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Int.pm
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Int.pm
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my class Rat { ... }
my class X::Numeric::DivideByZero { ... }
my class X::NYI::BigInt { ... }
my class Int { ... }
my subset UInt of Int where {not .defined or $_ >= 0};
my class Int does Real { # declared in BOOTSTRAP
# class Int is Cool
# has bigint $!value is box_target;
multi method WHICH(Int:D:) {
nqp::box_s(
nqp::concat(
nqp::if(
nqp::eqaddr(self.WHAT,Int),
'Int|',
nqp::concat(nqp::unbox_s(self.^name), '|')
),
nqp::tostr_I(self)
),
ObjAt
)
}
multi method new($value) {
# clone to ensure we return a new object for any cached
# numeric constants
$value.Int.clone;
}
multi method perl(Int:D:) {
self.Str;
}
multi method Bool(Int:D:) {
nqp::p6bool(nqp::bool_I(self));
}
method Int() { self }
multi method Str(Int:D:) {
nqp::p6box_s(nqp::tostr_I(self));
}
method Num(Int:D:) {
nqp::p6box_n(nqp::tonum_I(self));
}
method Rat(Int:D: $?) {
Rat.new(self, 1);
}
method FatRat(Int:D: $?) {
FatRat.new(self, 1);
}
method abs(Int:D:) {
nqp::abs_I(self, Int)
}
method Bridge(Int:D:) {
nqp::p6box_n(nqp::tonum_I(self));
}
method chr(Int:D:) {
nqp::if(
nqp::isbig_I(self),
(die "chr codepoint too large: {self}"),
nqp::p6box_s(nqp::chr(nqp::unbox_i(self)))
)
}
method sqrt(Int:D:) { nqp::p6box_n(nqp::sqrt_n(nqp::tonum_I(self))) }
proto method base(|) { * }
multi method base(Int:D: Int:D $base) {
2 <= $base <= 36
?? nqp::p6box_s(nqp::base_I(self,nqp::unbox_i($base)))
!! Failure.new(X::OutOfRange.new(
what => "base argument to base", :got($base), :range<2..36>))
}
multi method base(Int:D: Int(Cool) $base, $digits?) {
2 <= $base <= 36
?? $digits && ! nqp::istype($digits, Whatever)
?? $digits < 0
?? Failure.new(X::OutOfRange.new(
:what('digits argument to base'),:got($digits),:range<0..1073741824>))
!! nqp::p6box_s(nqp::base_I(self,nqp::unbox_i($base)))
~ '.'
~ '0' x $digits
!! nqp::p6box_s(nqp::base_I(self,nqp::unbox_i($base)))
!! Failure.new(X::OutOfRange.new(
:what('base argument to base'),:got($base),:range<2..36>))
}
# If self is Int, we assume mods are Ints also. (div fails otherwise.)
# If do-not-want, user should cast invocant to proper domain.
method polymod(Int:D: +@mods) {
fail X::OutOfRange.new(
:what('invocant to polymod'), :got(self), :range<0..^Inf>
) if self < 0;
gather {
my $more = self;
if @mods.is-lazy {
for @mods -> $mod {
$more
?? $mod
?? take $more mod $mod
!! Failure.new(X::Numeric::DivideByZero.new:
using => 'polymod', numerator => $more)
!! last;
$more = $more div $mod;
}
take $more if $more;
}
else {
for @mods -> $mod {
$mod
?? take $more mod $mod
!! Failure.new(X::Numeric::DivideByZero.new:
