Math::PlanePath::GrayCode -- Gray code coordinates
use Math::PlanePath::GrayCode; my $path = Math::PlanePath::GrayCode->new; my ($x, $y) = $path->n_to_xy (123);
This is a mapping of N to X,Y using Gray codes. The default is the form by Christos Faloutsos which is an X,Y split in binary reflected Gray code.
7 | 63-62 57-56 39-38 33-32 | | | | | 6 | 60-61 58-59 36-37 34-35 | 5 | 51-50 53-52 43-42 45-44 | | | | | 4 | 48-49 54-55 40-41 46-47 | 3 | 15-14 9--8 23-22 17-16 | | | | | 2 | 12-13 10-11 20-21 18-19 | 1 | 3--2 5--4 27-26 29-28 | | | | | Y=0 | 0--1 6--7 24-25 30-31 | +------------------------- X=0 1 2 3 4 5 6 7
N is converted to a Gray code, then split by bits to X,Y, and those X,Y converted back from Gray to integer indices. Stepping from N to N+1 changes just one bit of the Gray code and therefore changes just one of X or Y each time.
Y axis N=0,3,12,15,48,etc are values with only digits 0,3 in base 4. X axis N=0,1,6,7,24,25,etc are values 2k and 2k+1 where k uses only digits 0,3 in base 4.
The default is binary. The radix => $r
option can select another radix. This is used for both the Gray code and the digit splitting. For example radix => 4
,
radix => 4 | 127-126-125-124 99--98--97--96--95--94--93--92 67--66--65--64 | | | | 120-121-122-123 100-101-102-103 88--89--90--91 68--69--70--71 | | | | 119-118-117-116 107-106-105-104 87--86--85--84 75--74--73--72 | | | | 112-113-114-115 108-109-110-111 80--81--82--83 76--77--78--79 15--14--13--12 19--18--17--16 47--46--45--44 51--50--49--48 | | | | 8-- 9--10--11 20--21--22--23 40--41--42--43 52--53--54--55 | | | | 7-- 6-- 5-- 4 27--26--25--24 39--38--37--36 59--58--57--56 | | | | 0-- 1-- 2-- 3 28--29--30--31--32--33--34--35 60--61--62--63
Option apply_type => $str
controls how Gray codes are applied to N and X,Y. It can be one of
"TsF" to Gray, split, from Gray (default) "Ts" to Gray, split "Fs" from Gray, split "FsT" from Gray, split, to Gray "sT" split, to Gray "sF" split, from Gray
"T" means integer-to-Gray, "F" means integer-from-Gray, and omitted means no transformation. For example the following is "Ts" which means N to Gray then split, leaving Gray coded values for X,Y.
apply_type => "Ts" 7 | 51--50 52--53 44--45 43--42 | | | | | 6 | 48--49 55--54 47--46 40--41 | 5 | 60--61 59--58 35--34 36--37 ...-66 | | | | | | 4 | 63--62 56--57 32--33 39--38 64--65 | 3 | 12--13 11--10 19--18 20--21 | | | | | 2 | 15--14 8-- 9 16--17 23--22 | 1 | 3-- 2 4-- 5 28--29 27--26 | | | | | Y=0 | 0-- 1 7-- 6 31--30 24--25 | +--------------------------------- X=0 1 2 3 4 5 6 7
This "Ts" is quite attractive because a step from N to N+1 changes just one bit in X or Y alternately, giving 2-D single-bit changes. For example N=19 at X=4 followed by N=20 at X=6 is a single bit change in X.
N=0,2,8,10,etc on the leading diagonal X=Y is numbers using only digits 0,2 in base 4. N=0,3,15,12,etc on the Y axis is numbers using only digits 0,3 in base 4, but in a Gray code order.
The "Fs", "FsT" and "sF" forms effectively treat the input N as a Gray code and convert from it to integers, either before or after split. For "Fs" the effect is little Z parts in various orientations.
apply_type => "sF" 7 | 32--33 37--36 52--53 49--48 | / \ / \ 6 | 34--35 39--38 54--55 51--50 | 5 | 42--43 47--46 62--63 59--58 | \ / \ / 4 | 40--41 45--44 60--61 57--56 | 3 | 8-- 9 13--12 28--29 25--24 | / \ / \ 2 | 10--11 15--14 30--31 27--26 | 1 | 2-- 3 7-- 6 22--23 19--18 | \ / \ / Y=0 | 0-- 1 5-- 4 20--21 17--16 | +--------------------------------- X=0 1 2 3 4 5 6 7
The gray_type
option selects what type of Gray code is used. The choices are
"reflected" increment to radix-1 then decrement (default) "modular" cycle from radix-1 back to 0
For example in decimal,
integer Gray Gray "reflected" "modular" ------- ----------- --------- 0 0 0 1 1 1 2 2 2 ... ... ... 8 8 8 9 9 9 10 19 19 11 18 10 12 17 11 13 16 12 14 15 13 ... ... ... 17 12 16 18 11 17 19 10 18
Notice on reaching "19" the reflected type runs the least significant digit downwards from 9 to 0, which is a reverse or reflection of the preceding 0 to 9 upwards. The modular form instead continues to increment that least significant digit, wrapping around from 9 to 0.
In binary the modular and reflected forms are the same (see "Equivalent Combinations" below).
There's various other systematic ways to make a Gray code changing a single digit successively. But many ways are implicitly based on a pre-determined fixed number of bits or digits, which doesn't suit an unlimited path as given here.
