Math::PlanePath::SquareSpiral -- integer points drawn around a square (or rectangle)
use Math::PlanePath::SquareSpiral; my $path = Math::PlanePath::SquareSpiral->new; my ($x, $y) = $path->n_to_xy (123);
This path makes a square spiral,
37--36--35--34--33--32--31 3 | | 38 17--16--15--14--13 30 2 | | | | 39 18 5---4---3 12 29 1 | | | | | | 40 19 6 1---2 11 28 ... <- Y=0 | | | | | | 41 20 7---8---9--10 27 52 -1 | | | | 42 21--22--23--24--25--26 51 -2 | | 43--44--45--46--47--48--49--50 -3 ^ -3 -2 -1 X=0 1 2 3 4
See examples/square-numbers.pl in the sources for a simple program printing these numbers.
This path is well known from Stanislaw Ulam finding interesting straight lines when plotting the prime numbers on it.
Stein, Ulam and Wells, "A Visual Display of Some Properties of the Distribution of Primes", American Mathematical Monthly, volume 71, number 5, May 1964, pages 516-520. http://www.jstor.org/stable/2312588
The cover of Scientific American March 1964 featured this spiral,
http://www.nature.com/scientificamerican/journal/v210/n3/covers/index.html
http://oeis.org/A143861/a143861.jpg
See examples/ulam-spiral-xpm.pl in the sources for a standalone program, or see math-image using this SquareSpiral to draw this pattern and more.
SquareSpiral
Stein, Ulam and Wells also considered primes on the Math::PlanePath::Corner path, and on a half-plane like two corners.
The perfect squares 1,4,9,16,25 fall on two diagonals with the even perfect squares going to the upper left and the odd squares to the lower right. The pronic numbers 2,6,12,20,30,42 etc k^2+k half way between the squares fall on similar diagonals to the upper right and lower left. The decagonal numbers 10,27,52,85 etc 4*k^2-3*k go horizontally to the right at Y=-1.
In general straight lines and diagonals are 4*k^2 + b*k + c. b=0 is the even perfect squares up to the left, then incrementing b is an eighth turn anti-clockwise, or clockwise if negative. So b=1 is horizontal West, b=2 diagonally down South-West, b=3 down South, etc.
Honaker's prime-generating polynomial 4*k^2 + 4*k + 59 goes down to the right, after the first 30 or so values loop around a bit.
An optional wider parameter makes the path wider, becoming a rectangle spiral instead of a square. For example
wider
wider => 3 29--28--27--26--25--24--23--22 2 | | 30 11--10-- 9-- 8-- 7-- 6 21 1 | | | | 31 12 1-- 2-- 3-- 4-- 5 20 <- Y=0 | | | 32 13--14--15--16--17--18--19 -1 | 33--34--35--36-... -2 ^ -4 -3 -2 -1 X=0 1 2 3
The centre horizontal 1 to 2 is extended by wider many further places, then the path loops around that shape. The starting point 1 is shifted to the left by ceil(wider/2) places to keep the spiral centred on the origin X=0,Y=0.
Widening doesn't change the nature of the straight lines which arise, it just rotates them around. For example in this wider=3 example the perfect squares are still on diagonals, but the even squares go towards the bottom left (instead of top left when wider=0) and the odd squares to the top right (instead of the bottom right).
Each loop is still 8 longer than the previous, as the widening is basically a constant amount in each loop.
The default is to number points starting N=1 as shown above. An optional n_start can give a different start with the same shape. For example to start at 0,
n_start
n_start => 0 16-15-14-13-12 ... | | | 17 4--3--2 11 28 | | | | | 18 5 0--1 10 27 | | | | 19 6--7--8--9 26 | | 20-21-22-23-24-25
The only effect is to push the N values around by a constant amount. It might help match coordinates with something else zero-based.
Other spirals can be formed by cutting the corners of the square so as to go around faster. See the following modules,
Corners Cut Class ----------- ----- 1 HeptSpiralSkewed 2 HexSpiralSkewed 3 PentSpiralSkewed 4 DiamondSpiral
The PyramidSpiral is a re-shaped SquareSpiral looping at the same rate. It shifts corners but doesn't cut them.
PyramidSpiral
See "FUNCTIONS" in Math::PlanePath for behaviour common to all path classes.
$path = Math::PlanePath::SquareSpiral->new ()
$path = Math::PlanePath::SquareSpiral->new (wider => $integer, n_start => $n)
Create and return a new square spiral object. An optional wider parameter widens the spiral path, it defaults to 0 which is no widening.
($x,$y) = $path->n_to_xy ($n)
Return the X,Y coordinates of point number $n on the path.
$n
For $n < 1 the return is an empty list, as the path starts at 1.
