#!/usr/bin/perl -w
# Copyright 2011, 2012, 2013, 2014 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 POSIX ();
use Math::Trig 'pi';
use Math::PlanePath::SierpinskiCurve;
# uncomment this to run the ### lines
# use Smart::Comments;
# Nlevel A146882 5*(4^(n+1)-1)/3 = 5*A002450
# =for Test-Pari-DEFINE Ytop(k,L) = if(k==0,0, (L+2)*2^(k-1) - 2)
#
# =for Test-Pari Ytop(0,1) == 0
#
# =for Test-Pari Ytop(1,1) == 1
#
# =for Test-Pari Ytop(2,1) == 4
#
# =for Test-Pari Ytop(3,1) == 10
#
# Ytop[k] = / 0 if k = 0
# \ (L+2)*2^(k-1) - 2 if k > 0
# = 0, 1, 4, 10, 22, 46, 94, 190, ...
# for L=1
#
# This is the same as C<SierpinskiCurve> but
#
# Nlevel = ((3L+2)*4^level - 5) / 3
# Nlevel = 4^level - 1 + ((3L+2)*4^level - 5) / 3 - 4^level + 1
# Nlevel = 4^level - 1 + ((3L+2)*4^level - 5 - 3*4^level + 3) / 3
# Nlevel = 4^level - 1 + ((3L-1)*4^level - 2) / 3
#
#
#
# For C<diagonal_length> = L and reckoning the first diagonal side N=0 to N=2L
# as level 0, a level extends out to a triangle
#
# Nlevel = ((6L+4)*4^level - 4) / 3
# Xlevel = (L+2)*2^level - 1
#
# For example level 2 in the default L=1 goes to N=((6*1+4)*4^2-4)/3=52 and
# Xlevel=(1+2)*2^2-1=11. Or in the L=4 sample above level 1 is
# N=((6*4+4)*4^1-4)/3=36 and Xlevel=(4+2)*2^1-1=11.
#
# The power-of-4 in Nlevel is per the plain C<SierpinskiCurve>, with factor
# 2L+1 for the points making the diagonal stair. The "/3" arises from the
# extra points between replications. They become a power-of-4 series
#
# Nextras = 1+4+4^2+...+4^(level-1) = (4^level-1)/3
#
# For example level 1 is Nextras=(4^1-1)/3=1, being point N=6 in the default
# L=1. Or for level 2 Nextras=(4^2-1)/3=5 at N=6 and N=19,26,33,46.
{
# between two curves
# (13*4^k - 7)/3
# = 2 15 67 275 1107 4435 17747 70995 283987 1135955
# not in OEIS
# area=2 initial diamond is level=0
require Math::Geometry::Planar;
my $path = Math::PlanePath::SierpinskiCurve->new (arms => 2);
my @values;
foreach my $level (0 .. 8) {
my $n_hi = 4**($level+1) - 1;
my @points;
for (my $n = 0; $n <= $n_hi; $n+=2) {
my ($x,$y) = $path->n_to_xy($n);
push @points, [$x,$y];
}
for (my $n = $n_hi; $n >= 0; $n-=2) {
my ($x,$y) = $path->n_to_xy($n);
push @points, [$x,$y];
}
### @points
my $polygon = Math::Geometry::Planar->new;
$polygon->points(\@points);
my $area = $polygon->area;
my $length = $polygon->perimeter;
my $formula = two_area_by_formula($level);
print "$level $length area $area $formula\n";
push @values, $area;
}
shift @values;
