#!/usr/bin/perl -w
# Copyright 2011, 2012, 2013, 2014, 2015, 2016 Kevin Ryde
# This file is part of Math-PlanePath.
#
# Math-PlanePath is free software; you can redistribute it and/or modify it
# under the terms of the GNU General Public License as published by the Free
# Software Foundation; either version 3, or (at your option) any later
# version.
#
# Math-PlanePath is distributed in the hope that it will be useful, but
# WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
# or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
# for more details.
#
# You should have received a copy of the GNU General Public License along
# with Math-PlanePath. If not, see <http://www.gnu.org/licenses/>.
use 5.004;
use strict;
use Test;
plan tests => 349;
use lib 't';
use MyTestHelpers;
BEGIN { MyTestHelpers::nowarnings(); }
# uncomment this to run the ### lines
# use Smart::Comments;
require Math::PlanePath::PythagoreanTree;
#------------------------------------------------------------------------------
# VERSION
{
my $want_version = 124;
ok ($Math::PlanePath::PythagoreanTree::VERSION, $want_version,
'VERSION variable');
ok (Math::PlanePath::PythagoreanTree->VERSION, $want_version,
'VERSION class method');
ok (eval { Math::PlanePath::PythagoreanTree->VERSION($want_version); 1 },
1,
"VERSION class check $want_version");
my $check_version = $want_version + 1000;
ok (! eval { Math::PlanePath::PythagoreanTree->VERSION($check_version); 1 },
1,
"VERSION class check $check_version");
my $path = Math::PlanePath::PythagoreanTree->new;
ok ($path->VERSION, $want_version, 'VERSION object method');
ok (eval { $path->VERSION($want_version); 1 },
1,
"VERSION object check $want_version");
ok (! eval { $path->VERSION($check_version); 1 },
1,
"VERSION object check $check_version");
}
#------------------------------------------------------------------------------
# _n_to_digits_lowtohigh() on 53-bits
my $have_53bits;
{
my $bit16 = (1 << 16);
my $bit63 = (1 << 15)*$bit16*$bit16*$bit16;
my $ffs = $bit63 - 1;
### $ffs
### ffs: sprintf '%b', $ffs
my $mod = $ffs % 2;
$have_53bits = ($mod == 1 ? 1 : 0);
}
my $skip_less_than_53bits = ($have_53bits ? undef
: 'skip due to no 53-bit integers');
MyTestHelpers::diag ("have_53bits: ", $have_53bits);
{
# depth=34
# Nrow = (3^depth + 1) / 2 = 8338590849833285
# offset = 2^53-1 - 8338590849833285 = 668608404907706
# ternary "00001101211011001220022202002022022100101"
#
my $want_str = reverse "0010020200100100011022211200212222";
my $F32 = 0xFFFF_FFFF;
my $F21 = (1 << 21) - 1;
my $n = ($F21 << 32) | $F32; # 2^53-1
my $digits = Math::PlanePath::PythagoreanTree::_n_to_digits_lowtohigh($n);
foreach my $digit (@$digits) {
if (! defined $digit) { $digit = '0'; } # mutate array
}
my $got_str = join('', @$digits);
skip ($skip_less_than_53bits,
$got_str, $want_str, "n=$n");
}
#------------------------------------------------------------------------------
# _n_to_digits_lowtohigh()
{
my @data = ([ 1, '' ],
[ 2, '0' ],
[ 3, '1' ],
[ 4, '2' ],
[ 5, '0,0' ],
[ 6, '1,0' ],
[ 7, '2,0' ],
[ 11, '0,2' ],
[ 12, '1,2' ],
[ 13, '2,2' ],
[ 14, '0,0,0' ],
[ 15, '1,0,0' ],
[ 16, '2,0,0' ],
[ 17, '0,1,0' ],
[ 38, '0,2,2' ],
[ 39, '1,2,2' ],
[ 40, '2,2,2' ],
[ 41, '0,0,0,0' ],
[ 42, '1,0,0,0' ],
);
my $path = Math::PlanePath::PythagoreanTree->new;
foreach my $elem (@data) {
my ($n, $want_str) = @$elem;
my $digits = Math::PlanePath::PythagoreanTree::_n_to_digits_lowtohigh($n);
foreach my $digit (@$digits) {
if (! defined $digit) { $digit = '0'; } # mutate array
}
my $got_str = join(',', @$digits);
ok ($got_str, $want_str, "n=$n");
}
}
#------------------------------------------------------------------------------
# _sc_to_pq()
{
my ($p,$q) = Math::PlanePath::PythagoreanTree::_sc_to_pq(3,5);
ok($p,2);
ok($q,1);
}
{
my ($p,$q) = Math::PlanePath::PythagoreanTree::_sc_to_pq(4,5);
ok($p,undef);
ok($q,undef);
}
#------------------------------------------------------------------------------
# ab_to_pq()
# P,Q integers
# A = P^2 - Q^2
# B = 2*P*Q B even
{
require Math::PlanePath::CoprimeColumns;
require Math::PlanePath::GcdRationals;
my $bad = 0;
foreach my $a (-16 .. 50) {
foreach my $b (-4 .. 50) {
my @pq = Math::PlanePath::PythagoreanTree::_ab_to_pq($a,$b);
unless (@pq == 0 || @pq == 2) {
MyTestHelpers::diag ("bad, return not 0 or 2 values");
$bad++;
}
my $have_pq = (scalar(@pq) ? 1 : 0);
my ($p,$q) = @pq;
if ($have_pq && ! ab_is_triple_with_b_even($a,$b)) {
MyTestHelpers::diag ("oops, a=$a,b=$b not b-even triple, gives p=",$p,",q=",$q);
$bad++;
}
# if ($have_pq != ab_is_triple_with_b_even($a,$b)) {
# MyTestHelpers::diag ("ahh, a=$a,b=$b gives p=",$p,",q=",$q);
# $bad++;
# }
if ($have_pq) {
# unless ($p >= $q) {
# MyTestHelpers::diag ("bad, a=$a,b=$b gives p=$p,q=$q not p>=q");
# $bad++;
# }
unless ($q >= 0) {
MyTestHelpers::diag ("bad, a=$a,b=$b gives p=$p,q=$q not q>=0");
$bad++;
}
unless ($p == int($p)) {
MyTestHelpers::diag ("bad, a=$a,b=$b gives non-integer p=$p");
$bad++;
}
unless ($q == int($q)) {
MyTestHelpers::diag ("bad, a=$a,b=$b gives non-integer q=$q");
$bad++;
}
# unless (Math::PlanePath::CoprimeColumns::_coprime($p,$q)) {
# my $gcd = Math::PlanePath::GcdRationals::_gcd($p,$q);
# MyTestHelpers::diag ("bad, a=$a,b=$b gives p=$p,q=$q not coprime, gcd=$gcd");
# $bad++;
# }
}
if ($a >= 0 && ab_is_oddeven_primitive_triple($a,$b)) {
unless (defined $p && defined $q) {
MyTestHelpers::diag ("bad, a=$a,b=$b doesn't give p,q");
$bad++;
}
} else {
# Some non-primitive pass _ab_to_pq(), some do not.
# if (defined $p || defined $q) {
# my $gcd = Math::PlanePath::GcdRationals::_gcd($p,$q);
# MyTestHelpers::diag ("bad, a=$a,b=$b not primitive triple but gives p=$p,q=$q (with gcd=$gcd)");
# $bad++;
# }
}
}
}
ok ($bad, 0);
sub ab_is_oddeven_primitive_triple {
my ($a,$b) = @_;
unless (($a & 1) && !($b & 1)) { # must have A odd, B even
return 0;
}
unless (ab_is_triple($a,$b)) {
return 0;
}
return Math::PlanePath::CoprimeColumns::_coprime($a,$b);
}
sub ab_is_triple {
my ($a,$b) = @_;
if ($b < 0) {
return 0;
}
my $csquared = $a*$a + $b*$b;
my $c = int(sqrt($csquared));
return ($c*$c == $csquared);
}
sub ab_is_triple_with_b_even {
my ($a,$b) = @_;
return ab_is_triple($a,$b) && (($b & 1) == 0);
}
}
#------------------------------------------------------------------------------
# n_start, x_negative, y_negative
{
my $path = Math::PlanePath::PythagoreanTree->new;
ok ($path->n_start, 1, 'n_start()');
ok ($path->x_negative, 0, 'x_negative()');
ok ($path->y_negative, 0, 'y_negative()');
}
{
my @pnames = map {$_->{'name'}}
Math::PlanePath::PythagoreanTree->parameter_info_list;
ok (join(',',@pnames), 'tree_type,coordinates,digit_order');
}
#------------------------------------------------------------------------------
# tree_n_parent()
{
my @data = ([ 1, undef ],
[ 2, 1 ],
[ 3, 1 ],
[ 4, 1 ],
[ 5, 2 ],
[ 6, 2 ],
[ 7, 2 ],
[ 8, 3 ],
[ 9, 3 ],
[ 10, 3 ],
[ 11, 4 ],
[ 12, 4 ],
[ 13, 4 ],
);
my $path = Math::PlanePath::PythagoreanTree->new;
foreach my $elem (@data) {
my ($n, $want_n_parent) = @$elem;
my $got_n_parent = $path->tree_n_parent ($n);
ok ($got_n_parent, $want_n_parent);
}
}
#------------------------------------------------------------------------------
# tree_n_children()
{
my @data = ([ 1, '2,3,4' ],
[ 2, '5,6,7' ],
[ 3, '8,9,10' ],
[ 4, '11,12,13' ],
[ 5, '14,15,16' ],
[ 6, '17,18,19' ],
[ 7, '20,21,22' ],
);
my $path = Math::PlanePath::PythagoreanTree->new;
foreach my $elem (@data) {
my ($n, $want_n_children) = @$elem;
my $got_n_children = join(',',$path->tree_n_children($n));
ok ($got_n_children, $want_n_children, "tree_n_children($n)");
}
}
#------------------------------------------------------------------------------
# n_to_xy(), xy_to_n()
# my $path = Math::PlanePath::PythagoreanTree->new;
# print $path->tree_depth_to_n(5); exit;
#
foreach my $group
([ [], # default tree_type => 'UAD', coordinates => 'AB'
[ 1, 3,4 ],
[ 2, 5,12 ],
[ 3, 21,20 ],
[ 4, 15,8 ],
[ 5, 7,24 ],
[ 6, 55,48 ],
[ 7, 45,28 ],
[ 8, 39,80 ],
[ 9, 119,120 ],
[ 10, 77,36 ],
[ 11, 33,56 ],
[ 12, 65,72 ],
[ 13, 35,12 ],
[ undef, 27,36 ],
[ undef, 45,108 ],
[ undef, 63,216 ],
[ undef, 75,100 ],
[ undef, 81,360 ],
],
# example from Jerzy Kocik "Cliffor Algebras and Euclid's
# Parameterization of Pythagorean Triples"
[ [coordinates => 'AB'],
# URLLU in Hall lettering
# reverse 10021 = 88, plus row start 122 = 210
[ 122 + (((1*3 + 0)*3 + 0)*3 + 2)*3 + 1, 3115,3348 ],
],
[ [coordinates => 'AC'],
[ 122 + (((1*3 + 0)*3 + 0)*3 + 2)*3 + 1, 3115,4573 ],
],
[ [ tree_type => 'UAD', coordinates => 'PQ' ],
[ 1, 2,1 ],
[ 2, 3,2 ],
[ 3, 5,2 ],
[ 4, 4,1 ],
[ 5, 4,3 ],
[ 6, 8,3 ],
[ 7, 7,2 ],
[ 8, 8,5 ],
[ 9, 12,5 ],
[ 10, 9,2 ],
[ 11, 7,4 ],
[ 12, 9,4 ],
[ 13, 6,1 ],
],
[ [ tree_type => 'FB' ],
[ 1, 3,4 ],
[ 2, 5,12 ],
[ 3, 15,8 ],
[ 4, 7,24 ],
[ 5, 9,40 ],
[ 6, 35,12 ],
[ 7, 11,60 ],
[ 8, 21,20 ],
[ 9, 55,48 ],
[ 10, 39,80 ],
[ 11, 13,84 ],
[ 12, 63,16 ],
[ 13, 15,112 ],
],
[ [ tree_type => 'FB', coordinates => 'PQ' ],
[ 1, 2,1 ],
[ 2, 3,2 ], # K1
[ 3, 4,1 ], # K2
[ 4, 4,3 ], # K3
[ 5, 5,4 ],
[ 6, 6,1 ],
[ 7, 6,5 ],
[ 8, 5,2 ],
[ 9, 8,3 ],
[ 10, 8,5 ],
[ 11, 7,6 ],
[ 12, 8,1 ],
[ 13, 8,7 ],
],
[ [ coordinates => 'AC' ],
[ 1, 3,5 ],
],
[ [ coordinates => 'BC' ],
[ 1, 4,5 ],
],
) {
my ($options, @data) = @$group;
my $path = Math::PlanePath::PythagoreanTree->new (@$options);
foreach my $elem (@data) {
my ($n, $want_x, $want_y) = @$elem;
next unless defined $n;
my ($got_x, $got_y) = $path->n_to_xy ($n);
ok ($got_x, $want_x, "x at n=$n options=@$options");
ok ($got_y, $want_y, "y at n=$n options=@$options");
}
foreach my $elem (@data) {
my ($want_n, $x, $y) = @$elem;
my $got_n = $path->xy_to_n ($x, $y);
ok ($got_n, $want_n, "n at x=$x,y=$y options=@$options");
}
foreach my $elem (@data) {
my ($n, $x, $y) = @$elem;
next unless defined $n;
my ($got_nlo, $got_nhi) = $path->rect_to_n_range (0,0, $x,$y);
ok ($got_nlo <= $n, 1, "rect_to_n_range() nlo=$got_nlo at n=$n,x=$x,y=$y");
ok ($got_nhi >= $n, 1, "rect_to_n_range() nhi=$got_nhi at n=$n,x=$x,y=$y");
}
}
#------------------------------------------------------------------------------
# xy_to_n() distinct n
foreach my $options ([tree_type => 'UAD', coordinates => 'AB'],
[tree_type => 'UAD', coordinates => 'AC'],
[tree_type => 'UAD', coordinates => 'BC'],
[tree_type => 'UAD', coordinates => 'PQ'],
[tree_type => 'FB', coordinates => 'AB'],
[tree_type => 'FB', coordinates => 'AC'],
[tree_type => 'FB', coordinates => 'BC'],
[tree_type => 'FB', coordinates => 'PQ']) {
my $path = Math::PlanePath::PythagoreanTree->new (@$options);
my $bad = 0;
my %seen;
my $xlo = -2;
my $xhi = 25;
my $ylo = -2;
my $yhi = 20;
my ($nlo, $nhi) = $path->rect_to_n_range($xlo,$ylo, $xhi,$yhi);
my $count = 0;
OUTER: for (my $x = $xlo; $x <= $xhi; $x++) {
for (my $y = $ylo; $y <= $yhi; $y++) {
my $n = $path->xy_to_n ($x,$y);
next if ! defined $n; # sparse
# avoid overflow when N becomes big
if ($n >= 2**32) {
MyTestHelpers::diag ("x=$x,y=$y n=$n, oops, meant to keep below 2^32");
last if $bad++ > 10;
next;
}
if ($seen{$n}) {
MyTestHelpers::diag ("x=$x,y=$y n=$n seen before at $seen{$n}");
last if $bad++ > 10;
}
if ($n < $nlo) {
MyTestHelpers::diag ("x=$x,y=$y n=$n below nlo=$nlo");
last OUTER if $bad++ > 10;
}
if ($n > $nhi) {
MyTestHelpers::diag ("x=$x,y=$y n=$n above nhi=$nhi");
last OUTER if $bad++ > 10;
}
$seen{$n} = "$x,$y";
$count++;
}
}
ok ($bad, 0, "xy_to_n() coverage and distinct, $count points");
}
exit 0;