Some option combinations are equivalent,
condition equivalent --------- ---------- radix=2 modular==reflected and TsF==Fs, Ts==FsT radix>2 odd reflected TsF==FsT, Ts==Fs, sT==sF because T==F radix>2 even reflected TsF==Fs, Ts==FsT
In radix=2 binary the "modular" and "reflected" Gray codes are the same because there's only digits 0 and 1 so going forward or backward is the same.
For odd radix and reflected Gray code, the "to Gray" and "from Gray" operations are the same. For example the following table is ternary radix=3. Notice how integer value 012 maps to Gray code 010, and in turn integer 010 maps to Gray code 012. All values are either pairs like that or unchanged like 021.
integer Gray "reflected" (written in ternary) 000 000 001 001 002 002 010 012 011 011 012 010 020 020 021 021 022 022
For even radix and reflected Gray code, "TsF" is equivalent to "Fs", and also "Ts" equivalent to "FsT". This arises from the way the reversing behaves when split across digits of two X,Y values. (In higher dimensions such as a split to 3-D X,Y,Z it's not the same.)
The net effect for distinct paths is
condition distinct combinations --------- --------------------- radix=2 four TsF==Fs, Ts==FsT, sT, sF radix>2 odd / three reflected TsF==FsT, Ts==Fs, sT==sF \ six modular TsF, Ts, Fs, FsT, sT, sF radix>2 even / four reflected TsF==Fs, Ts==FsT, sT, sF \ six modular TsF, Ts, Fs, FsT, sT, sF
In radix => 3
and other odd radices the "reflected" Gray type gives the Peano curve (see Math::PlanePath::PeanoCurve). The "reflected" encoding is equivalent to Peano's "xk" and "yk" complementing.
radix => 3, gray_type => "reflected" | 53--52--51 38--37--36--35--34--33 | | | 48--49--50 39--40--41 30--31--32 | | | 47--46--45--44--43--42 29--28--27 | 6-- 7-- 8-- 9--10--11 24--25--26 | | | 5-- 4-- 3 14--13--12 23--22--21 | | | 0-- 1-- 2 15--16--17--18--19--20
See "FUNCTIONS" in Math::PlanePath for the behaviour common to all path classes.
$path = Math::PlanePath::GrayCode->new ()
$path = Math::PlanePath::GrayCode->new (radix => $r, apply_type => $str, gray_type => $str)
Create and return a new path object.
($x,$y) = $path->n_to_xy ($n)
Return the X,Y coordinates of point number $n
on the path. Points begin at 0 and if $n < 0
then the return is an empty list.
$n = $path->n_start ()
Return the first N on the path, which is 0.
The turns in the default binary TsF curve are either to the left +90 or a reverse 180. For example at N=2 the curve turns left, then at N=3 it reverses back 180 to go to N=4. The turn is given by the low zero bits of (N+1)/2,
count_low_0_bits(floor((N+1)/2)) if even then turn 90 left if odd then turn 180 reverse
Or equivalently
floor((N+1)/2) lowest non-zero digit in base 4, 1 or 3 = turn 90 left 2 = turn 180 reverse
The 180 degree reversals are all horizontal. They occur because at those N the three N-1,N,N+1 converted to Gray code have the same bits at odd positions and therefore the same Y coordinate.
See "N to Turn" in Math::PlanePath::KochCurve for similar turns based on low zero bits (but by +60 and -120 degrees).
This path is in Sloane's Online Encyclopedia of Integer Sequences in a few forms,
http://oeis.org/A163233 (etc)
apply_type="TsF", radix=2 (the defaults) A039963 turn sequence, 1=+90 left, 0=180 reverse A035263 turn undoubled, at N=2n and N=2n+1 A065882 base4 lowest non-zero, turn undoubled 1,3=left 2=180rev at N=2n,2n+1 A003159 (N+1)/2 of positions of Left turns, being n with even number of low 0 bits A036554 (N+1)/2 of positions of Right turns being n with odd number of low 0 bits
The turn sequence goes in pairs, so N=1 and N=2 left then N=3 and N=4 reverse. A039963 includes that repetition, A035263 is just one copy of each and so is the turn at each pair N=2k and N=2k+1. There's many sequences like A065882 which when taken mod2 equal the "count low 0-bits odd/even" which is the same undoubled turn sequence.
apply_type="sF", radix=2 A163233 N values by diagonals, same axis start A163234 inverse permutation A163235 N values by diagonals, opp axis start A163236 inverse permutation A163242 N sums along diagonals A163478 those sums divided by 3 A163237 N values by diagonals, same axis, flip digits 2,3 A163238 inverse permutation A163239 N values by diagonals, opp axis, flip digits 2,3 A163240 inverse permutation A099896 N values by PeanoCurve radix=2 order A100280 inverse permutation apply_type="FsT", radix=3, gray_type=modular A208665 N values on X=Y diagonal, base 9 digits 0,3,6
Gray code conversions themselves (not directly offered by the PlanePath code here) are variously
A003188 binary A014550 binary with values written in binary A006068 inverse, Gray->integer A128173 ternary reflected (its own inverse) A105530 ternary modular A105529 inverse, Gray->integer A003100 decimal reflected A174025 inverse, Gray->integer A098488 decimal modular
Math::PlanePath, Math::PlanePath::ZOrderCurve, Math::PlanePath::PeanoCurve, Math::PlanePath::CornerReplicate
http://user42.tuxfamily.org/math-planepath/index.html
Copyright 2011, 2012, 2013, 2014 Kevin Ryde
This file is part of Math-PlanePath.
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