering . power-assisted) (seat-colour . red) (locking . manual))) @end lisp With a representation like this, it is easy to use the efficient @code{assq-XXX} family of procedures (@pxref{Association Lists}) to extract or change individual pieces of information: @lisp (assq-ref car1-properties 'fuel) @result{} unleaded (assq-ref car1-properties 'transmission) @result{} manual (assq-set! car1-properties 'seat-colour 'black) @result{} ((colour . red) (transmission . manual) (fuel . unleaded) (steering . power-assisted) (seat-colour . black) (locking . manual))) @end lisp Hash tables also have keys, and exactly the same arguments apply to the use of symbols in hash tables as in association lists. The hash value that Guile uses to decide where to add a symbol-keyed entry to a hash table can be obtained by calling the @code{symbol-hash} procedure: @deffn {Scheme Procedure} symbol-hash symbol @deffnx {C Function} scm_symbol_hash (symbol) Return a hash value for @var{symbol}. @end deffn See @ref{Hash Tables} for information about hash tables in general, and for why you might choose to use a hash table rather than an association list. @node Symbol Variables @subsection Symbols as Denoting Variables When an unquoted symbol in a Scheme program is evaluated, it is interpreted as a variable reference, and the result of the evaluation is the appropriate variable's value. For example, when the expression @code{(string-length "abcd")} is read and evaluated, the sequence of characters @code{string-length} is read as the symbol whose name is "string-length". This symbol is associated with a variable whose value is the procedure that implements string length calculation. Therefore evaluation of the @code{string-length} symbol results in that procedure. The details of the connection between an unquoted symbol and the variable to which it refers are explained elsewhere. See @ref{Binding Constructs}, for how associations between symbols and variables are created, and @ref{Modules}, for how those associations are affected by Guile's module system. @node Symbol Primitives @subsection Operations Related to Symbols Given any Scheme value, you can determine whether it is a symbol using the @code{symbol?} primitive: @rnindex symbol? @deffn {Scheme Procedure} symbol? obj @deffnx {C Function} scm_symbol_p (obj) Return @code{#t} if @var{obj} is a symbol, otherwise return @code{#f}. @end deffn Once you know that you have a symbol, you can obtain its name as a string by calling @code{symbol->string}. Note that Guile differs by default from R5RS on the details of @code{symbol->string} as regards case-sensitivity: @rnindex symbol->string @deffn {Scheme Procedure} symbol->string s @deffnx {C Function} scm_symbol_to_string (s) Return the name of symbol @var{s} as a string. By default, Guile reads symbols case-sensitively, so the string returned will have the same case variation as the sequence of characters that caused @var{s} to be created. If Guile is set to read symbols case-insensitively (as specified by R5RS), and @var{s} comes into being as part of a literal expression (@pxref{Literal expressions,,,r5rs, The Revised^5 Report on Scheme}) or by a call to the @code{read} or @code{string-ci->symbol} procedures, Guile converts any alphabetic characters in the symbol's name to lower case before creating the symbol object, so the string returned here will be in lower case. If @var{s} was created by @code{string->symbol}, the case of characters in the string returned will be the same as that in the string that was passed to @code{string->symbol}, regardless of Guile's case-sensitivity setting at the time @var{s} was created. It is an error to apply mutation procedures like @code{string-set!} to strings returned by this procedure. @end deffn Most symbols are created by writing them literally in code. However it is also possible to create symbols programmatically using the following @code{string->symbol} and @code{string-ci->symbol} procedures: @rnindex string->symbol @deffn {Scheme Procedure} string->symbol string @deffnx {C Function} scm_string_to_symbol (string) Return the symbol whose name is @var{string}. This procedure can create symbols with names containing special characters or letters in the non-standard case, but it is usually a bad idea to create such symbols because in some implementations of Scheme they cannot be read as themselves. @end deffn @deffn {Scheme Procedure} string-ci->symbol str @deffnx {C Function} scm_string_ci_to_symbol (str) Return the symbol whose name is @var{str}. If Guile is currently reading symbols case-insensitively, @var{str} is converted to lowercase before the returned symbol is looked up or created. @end deffn The following examples illustrate Guile's detailed behaviour as regards the case-sensitivity of symbols: @lisp (read-enable 'case-insensitive) ; R5RS compliant behaviour (symbol->string 'flying-fish) @result{} "flying-fish" (symbol->string 'Martin) @result{} "martin" (symbol->string (string->symbol "Malvina")) @result{} "Malvina" (eq? 