using => 'polymod', numerator => $more);
$more = $more div $mod;
}
take $more;
}
}
}
method expmod(Int:D: Int:D \base, Int:D \mod) {
nqp::expmod_I(self, nqp::decont(base), nqp::decont(mod), Int);
}
method is-prime(Int:D: --> Bool:D) {
nqp::p6bool(nqp::isprime_I(self, nqp::unbox_i(100)));
}
method floor(Int:D:) { self }
method ceiling(Int:D:) { self }
proto method round(|) {*}
multi method round(Int:D:) { self }
multi method round(Int:D: Real(Cool) $scale) { (self / $scale + 1/2).floor * $scale }
method lsb(Int:D:) {
return Nil if self == 0;
my $lsb = 0;
my $x = self.abs;
while $x +& 0xff == 0 { $lsb += 8; $x +>= 8; }
while $x +& 0x01 == 0 { $lsb++; $x +>= 1; }
$lsb;
}
method msb(Int:D:) {
return Nil if self == 0;
return 0 if self == -1;
my $msb = 0;
my $x = self;
$x = ($x + 1) * -2 if $x < 0; # handle negative conversions
while $x > 0xff { $msb += 8; $x +>= 8; }
if $x > 0x0f { $msb += 4; $x +>= 4; }
if $x +& 0x8 { $msb += 3; }
elsif $x +& 0x4 { $msb += 2; }
elsif $x +& 0x2 { $msb += 1; }
$msb;
}
method narrow(Int:D:) { self }
method Range(Int:U:) {
given self {
when int { $?BITS == 64 ?? int64.Range !! int32.Range }
when uint { $?BITS == 64 ?? uint64.Range !! uint32.Range }
when int64 { Range.new(-9223372036854775808, 9223372036854775807) }
when int32 { Range.new( -2147483648, 2147483647 ) }
when int16 { Range.new( -32768, 32767 ) }
when int8 { Range.new( -128, 127 ) }
# Bring back in a future Perl 6 version, or just put on the type object
#when int4 { Range.new( -8, 7 ) }
#when int2 { Range.new( -2, 1 ) }
#when int1 { Range.new( -1, 0 ) }
when uint64 { Range.new( 0, 18446744073709551615 ) }
when uint32 { Range.new( 0, 4294967295 ) }
when uint16 { Range.new( 0, 65535 ) }
when uint8 { Range.new( 0, 255 ) }
# Bring back in a future Perl 6 version, or just put on the type object
#when uint4 { Range.new( 0, 15 ) }
#when uint2 { Range.new( 0, 3 ) }
#when uint1 { Range.new( 0, 1 ) }
when Int { # smartmatch matches both UInt and Int
.^name eq 'UInt'
?? Range.new( 0, Inf, :excludes-max )
!! Range.new( -Inf, Inf, :excludes-min, :excludes-max )
}
default {
fail "Unknown integer type: {self.^name}";
}
}
}
}
multi sub prefix:<++>(Int:D $a is rw) {
$a = nqp::add_I(nqp::decont($a), 1, Int);
}
multi sub prefix:<++>(int $a is rw) {
$a = nqp::add_i($a, 1);
}
multi sub prefix:<-->(Int:D $a is rw) {
$a = nqp::sub_I(nqp::decont($a), 1, Int);
}
multi sub prefix:<-->(int $a is rw) {
$a = nqp::sub_i($a, 1);
}
multi sub postfix:<++>(Int:D $a is rw) {
my \b := nqp::decont($a);
$a = nqp::add_I(b, 1, Int);
b
}
multi sub postfix:<++>(int $a is rw) {
my int $b = $a;
$a = nqp::add_i($b, 1);
$b
}
multi sub postfix:<-->(Int:D $a is rw) {
my \b := nqp::decont($a);
$a = nqp::sub_I(b, 1, Int);
b
}