$n < 1
$n = $path->xy_to_n ($x,$y)
Return the point number for coordinates $x,$y. $x and $y are each rounded to the nearest integer, which has the effect of treating each N in the path as centred in a square of side 1, so the entire plane is covered.
$x,$y
$x
$y
There's a few ways to break an N into a side and offset into the side. One convenient way is to treat a loop as starting at the bottom right turn, so N=2,10,26,50,etc, If the first loop at N=2 is reckoned loop number d=1 then the loop starts at
Nbase = 4*d^2 - 4*d + 2 = 2,10,26,50,... for d=1,2,3,4,... (A069894 but it going from d=0)
For example d=3 is Nbase=4*3^2-4*3+2=26 at X=3,Y=-2. The biggest d with Nbase <= N can be found by inverting with the usual quadratic formula
d = floor (1/2 + sqrt(N/4 - 1/4))
For Perl it's good to keep the sqrt argument an integer (when a UV integer is bigger than an NV float, and for BigRat accuracy), so rearranging to
d = floor ((1+sqrt(N-1)) / 2)
So Nbase from this d leaves a remainder which is an offset into the loop
Nrem = N - Nbase = N - (4*d^2 - 4*d + 2)
The loop starts at X=d,Y=d-1 and has sides length 2d, 2d+1, 2d+1 and 2d+2,
2d +------------+ <- Y=d | | 2d | | 2d-1 | . | | | | + X=d,Y=-d+1 | +---------------+ <- Y=-d 2d+1 ^ X=-d
The X,Y for an Nrem is then
side Nrem range X,Y result ---- ---------- ---------- right Nrem <= 2d-1 X = d Y = -d+1+Nrem top 2d-1 <= Nrem <= 4d-1 X = d-(Nrem-(2d-1)) = 3d-1-Nrem Y = d left 4d-1 <= Nrem <= 6d-1 X = -d Y = d-(Nrem-(4d-1)) = 5d-1-Nrem bottom 6d-1 <= Nrem X = -d+(Nrem-(6d-1)) = -7d+1+Nrem Y = -d
The corners Nrem=2d-1, Nrem=4d-1 and Nrem=6d-1 get the same result from the two sides that meet so it doesn't matter if the high comparison is "<" or "<=".
The bottom edge runs through to Nrem < 8d, but there's no need to check that since d=floor(sqrt()) above ensures Nrem is within the loop.
A small simplification can be had by subtracting an extra 4d-1 from Nrem to make negatives for the right and top sides and positives for the left and bottom.
Nsig = N - Nbase - (4d-1) = N - (4*d^2 - 4*d + 2) - (4d-1) = N - (4*d^2 + 1) side Nsig range X,Y result ---- ---------- ---------- right Nsig <= -2d X = d Y = d+(Nsig+2d) = 3d+Nsig top -2d <= Nsig <= 0 X = -d-Nsig Y = d left 0 <= Nsig <= 2d X = -d Y = d-Nsig bottom 2d <= Nsig X = -d+1+(Nsig-(2d+1)) = Nsig-3d Y = -d
This calculation can be found as an exercise in Graham, Knuth and Patashnik "Concrete Mathematics", chapter 3 "Integer Functions", exercise 40, page 99. They start the spiral from 0, and vertically so their x is -Y here. Their formula for x(n) tests a floor(2*sqrt(N)) to decide whether on a horizontal and so whether to apply the equivalent of Nrem to the result.
With the wider parameter stretching the spiral loops the formulas above become
Nbase = 4*d^2 + (-4+2w)*d + 2-w d = floor ((2-w + sqrt(4N + w^2 - 4)) / 4)
Notice for Nbase the w is a term 2*w*d, being an extra 2*w for each loop.
The left offset ceil(w/2) described above ("Wider") for the N=1 starting position is written here as wl, and the other half wr arises too,
wl = ceil(w/2) wr = floor(w/2) = w - wl
The horizontal lengths increase by w, and positions shift by wl or wr, but the verticals are unchanged.
2d+w +------------+ <- Y=d | | 2d | | 2d-1 | . | | | | + X=d+wr,Y=-d+1 | +---------------+ <- Y=-d 2d+1+w ^ X=-d-wl
The Nsig formulas then have w, wl or wr variously inserted. In all cases if w=wl=wr=0 then they simplify to the plain versions.
Nsig = N - Nbase - (4d-1+w) = N - ((4d + 2w)*d + 1) side Nsig range X,Y result ---- ---------- ---------- right Nsig <= -(2d+w) X = d+wr Y = d+(Nsig+2d+w) = 3d+w+Nsig top -(2d+w) <= Nsig <= 0 X = -d-wl-Nsig Y = d left 0 <= Nsig <= 2d X = -d-wl Y = d-Nsig bottom 2d <= Nsig X = -d+1-wl+(Nsig-(2d+1)) = Nsig-wl-3d Y = -d
Within each row the minimum N is on the X=Y diagonal and N values increases monotonically as X moves away to the left or right. Similarly in each column there's a minimum N on the X=-Y opposite diagonal, or X=-Y+1 diagonal when X negative, and N increases monotonically as Y moves away from there up or down. When wider>0 the location of the minimum changes, but N is still monotonic moving away from the minimum.
On that basis the maximum N in a rectangle is at one of the four corners,
| x1,y2 M---|----M x2,y2 corner candidates | | | for maximum N -------O--------- | | | | | | x1,y1 M---|----M x1,y1 |
This path is in Sloane's Online Encyclopedia of Integer Sequences in various forms. Summary at
http://oeis.org/A068225/a068225.html
And various sequences,
http://oeis.org/A174344 (etc), https://oeis.org/wiki/Ulam's_spiral
wider=0 (the default) A174344 X coordinate A214526 abs(X)+abs(Y) "Manhattan" distance A079813 abs(dY), being k 0s followed by k 1s A063826 direction 1=right,2=up,3=left,4=down A027709 boundary length of N unit squares A078633 grid sticks to make N unit squares A033638 N turn positions (extra initial 1, 1) A172979 N turn positions which are primes too A054552 N values on X axis (East) A054556 N values on Y axis (North) A054567 N values on negative X axis (West) A033951 N values on negative Y axis (South) A054554 N values on X=Y diagonal (NE) A054569 N values on negative X=Y diagonal (SW) A053755 N values on X=-Y opp diagonal X<=0 (NW) A016754 N values on X=-Y opp diagonal X>=0 (SE) A200975 N values on all four diagonals A137928 N values on X=-Y+1 opposite diagonal A002061 N values on X=Y diagonal pos and neg A016814 (4k+1)^2, every second N on south-east diagonal A143856 N values on ENE slope dX=2,dY=1 A143861 N values on NNE slope dX=1,dY=2 A215470 N prime and >=4 primes among its 8 neighbours A214664 X coordinate of prime N (Ulam's spiral) A214665 Y coordinate of prime N (Ulam's spiral) A214666 -X \ reckoning spiral starting West A214667 -Y / A053999 prime[N] on X=-Y opp diagonal X>=0 (SE) A054551 prime[N] on the X axis (E) A054553 prime[N] on the X=Y diagonal (NE) A054555 prime[N] on the Y axis (N) A054564 prime[N] on X=-Y opp diagonal X<=0 (NW) A054566 prime[N] on negative X axis (W) A090925 permutation N at rotate +90 A090928 permutation N at rotate +180 A090929 permutation N at rotate +270 A090930 permutation N at clockwise spiralling A020703 permutation N at rotate +90 and go clockwise A090861 permutation N at rotate +180 and go clockwise A090915 permutation N at rotate +270 and go clockwise A185413 permutation N at 1-X,Y being rotate +180, offset X+1, clockwise A068225 permutation N to the N to its right, X+1,Y A121496 run lengths of consecutive N in that permutation A068226 permutation N to the N to its left, X-1,Y A020703 permutation N at transpose Y,X (clockwise <-> anti-clockwise) A033952 digits on negative Y axis A033953 digits on negative Y axis, starting 0 A033988 digits on negative X axis, starting 0 A033989 digits on Y axis, starting 0 A033990 digits on X axis, starting 0 A062410 total sum previous row or column wider=1 A069894 N on South-West diagonal
The following have "offset 0" in the OEIS and therefore are based on starting from N=0.
n_start=0 A180714 X+Y coordinate sum A053615 abs(X-Y), runs n to 0 to n, distance to nearest pronic A001107 N on X axis A033991 N on Y axis A033954 N on negative Y axis, second 10-gonals A002939 N on X=Y diagonal North-East A016742 N on North-West diagonal, 4*k^2 A002943 N on South-West diagonal A156859 N on Y axis positive and negative
Math::PlanePath, Math::PlanePath::PyramidSpiral
Math::PlanePath::DiamondSpiral, Math::PlanePath::PentSpiralSkewed, Math::PlanePath::HexSpiralSkewed, Math::PlanePath::HeptSpiralSkewed
Math::PlanePath::CretanLabyrinth
Math::NumSeq::SpiroFibonacci
X11 cursor font "box spiral" cursor which is this style (but going clockwise).
http://user42.tuxfamily.org/math-planepath/index.html
Copyright 2010, 2011, 2012, 2013, 2014, 2015, 2016 Kevin Ryde
This file is part of Math-PlanePath.
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cpanm
cpanm Math::PlanePath
CPAN shell
perl -MCPAN -e shell install Math::PlanePath
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