'mISSISSIppi 'mississippi) @result{} #t (string->symbol "mISSISSIppi") @result{} mISSISSIppi (eq? 'bitBlt (string->symbol "bitBlt")) @result{} #f (eq? 'LolliPop (string->symbol (symbol->string 'LolliPop))) @result{} #t (string=? "K. Harper, M.D." (symbol->string (string->symbol "K. Harper, M.D."))) @result{} #t (read-disable 'case-insensitive) ; Guile default behaviour (symbol->string 'flying-fish) @result{} "flying-fish" (symbol->string 'Martin) @result{} "Martin" (symbol->string (string->symbol "Malvina")) @result{} "Malvina" (eq? 'mISSISSIppi 'mississippi) @result{} #f (string->symbol "mISSISSIppi") @result{} mISSISSIppi (eq? 'bitBlt (string->symbol "bitBlt")) @result{} #t (eq? 'LolliPop (string->symbol (symbol->string 'LolliPop))) @result{} #t (string=? "K. Harper, M.D." (symbol->string (string->symbol "K. Harper, M.D."))) @result{} #t @end lisp Finally, some applications, especially those that generate new Scheme code dynamically, need to generate symbols for use in the generated code. The @code{gensym} primitive meets this need: @deffn {Scheme Procedure} gensym [prefix] @deffnx {C Function} scm_gensym (prefix) Create a new symbol with a name constructed from a prefix and a counter value. The string @var{prefix} can be specified as an optional argument. Default prefix is @samp{ g}. The counter is increased by 1 at each call. There is no provision for resetting the counter. @end deffn The symbols generated by @code{gensym} are @emph{likely} to be unique, since their names begin with a space and it is only otherwise possible to generate such symbols if a programmer goes out of their way to do so. The 1.8 release of Guile will include a way of creating symbols that are @emph{guaranteed} to be unique. @node Symbol Props @subsection Function Slots and Property Lists In traditional Lisp dialects, symbols are often understood as having three kinds of value at once: @itemize @bullet @item a @dfn{variable} value, which is used when the symbol appears in code in a variable reference context @item a @dfn{function} value, which is used when the symbol appears in code in a function name position (i.e. as the first element in an unquoted list) @item a @dfn{property list} value, which is used when the symbol is given as the first argument to Lisp's @code{put} or @code{get} functions. @end itemize Although Scheme (as one of its simplifications with respect to Lisp) does away with the distinction between variable and function namespaces, Guile currently retains some elements of the traditional structure in case they turn out to be useful when implementing translators for other languages, in particular Emacs Lisp. Specifically, Guile symbols have two extra slots. for a symbol's property list, and for its ``function value.'' The following procedures are provided to access these slots. @deffn {Scheme Procedure} symbol-fref symbol @deffnx {C Function} scm_symbol_fref (symbol) Return the contents of @var{symbol}'s @dfn{function slot}. @end deffn @deffn {Scheme Procedure} symbol-fset! symbol value @deffnx {C Function} scm_symbol_fset_x (symbol, value) Set the contents of @var{symbol}'s function slot to @var{value}. @end deffn @deffn {Scheme Procedure} symbol-pref symbol @deffnx {C Function} scm_symbol_pref (symbol) Return the @dfn{property list} currently associated with @var{symbol}. @end deffn @deffn {Scheme Procedure} symbol-pset! symbol value @deffnx {C Function} scm_symbol_pset_x (symbol, value) Set @var{symbol}'s property list to @var{value}. @end deffn @deffn {Scheme Procedure} symbol-property sym prop From @var{sym}'s property list, return the value for property @var{prop}. The assumption is that @var{sym}'s property list is an association list whose keys are distinguished from each other using @code{equal?