multi sub postfix:<-->(int $a is rw) {
my int $b = $a;
$a = nqp::sub_i($b, 1);
$b
}
multi sub prefix:<->(Int:D \a --> Int:D) {
nqp::neg_I(nqp::decont(a), Int);
}
multi sub prefix:<->(int $a --> int) {
nqp::neg_i($a)
}
multi sub abs(Int:D \a --> Int:D) {
nqp::abs_I(nqp::decont(a), Int);
}
multi sub abs(int $a --> int) {
nqp::abs_i($a)
}
multi sub infix:<+>(Int:D \a, Int:D \b --> Int:D) {
nqp::add_I(nqp::decont(a), nqp::decont(b), Int);
}
multi sub infix:<+>(int $a, int $b --> int) {
nqp::add_i($a, $b)
}
multi sub infix:<->(Int:D \a, Int:D \b --> Int:D) {
nqp::sub_I(nqp::decont(a), nqp::decont(b), Int);
}
multi sub infix:<->(int $a, int $b --> int) {
nqp::sub_i($a, $b)
}
multi sub infix:<*>(Int:D \a, Int:D \b --> Int:D) {
nqp::mul_I(nqp::decont(a), nqp::decont(b), Int);
}
multi sub infix:<*>(int $a, int $b --> int) {
nqp::mul_i($a, $b);
}
multi sub infix:<div>(Int:D \a, Int:D \b) {
b
?? nqp::div_I(nqp::decont(a), nqp::decont(b), Int)
!! Failure.new(X::Numeric::DivideByZero.new(:using<div>, :numerator(a)))
}
multi sub infix:<div>(int $a, int $b --> int) {
# relies on opcode or hardware to detect division by 0
nqp::div_i($a, $b)
}
multi sub infix:<%>(Int:D \a, Int:D \b --> Int:D) {
nqp::if(
nqp::isbig_I(nqp::decont(a)) || nqp::isbig_I(nqp::decont(b)),
nqp::if(
b,
nqp::mod_I(nqp::decont(a),nqp::decont(b),Int),
Failure.new(X::Numeric::DivideByZero.new(:using<%>, :numerator(a)))
),
nqp::if(
nqp::isne_i(b,0),
nqp::mod_i( # quick fix RT #128318
nqp::add_i(nqp::mod_i(nqp::decont(a),nqp::decont(b)),b),
nqp::decont(b)
),
Failure.new(X::Numeric::DivideByZero.new(:using<%>, :numerator(a)))
)
)
}
multi sub infix:<%>(int $a, int $b --> int) {
# relies on opcode or hardware to detect division by 0
nqp::mod_i(nqp::add_i(nqp::mod_i($a,$b),$b),$b) # quick fix RT #128318
}
multi sub infix:<**>(Int:D \a, Int:D \b) {
my $power := nqp::pow_I(nqp::decont(a), nqp::decont(b >= 0 ?? b !! -b), Num, Int);
# when a**b is too big nqp::pow_I returns Inf
nqp::istype($power, Num)
?? Failure.new(
b >= 0 ?? X::Numeric::Overflow.new !! X::Numeric::Underflow.new
) !! b >= 0 ?? $power
!! ($power := 1 / $power) == 0 && a != 0
?? Failure.new(X::Numeric::Underflow.new)
!! $power;
}
multi sub infix:<**>(int $a, int $b --> int) {
nqp::pow_i($a, $b);
}
multi sub infix:<lcm>(Int:D \a, Int:D \b --> Int:D) {
nqp::lcm_I(nqp::decont(a), nqp::decont(b), Int);
}
multi sub infix:<lcm>(int $a, int $b --> int) {
nqp::lcm_i($a, $b)
}
multi sub infix:<gcd>(Int:D \a, Int:D \b --> Int:D) {
nqp::gcd_I(nqp::decont(a), nqp::decont(b), Int);
}
multi sub infix:<gcd>(int $a, int $b --> int) {
nqp::gcd_i($a, $b)
}
multi sub infix:<===>(Int:D \a, Int:D \b) {
nqp::p6bool(
nqp::eqaddr(a.WHAT,b.WHAT)
&& nqp::iseq_I(nqp::decont(a), nqp::decont(b))
)
