package Math::BigInt;
-%OVERLOAD = (
- # Anonymous subroutines:
-'+' => sub {new BigInt &badd},
-'-' => sub {new BigInt
+use overload
+'+' => sub {new Math::BigInt &badd},
+'-' => sub {new Math::BigInt
$_[2]? bsub($_[1],${$_[0]}) : bsub(${$_[0]},$_[1])},
-'<=>' => sub {new BigInt
+'<=>' => sub {new Math::BigInt
$_[2]? bcmp($_[1],${$_[0]}) : bcmp(${$_[0]},$_[1])},
-'cmp' => sub {new BigInt
+'cmp' => sub {new Math::BigInt
$_[2]? ($_[1] cmp ${$_[0]}) : (${$_[0]} cmp $_[1])},
-'*' => sub {new BigInt &bmul},
-'/' => sub {new BigInt
+'*' => sub {new Math::BigInt &bmul},
+'/' => sub {new Math::BigInt
$_[2]? scalar bdiv($_[1],${$_[0]}) :
scalar bdiv(${$_[0]},$_[1])},
-'%' => sub {new BigInt
+'%' => sub {new Math::BigInt
$_[2]? bmod($_[1],${$_[0]}) : bmod(${$_[0]},$_[1])},
-'**' => sub {new BigInt
+'**' => sub {new Math::BigInt
$_[2]? bpow($_[1],${$_[0]}) : bpow(${$_[0]},$_[1])},
-'neg' => sub {new BigInt &bneg},
-'abs' => sub {new BigInt &babs},
+'neg' => sub {new Math::BigInt &bneg},
+'abs' => sub {new Math::BigInt &babs},
qw(
"" stringify
0+ numify) # Order of arguments unsignificant
-);
+;
+
+$NaNOK=1;
sub new {
- my $foo = bnorm($_[1]);
- die "Not a number initialized to BigInt" if $foo eq "NaN";
- bless \$foo;
+ my($class) = shift;
+ my($foo) = bnorm(shift);
+ die "Not a number initialized to Math::BigInt" if !$NaNOK && $foo eq "NaN";
+ bless \$foo, $class;
}
sub stringify { "${$_[0]}" }
sub numify { 0 + "${$_[0]}" } # Not needed, additional overhead
# comparing to direct compilation based on
# stringify
-
-# arbitrary size integer math package
-#
-# by Mark Biggar
-#
-# Canonical Big integer value are strings of the form
-# /^[+-]\d+$/ with leading zeros suppressed
-# Input values to these routines may be strings of the form
-# /^\s*[+-]?[\d\s]+$/.
-# Examples:
-# '+0' canonical zero value
-# ' -123 123 123' canonical value '-123123123'
-# '1 23 456 7890' canonical value '+1234567890'
-# Output values always always in canonical form
-#
-# Actual math is done in an internal format consisting of an array
-# whose first element is the sign (/^[+-]$/) and whose remaining
-# elements are base 100000 digits with the least significant digit first.
-# The string 'NaN' is used to represent the result when input arguments
-# are not numbers, as well as the result of dividing by zero
-#
-# routines provided are:
-#
-# bneg(BINT) return BINT negation
-# babs(BINT) return BINT absolute value
-# bcmp(BINT,BINT) return CODE compare numbers (undef,<0,=0,>0)
-# badd(BINT,BINT) return BINT addition
-# bsub(BINT,BINT) return BINT subtraction
-# bmul(BINT,BINT) return BINT multiplication
-# bdiv(BINT,BINT) return (BINT,BINT) division (quo,rem) just quo if scalar
-# bmod(BINT,BINT) return BINT modulus
-# bgcd(BINT,BINT) return BINT greatest common divisor
-# bnorm(BINT) return BINT normalization
-#
+sub import {
+ shift;
+ return unless @_;
+ die "unknown import: @_" unless @_ == 1 and $_[0] eq ':constant';
+ overload::constant integer => sub {Math::BigInt->new(shift)};
+}
$zero = 0;
-\f
+
# normalize string form of number. Strip leading zeros. Strip any
# white space and add a sign, if missing.
# Strings that are not numbers result the value 'NaN'.
s/^-/+/;
$_;
}
-\f
+
# Compares 2 values. Returns one of undef, <0, =0, >0. (suitable for sort)
sub bcmp { #(num_str, num_str) return cond_code
local($x,$y) = (&bnorm($_[$[]),&bnorm($_[$[+1]));
sub cmp { # post-normalized compare for internal use
local($cx, $cy) = @_;
- $cx cmp $cy
- &&
- (
- ord($cy) <=> ord($cx)
- ||
- ($cx cmp ',') * (length($cy) <=> length($cx) || $cy cmp $cx)
- );
+
+ return 0 if ($cx eq $cy);
+
+ local($sx, $sy) = (substr($cx, 0, 1), substr($cy, 0, 1));
+ local($ld);
+
+ if ($sx eq '+') {
+ return 1 if ($sy eq '-' || $cy eq '+0');
+ $ld = length($cx) - length($cy);
+ return $ld if ($ld);
+ return $cx cmp $cy;
+ } else { # $sx eq '-'
+ return -1 if ($sy eq '+');
+ $ld = length($cy) - length($cx);
+ return $ld if ($ld);
+ return $cy cmp $cx;
+ }
}
sub badd { #(num_str, num_str) return num_str
$x;
}
}
-\f
+
# routine to add two base 1e5 numbers
# stolen from Knuth Vol 2 Algorithm A pg 231
# there are separate routines to add and sub as per Kunth pg 233
$car = 0;
for $x (@x) {
last unless @y || $car;
- $x -= 1e5 if $car = (($x += shift(@y) + $car) >= 1e5);
+ $x -= 1e5 if $car = (($x += (@y ? shift(@y) : 0) + $car) >= 1e5) ? 1 : 0;
}
for $y (@y) {
last unless $car;
- $y -= 1e5 if $car = (($y += $car) >= 1e5);
+ $y -= 1e5 if $car = (($y += $car) >= 1e5) ? 1 : 0;
}
(@x, @y, $car);
}
local(*sx, *sy) = @_;
$bar = 0;
for $sx (@sx) {
- last unless @y || $bar;
- $sx += 1e5 if $bar = (($sx -= shift(@sy) + $bar) < 0);
+ last unless @sy || $bar;
+ $sx += 1e5 if $bar = (($sx -= (@sy ? shift(@sy) : 0) + $bar) < 0);
}
@sx;
}
for $x (@x) {
($car, $cty) = (0, $[);
for $y (@y) {
- $prod = $x * $y + $prod[$cty] + $car;
+ $prod = $x * $y + ($prod[$cty] || 0) + $car;
$prod[$cty++] =
$prod - ($car = int($prod * 1e-5)) * 1e5;
}
sub bmod { #(num_str, num_str) return num_str
(&bdiv(@_))[$[+1];
}
-\f
+
sub bdiv { #(dividend: num_str, divisor: num_str) return num_str
local (*x, *y); ($x, $y) = (&bnorm($_[$[]), &bnorm($_[$[+1]));
return wantarray ? ('NaN','NaN') : 'NaN'
}
1;
+__END__
+
+=head1 NAME
+
+Math::BigInt - Arbitrary size integer math package
+
+=head1 SYNOPSIS
+
+ use Math::BigInt;
+ $i = Math::BigInt->new($string);
+
+ $i->bneg return BINT negation
+ $i->babs return BINT absolute value
+ $i->bcmp(BINT) return CODE compare numbers (undef,<0,=0,>0)
+ $i->badd(BINT) return BINT addition
+ $i->bsub(BINT) return BINT subtraction
+ $i->bmul(BINT) return BINT multiplication
+ $i->bdiv(BINT) return (BINT,BINT) division (quo,rem) just quo if scalar
+ $i->bmod(BINT) return BINT modulus
+ $i->bgcd(BINT) return BINT greatest common divisor
+ $i->bnorm return BINT normalization
+
+=head1 DESCRIPTION
+
+All basic math operations are overloaded if you declare your big
+integers as
+
+ $i = new Math::BigInt '123 456 789 123 456 789';
+
+
+=over 2
+
+=item Canonical notation
+
+Big integer value are strings of the form C</^[+-]\d+$/> with leading
+zeros suppressed.
+
+=item Input
+
+Input values to these routines may be strings of the form
+C</^\s*[+-]?[\d\s]+$/>.
+
+=item Output
+
+Output values always always in canonical form
+
+=back
+
+Actual math is done in an internal format consisting of an array
+whose first element is the sign (/^[+-]$/) and whose remaining
+elements are base 100000 digits with the least significant digit first.
+The string 'NaN' is used to represent the result when input arguments
+are not numbers, as well as the result of dividing by zero.
+
+=head1 EXAMPLES
+
+ '+0' canonical zero value
+ ' -123 123 123' canonical value '-123123123'
+ '1 23 456 7890' canonical value '+1234567890'
+
+
+=head1 Autocreating constants
+
+After C<use Math::BigInt ':constant'> all the integer decimal constants
+in the given scope are converted to C<Math::BigInt>. This convertion
+happens at compile time.
+
+In particular
+
+ perl -MMath::BigInt=:constant -e 'print 2**100'
+
+print the integer value of C<2**100>. Note that without convertion of
+constants the expression 2**100 will be calculatted as floating point number.
+
+=head1 BUGS
+
+The current version of this module is a preliminary version of the
+real thing that is currently (as of perl5.002) under development.
+
+=head1 AUTHOR
+
+Mark Biggar, overloaded interface by Ilya Zakharevich.
+
+=cut