}; @var{prop} should be one of the keys in that list. If the property list has no entry for @var{prop}, @code{symbol-property} returns @code{#f}. @end deffn @deffn {Scheme Procedure} set-symbol-property sym prop val In @var{sym}'s property list, set the value for property @var{prop} to @var{val}, or add a new entry for @var{prop}, with value @var{val}, if none already exists. For the structure of the property list, see @code{symbol-property}. @end deffn @deffn {Scheme Procedure} symbol-property-remove! sym prop From @var{sym}'s property list, remove the entry for property @var{prop}, if there is one. For the structure of the property list, see @code{symbol-property}. @end deffn Support for these extra slots may be removed in a future release, and it is probably better to avoid using them. (In release 1.6, Guile itself uses the property list slot sparingly, and the function slot not at all.) For a more modern and Schemely approach to properties, see @ref{Object Properties}. @node Symbol Read Syntax @subsection Extended Read Syntax for Symbols The read syntax for a symbol is a sequence of letters, digits, and @dfn{extended alphabetic characters}, beginning with a character that cannot begin a number. In addition, the special cases of @code{+}, @code{-}, and @code{...} are read as symbols even though numbers can begin with @code{+}, @code{-} or @code{.}. Extended alphabetic characters may be used within identifiers as if they were letters. The set of extended alphabetic characters is: @example ! $ % & * + - . / : < = > ? @@ ^ _ ~ @end example In addition to the standard read syntax defined above (which is taken from R5RS (@pxref{Formal syntax,,,r5rs,The Revised^5 Report on Scheme})), Guile provides an extended symbol read syntax that allows the inclusion of unusual characters such as space characters, newlines and parentheses. If (for whatever reason) you need to write a symbol containing characters not mentioned above, you can do so as follows. @itemize @bullet @item Begin the symbol with the characters @code{#@{}, @item write the characters of the symbol and @item finish the symbol with the characters @code{@}#}. @end itemize Here are a few examples of this form of read syntax. The first symbol needs to use extended syntax because it contains a space character, the second because it contains a line break, and the last because it looks like a number. @lisp #@{foo bar@}# #@{what ever@}# #@{4242@}# @end lisp Although Guile provides this extended read syntax for symbols, widespread usage of it is discouraged because it is not portable and not very readable. @node Symbol Uninterned @subsection Uninterned Symbols What makes symbols useful is that they are automatically kept unique. There are no two symbols that are distinct objects but have the same name. But of course, there is no rule without exception. In addition to the normal symbols that have been discussed up to now, you can also create special @dfn{uninterned} symbols that behave slightly differently. To understand what is different about them and why they might be useful, we look at how normal symbols are actually kept unique. Whenever Guile wants to find the symbol with a specific name, for example during @code{read} or when executing @code{string->symbol}, it first looks into a table of all existing symbols to find out whether a symbol with the given name already exists. When this is the case, Guile just returns that symbol. When not, a new symbol with the name is created and entered into the table so that it can be found later. Sometimes you might want to create a symbol that is guaranteed `fresh', i.e. a symbol that did not exist previously. You might also want to somehow guarantee that no one else will ever unintentionally stumble across your symbol in the future. These properties of a symbol are often needed when generating code during macro expansion. When introducing new temporary variables, you want to guarantee that they don't conflict with variables in other people's code. The simplest way to arrange for this is to create a new symbol but not enter it into the global table of all symbols. That way, no one will ever get access to your symbol by chance. Symbols that are not in the table are called @dfn{uninterned}. Of course, symbols that @emph{are} in the table are called @dfn{interned}. You create new uninterned symbols with the function @code{make-symbol}. You can test whether a symbol is interned or not with @code{symbol-interned?