}
multi sub infix:<===>(int $a, int $b) {
# hey, the optimizer is smart enough to figure that one out for us, no?
$a == $b
}
multi sub infix:<==>(Int:D \a, Int:D \b) {
nqp::p6bool(nqp::iseq_I(nqp::decont(a), nqp::decont(b)))
}
multi sub infix:<==>(int $a, int $b) {
nqp::p6bool(nqp::iseq_i($a, $b))
}
multi sub infix:<!=>(int $a, int $b) {
nqp::p6bool(nqp::isne_i($a, $b))
}
multi sub infix:«<»(Int:D \a, Int:D \b) {
nqp::p6bool(nqp::islt_I(nqp::decont(a), nqp::decont(b)))
}
multi sub infix:«<»(int $a, int $b) {
nqp::p6bool(nqp::islt_i($a, $b))
}
multi sub infix:«<=»(Int:D \a, Int:D \b) {
nqp::p6bool(nqp::isle_I(nqp::decont(a), nqp::decont(b)))
}
multi sub infix:«<=»(int $a, int $b) {
nqp::p6bool(nqp::isle_i($a, $b))
}
multi sub infix:«>»(Int:D \a, Int:D \b) {
nqp::p6bool(nqp::isgt_I(nqp::decont(a), nqp::decont(b)))
}
multi sub infix:«>»(int $a, int $b) {
nqp::p6bool(nqp::isgt_i($a, $b))
}
multi sub infix:«>=»(Int:D \a, Int:D \b) {
nqp::p6bool(nqp::isge_I(nqp::decont(a), nqp::decont(b)))
}
multi sub infix:«>=»(int $a, int $b) {
nqp::p6bool(nqp::isge_i($a, $b))
}
multi sub infix:<+|>(Int:D \a, Int:D \b) {
nqp::bitor_I(nqp::decont(a), nqp::decont(b), Int)
}
#multi sub infix:<+|>(int $a, int $b) { RT#128655
# nqp::bitor_i($a, $b)
#}
multi sub infix:<+&>(Int:D \a, Int:D \b) {
nqp::bitand_I(nqp::decont(a), nqp::decont(b), Int)
}
#multi sub infix:<+&>(int $a, int $b) { RT#128655
# nqp::bitand_i($a, $b)
#}
multi sub infix:<+^>(Int:D \a, Int:D \b) {
nqp::bitxor_I(nqp::decont(a), nqp::decont(b), Int)
}
#multi sub infix:<+^>(int $a, int $b) { RT#128655
# nqp::bitxor_i($a, $b);
#}
multi sub infix:«+<»(Int:D \a, Int:D \b --> Int:D) {
nqp::isbig_I(nqp::decont(b))
?? Failure.new(X::NYI::BigInt.new(:op('+<'),:big(b)))
!! nqp::bitshiftl_I(nqp::decont(a), nqp::unbox_i(b), Int)
}
#multi sub infix:«+<»(int $a, int $b) { RT#128655
# nqp::bitshiftl_i($a, $b);
#}
multi sub infix:«+>»(Int:D \a, Int:D \b --> Int:D) {
nqp::isbig_I(nqp::decont(b))
?? Failure.new(X::NYI::BigInt.new(:op('+>'),:big(b)))
!! a < 0 && b > 31
?? -1 # temp fix for RT#126942, remove if fixed otherwise
!! nqp::bitshiftr_I(nqp::decont(a), nqp::unbox_i(b), Int)
}
#multi sub infix:«+>»(int $a, int $b) { RT#128655
# nqp::bitshiftr_i($a, $b)
#}
multi sub prefix:<+^>(Int:D \a) {
nqp::bitneg_I(nqp::decont(a), Int);
}
#multi sub prefix:<+^>(int $a) { RT#128655
# nqp::bitneg_i($a);
#}
proto sub chr($) is pure {*}
multi sub chr(Int:D \x --> Str:D) { x.chr }
multi sub chr(Cool \x --> Str:D) { x.Int.chr }
multi sub chr(int $x --> str) {
nqp::chr($x);
}
proto sub is-prime($) is pure {*}
multi sub is-prime(Int:D \i) {
nqp::p6bool(nqp::isprime_I(nqp::decont(i), nqp::unbox_i(100)));
}
multi sub is-prime(\i) {
i == i.floor
&& nqp::p6bool(nqp::isprime_I(nqp::decont(i.Int), nqp::unbox_i(100)));
}
proto sub expmod($, $, $) is pure {*}
multi sub expmod(Int:D \base, Int:D \exp, Int:D \mod) {
nqp::expmod_I(nqp::decont(base), nqp::decont(exp), nqp::decont(mod), Int);
}
multi sub expmod(\base, \exp, \mod) {
nqp::expmod_I(nqp::decont(base.Int), nqp::decont(exp.Int), nqp::decont(mod.Int), Int);
}
proto sub lsb($) {*}
multi sub lsb(Int:D \i) { i.lsb }
proto sub msb($) {*}
multi sub msb(Int:D \i) { i.msb }
# vim: ft=perl6 expandtab sw=4