require Math::OEIS::Grep;
Math::OEIS::Grep->search(array => \@values);
exit 0;
sub two_area_by_formula {
my ($k) = @_;
return (13*4**$k - 7) / 3;
$k++;
return (27*4**($k-1) - 18*2**($k-1) -14 * 4**($k-1) + 18 * 2**($k-1) - 4) / 3 - 1;
return 9*4**($k-1) - 6*2**($k-1) + (-14 * 4**($k-1) + 18 * 2**($k-1) - 4) / 3 - 1;
return 9*4**($k-1) - 6*2**($k-1) - (14 * 4**($k-1) - 18 * 2**($k-1) + 4) / 3 - 1;
return 9*2**(2*$k-2) - 2*3*2**($k-1) + 1 - (14 * 4**($k-1) - 18 * 2**($k-1) + 4) / 3 - 2;
return (3*2**($k-1) - 1)**2 - (14 * 4**($k-1) - 18 * 2**($k-1) + 4) / 3 - 2;
return (3*2**($k-1) - 1)**2 - 4*(7 * 4**($k-1) - 9 * 2**($k-1) + 2) / 6 - 2;
return (3*2**($k-1) - 2 + 1)**2 - 4*((7 * 4**($k-1) - 9 * 2**($k-1) + 2) / 6) - 2;
return (3*2**($k-1) - 2 + 1)**2 - 4*area_by_formula($k-1) - 2;
}
}
{
# area under the curve
# (7*4^k - 9*2^k + 2)/6
#
require Math::Geometry::Planar;
my $path = Math::PlanePath::SierpinskiCurve->new;
my @values;
foreach my $level (1 .. 10) {
my ($n_lo, $n_hi) = $path->level_to_n_range($level);
my @points;
foreach my $n ($n_lo .. $n_hi) {
my ($x,$y) = $path->n_to_xy($n);
push @points, [$x,$y];
}
my $polygon = Math::Geometry::Planar->new;
$polygon->points(\@points);
my $area = $polygon->area;
my $length = $polygon->perimeter;
my $formula = area_by_formula($level);
print "$level $length area $area $formula\n";
push @values, $area;
}
shift @values;
require Math::OEIS::Grep;
Math::OEIS::Grep->search(array => \@values);
exit 0;
sub area_by_formula {
my ($k) = @_;
if ($k == 0) { return 0; }
return (7 * 4**$k - 9 * 2**$k + 2) / 6;
return (28 * 4**($k-1) - 18 * 2**($k-1) + 2) / 6;
{
return (
4**($k-1) * 6
- 4**($k-1) + 1
+ 9*4**($k-1) - 9*2**($k-1)
)/3;
}
{
return (
(4**($k-1) * 6 - 4**($k-1) + 1)/3
+ 3*4**($k-1) - 3*2**($k-1));
}
{
return (4**($k-1) * 2
- (4**($k-1) - 1)/3
+ 3*2* (4**($k-1) - 2**($k-1))/(4-2));
}
{
# i=k-2
# = 2*4^(k-1) + 3*2 * sum 4^i * 2^(k-2-i) - (4^(k-1) - 1)/3
# i=0
# = 2*4^(k-1) + 3*2 * (4^(k-1) - 2^(k-1))/(4-2) - (4^(k-2) - 1)/3
if ($k == 1) { return 2; }
my $total = 4**($k-1) * 2;
$total -= (4**($k-1) - 1)/3;
$total += 3*2* (4**($k-1) - 2**($k-1))/(4-2);
return $total;
}
{
# i=k-2
# = 2*4^(k-1) + 3*2^2 * sum 4^i * 2^(k-3-i) - (4^(k-1) - 1)/3
# i=0
# = 2*4^(k-1) + 3*2^2 * (4^(k-1) - 2^(k-1))/(4-2) - (4^(k-2) - 1)/3
if ($k == 1) { return 2; }
my $total = 4**($k-1) * 2;
$total -= (4**($k-1) - 1)/3;
foreach my $i (0 .. $k-2) {
$total += 4**$i * (3 * 2**($k-1-$i));
}
return $total;
}
{
# A(2) = 4*A(1) + (3*2^(1) - 1)
# = (3*2^(k-1) - 1) 0 + k-1 = k-1
# + 4 *(3*2^(k-2) - 1) 1 + k-2 = k-1
# + 4^2*(3*2^(k-3) - 1) 2 + k-2 = k-1
# + ...
# + 4^(k-3)*(3*2^(2) - 1) Ytop(2) k-3 + 2 = k-1
# + 4^(k-2)*A(1)
# i=k-2
# = 2*4^(k-1) + sum 4^i * (3*2^(k-1-i) - 1)
# i=0
if ($k == 1) { return 2; }
my $total = 4**($k-1) * 2;
foreach my $i (0 .. $k-2) {
$total += 4**$i * (3 * 2**($k-1-$i) - 1);
}
return $total;
}
{
# A(k) = 4*A(k-1) + Ytop(k) + 1 k >= 2
# A(1) = 2
# A(0) = 0
# Ytop(k) = 3*2^(k-1) - 2
# A(k) = 4*A(k-1) + 3*2^(k-1) - 1
#
if ($k == 1) { return 2; }
return 4*area_by_formula($k-1) + 3 * 2**($k-1) - 1;
}
}
}
{
# Y coordinate sequence
require Math::NumSeq::PlanePathCoord;
my $seq = Math::NumSeq::PlanePathCoord->new (planepath => 'SierpinskiCurve',
coordinate_type => 'Sum');
my @values;
for (1 .. 500) {
my ($i,$value) = $seq->next;
push @values, $value-1;
}
unduplicate(\@values);
print "values: ", join(',', @values), "\n";
require Math::OEIS::Grep;
Math::OEIS::Grep->search(array => \@values, verbose => 1);
exit 0;
sub unduplicate {
my ($aref) = @_;
my $i = 1;
while ($i < $#$aref) {
if ($aref->[$i] == $aref->[$i-1]) {
splice @$aref, $i, 1;
} else {
$i++;
}
}
}
}
{
# dSumAbs
require Math::NumSeq::PlanePathDelta;
my $seq = Math::NumSeq::PlanePathDelta->new (planepath => 'SierpinskiCurveStair,arms=6',
delta_type => 'dSumAbs');
for (1 .. 300) {
my ($i,$value) = $seq->next;
print "$value,";
if ($i % 6 == 5) {
print "\n";
}
}
exit 0;
}
{
# A156595 Mephisto Waltz first diffs xor as turns
require Tk;
require Tk::CanvasLogo;
require Math::NumSeq::MephistoWaltz;
my $top = MainWindow->new;
my $width = 1200;
my $height = 800;
my $logo = $top->CanvasLogo(-width => $width, -height => $height)->pack;
my $turtle = $logo->NewTurtle('foo');
$turtle->LOGO_PU();
$turtle->LOGO_FD(- $height/2*.9);
$turtle->LOGO_PD();
my $step = 5;
$turtle->LOGO_FD($step);
my $seq = Math::NumSeq::MephistoWaltz->new;
my ($i,$prev) = $seq->next;
for (;;) {
my ($i,$value) = $seq->next;
my $turn = $value ^ $prev;
$prev = $value;
last if $i > 10000;
if ($turn) {
$turtle->LOGO_FD($step);
if ($i & 1) {
$turtle->LOGO_RT(120);
} else {
$turtle->LOGO_LT(120);
}
} else {
$turtle->LOGO_FD($step);
}
$logo->createArc($turtle->{x}+2, $turtle->{y}+2,
$turtle->{x}-2, $turtle->{y}-2);
}
Tk::MainLoop();
exit;
}
{
# dX,dY
require Math::PlanePath::SierpinskiCurve;
my $path = Math::PlanePath::SierpinskiCurve->new;
foreach my $n (0 .. 32) {
# my $n = $n + 1/256;
my ($x,$y) = $path->n_to_xy($n);
my ($x2,$y2) = $path->n_to_xy($n+1);
my $sx = $x2-$x;
my $sy = $y2-$y;
my $sdir = dxdy_to_dir8($sx,$sy);
my ($dx,$dy) = $path->_WORKING_BUT_HAIRY__n_to_dxdy($n);
my $ddir = dxdy_to_dir8($dx,$dy);
my $diff = ($dx != $sx || $dy != $sy ? ' ***' : '');
print "$n $x,$y $sx,$sy\[$sdir] $dx,$dy\[$ddir]$diff\n";
}
# return 0..7
sub dxdy_to_dir8 {
my ($dx, $dy) = @_;
return atan2($dy,$dx) / atan2(1,1);
if ($dx == 1) {
if ($dy == 1) { return 1; }
if ($dy == 0) { return 0; }
if ($dy == -1) { return 7; }
}
if ($dx == 0) {
if ($dy == 1) { return 2; }
if ($dy == -1) { return 6; }
}
if ($dx == -1) {
if ($dy == 1) { return 3; }
if ($dy == 0) { return 4; }
if ($dy == -1) { return 5; }
}
die 'oops';
}
exit 0;
}
{
# Mephisto Waltz 1/12 slice of plane
require Tk;
require Tk::CanvasLogo;
require Math::NumSeq::MephistoWaltz;
my $top = MainWindow->new;
my $width = 1000;
my $height = 800;
my $logo = $top->CanvasLogo(-width => $width, -height => $height)->pack;
my $turtle = $logo->NewTurtle('foo');
$turtle->LOGO_RT(45);
$turtle->LOGO_PU();
$turtle->LOGO_FD(- $height*sqrt(2)/2*.9);
$turtle->LOGO_PD();
$turtle->LOGO_RT(135);
$turtle->LOGO_LT(30);
my $step = 5;
$turtle->LOGO_FD($step);
my $seq = Math::NumSeq::MephistoWaltz->new;
for (;;) {
my ($i,$value) = $seq->next;
last if $i > 10000;
if ($value) {
$turtle->LOGO_RT(60);
$turtle->LOGO_FD($step);
} else {
$turtle->LOGO_LT(60);
$turtle->LOGO_FD($step);
}
}
Tk::MainLoop();
exit;
}
{
require Tk;
require Tk::CanvasLogo;
require Math::NumSeq::PlanePathTurn;
my $top = MainWindow->new();
my $logo = $top->CanvasLogo->pack;
my $turtle = $logo->NewTurtle('foo');
my $seq = Math::NumSeq::PlanePathTurn->new
(planepath => 'KochCurve',
turn_type => 'Left');
$turtle->LOGO_RT(45);
$turtle->LOGO_FD(10);
for (;;) {
my ($i,$value) = $seq->next;
last if $i > 64;
if ($value) {
$turtle->LOGO_RT(45);
$turtle->LOGO_FD(10);
$turtle->LOGO_RT(45);
$turtle->LOGO_FD(10);
} else {
$turtle->LOGO_LT(90);
$turtle->LOGO_FD(10);
$turtle->LOGO_LT(90);
$turtle->LOGO_FD(10);
}
}
Tk::MainLoop();
exit;
}
{
# filled fraction
require Math::PlanePath::SierpinskiCurve;
require Number::Fraction;
my $path = Math::PlanePath::SierpinskiCurve->new;
foreach my $level (1 .. 20) {
my $Ntop = 4**$level / 2 - 1;
my ($x,$y) = $path->n_to_xy($Ntop);
my $Xtop = 3*2**($level-1) - 1;
$x == $Xtop or die "x=$x Xtop=$Xtop";
my $frac = $Ntop / ($x*($x-1)/2);
print " $level $frac\n";
}
my $nf = Number::Fraction->new(4,9);
my $limit = $nf->to_num;
print " limit $nf = $limit\n";
exit 0;
}
{
# filled fraction
require Math::PlanePath::SierpinskiCurveStair;
require Number::Fraction;
foreach my $L (1 .. 5) {
print "L=$L\n";
my $path = Math::PlanePath::SierpinskiCurveStair->new (diagonal_length=>$L);
foreach my $level (1 .. 10) {
my $Nlevel = ((6*$L+4)*4**$level - 4) / 3;
my ($x,$y) = $path->n_to_xy($Nlevel);
my $Xlevel = ($L+2)*2**$level - 1;
$x == $Xlevel or die "x=$x Xlevel=$Xlevel";
my $frac = $Nlevel / ($x*($x-1)/2);
print " $level $frac\n";
}
my $nf = Number::Fraction->new((12*$L+8),(3*$L**2+12*$L+12));
my $limit = $nf->to_num;
print " limit $nf = $limit\n";
}
exit 0;
}
{
my $path = Math::PlanePath::SierpinskiCurve->new;
my @rows = ((' ' x 79) x 64);
foreach my $n (0 .. 3 * 3**4) {
my ($x, $y) = $path->n_to_xy ($n);
$x += 32;
substr ($rows[$y], $x,1, '*');
}
local $,="\n";
print reverse @rows;
exit 0;
}
{
my @rows = ((' ' x 64) x 32);
foreach my $p (0 .. 31) {
foreach my $q (0 .. 31) {
next if ($p & $q);
my $x = $p-$q;
my $y = $p+$q;
next if ($y >= @rows);
$x += 32;
substr ($rows[$y], $x,1, '*');
}
}
local $,="\n";
print reverse @rows;
exit 0;
}