}. Uninterned symbols break the rule that the name of a symbol uniquely identifies the symbol object. Because of this, they can not be written out and read back in like interned symbols. Currently, Guile has no support for reading uninterned symbols. Note that the function @code{gensym} does not return uninterned symbols for this reason. @deffn {Scheme Procedure} make-symbol name @deffnx {C Function} scm_make_symbol (name) Return a new uninterned symbol with the name @var{name}. The returned symbol is guaranteed to be unique and future calls to @code{string->symbol} will not return it. @end deffn @deffn {Scheme Procedure} symbol-interned? symbol @deffnx {C Function} scm_symbol_interned_p (symbol) Return @code{#t} if @var{symbol} is interned, otherwise return @code{#f}. @end deffn For example: @lisp (define foo-1 (string->symbol "foo")) (define foo-2 (string->symbol "foo")) (define foo-3 (make-symbol "foo")) (define foo-4 (make-symbol "foo")) (eq? foo-1 foo-2) @result{} #t ; Two interned symbols with the same name are the same object, (eq? foo-1 foo-3) @result{} #f ; but a call to make-symbol with the same name returns a ; distinct object. (eq? foo-3 foo-4) @result{} #f ; A call to make-symbol always returns a new object, even for ; the same name. foo-3 @result{} # ; Uninterned symbols print differently from interned symbols, (symbol? foo-3) @result{} #t ; but they are still symbols, (symbol-interned? foo-3) @result{} #f ; just not interned. @end lisp @node Keywords @section Keywords @tpindex Keywords Keywords are self-evaluating objects with a convenient read syntax that makes them easy to type. Guile's keyword support conforms to R5RS, and adds a (switchable) read syntax extension to permit keywords to begin with @code{:} as well as @code{#:}. @menu * Why Use Keywords?:: Motivation for keyword usage. * Coding With Keywords:: How to use keywords. * Keyword Read Syntax:: Read syntax for keywords. * Keyword Procedures:: Procedures for dealing with keywords. * Keyword Primitives:: The underlying primitive procedures. @end menu @node Why Use Keywords? @subsection Why Use Keywords? Keywords are useful in contexts where a program or procedure wants to be able to accept a large number of optional arguments without making its interface unmanageable. To illustrate this, consider a hypothetical @code{make-window} procedure, which creates a new window on the screen for drawing into using some graphical toolkit. There are many parameters that the caller might like to specify, but which could also be sensibly defaulted, for example: @itemize @bullet @item color depth -- Default: the color depth for the screen @item background color -- Default: white @item width -- Default: 600 @item height -- Default: 400 @end itemize If @code{make-window} did not use keywords, the caller would have to pass in a value for each possible argument, remembering the correct argument order and using a special value to indicate the default value for that argument: @lisp (make-window 'default ;; Color depth 'default ;; Background color 800 ;; Width 100 ;; Height @dots{}) ;; More make-window arguments @end lisp With keywords, on the other hand, defaulted arguments are omitted, and non-default arguments are clearly tagged by the appropriate keyword. As a result, the invocation becomes much clearer: @lisp (make-window #:width 800 #:height 100) @end lisp On the other hand, for a simpler procedure with few arguments, the use of keywords would be a hindrance rather than a help. The primitive procedure @code{cons}, for example, would not be improved if it had to be invoked as @lisp (cons #:car x #:cdr y) @end lisp So the decision whether to use keywords or not is purely pragmatic: use them if they will clarify the procedure invocation at point of call. @node Coding With Keywords @subsection Coding With Keywords If a procedure wants to support keywords, it should take a rest argument and then use whatever means is convenient to extract keywords and their corresponding arguments from the contents of that rest argument. The following example illustrates the principle: the code for @code{make-window} uses a helper procedure called @code{get-keyword-value} to extract individual keyword arguments from the rest argument. @lisp (define (get-keyword-value args keyword default) (let ((kv (memq keyword args))) (if (and kv (>= (length kv) 2)) (cadr kv) default))) (define (make-window . args) (let ((depth (get-keyword-value args #:depth screen-depth)) (bg (get-keyword-value args #:bg "white")) (width (get-keyword-value args #:width 800)) (height (get-keyword-value args #:height 100)) @dots{}) @dots{})) @end lisp But you don't need to write @code{get-keyword-value}. The @code{(ice-9 optargs)} module provides a set of powerful macros that you can use to implement keyword-supporting procedures like this: @lisp (use-modules (ice-9 optargs)) (define (make-window . args) (let-keywords args #f ((depth screen-depth) (bg "white") (width 800) (height 100)) ...)) @end lisp @noindent Or, even more economically, like this: @lisp (use-modules (ice-9 optargs)) (define* (make-window #:key (depth screen-depth) (bg "white") (width 800) (height 100)) ...) @end lisp For further details on @code{let-keywords}, @code{define*} and other facilities provided by the @code{(ice-9 optargs)} module, see @ref{Optional Arguments}. @node Keyword Read Syntax @subsection Keyword Read Syntax Guile, by default, only recognizes the keyword syntax specified by R5RS. A token of the form @code{#:NAME}, where @code{NAME} has the same syntax as a Scheme symbol (@pxref{Symbol Read Syntax}), is the external representation of the keyword named @code{NAME}. Keyword objects print using this syntax as well, so values containing keyword objects can be read back into Guile. When used in an expression, keywords are self-quoting objects. If the @code{keyword} read option is set to @code{'prefix}, Guile also recognizes the alternative read syntax @code{:NAME}. Otherwise, tokens of the form @code{:NAME} are read as symbols, as required by R5RS. To enable and disable the alternative non-R5RS keyword syntax, you use the @code{read-options} procedure documented in @ref{General option interface} and @ref{Reader options}. @smalllisp (read-set! keywords 'prefix) #:type @result{} #:type :type @result{} #:type (read-set! keywords #f) #:type @result{} #:type :type @print{} ERROR: In expression :type: ERROR: Unbound variable: :type ABORT: (unbound-variable) @end smalllisp @node Keyword Procedures @subsection Keyword Procedures The following procedures can be used for converting symbols to keywords and back. @deffn {Scheme Procedure} symbol->keyword sym Return a keyword with the same characters as in @var{sym}. @end deffn @deffn {Scheme Procedure} keyword->symbol kw Return a symbol with the same characters as in @var{kw}. @end deffn @node Keyword Primitives @subsection Keyword Primitives Internally, a keyword is implemented as something like a tagged symbol, where the tag identifies the keyword as being self-evaluating, and the symbol, known as the keyword's @dfn{dash symbol} has the same name as the keyword name but prefixed by a single dash. For example, the keyword @code{#:name} has the corresponding dash symbol @code{-name}. Most keyword objects are constructed automatically by the reader when it reads a token beginning with @code{#:}. However, if you need to construct a keyword object programmatically, you can do so by calling @code{make-keyword-from-dash-symbol} with the corresponding dash symbol (as the reader does). The dash symbol for a keyword object can be retrieved using the @code{keyword-dash-symbol} procedure. @deffn {Scheme Procedure} make-keyword-from-dash-symbol symbol @deffnx {C Function} scm_make_keyword_from_dash_symbol (symbol) Make a keyword object from a @var{symbol} that starts with a dash. @end deffn @deffn {Scheme Procedure} keyword? obj @deffnx {C Function} scm_keyword_p (obj) Return @code{#t} if the argument @var{obj} is a keyword, else @code{#f}. @end deffn @deffn {Scheme Procedure} keyword-dash-symbol keyword @deffnx {C Function} scm_keyword_dash_symbol (keyword) Return the dash symbol for @var{keyword}. This is the inverse of @code{make-keyword-from-dash-symbol}. @end deffn @node Other Types @section ``Functionality-Centric'' Data Types Procedures and macros are documented in their own chapter: see @ref{Procedures and Macros}. Variable objects are documented as part of the description of Guile's module system: see @ref{Variables}. Asyncs, dynamic roots and fluids are described in the chapter on scheduling: see @ref{Scheduling}. Hooks are documented in the chapter on general utility functions: see @ref{Hooks}. Ports are described in the chapter on I/O: see @ref{Input and Output}. @c Local Variables: @c TeX-master: "guile.texi" @c End: