Math::PlanePath::KochCurve(3pm)

1Math::PlanePath::KochCuUrsveer(3C)ontributed Perl DocumeMnattaht:i:oPnlanePath::KochCurve(3)
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NAME

6       Math::PlanePath::KochCurve -- horizontal Koch curve
7

SYNOPSIS

9        use Math::PlanePath::KochCurve;
10        my $path = Math::PlanePath::KochCurve->new;
11        my ($x, $y) = $path->n_to_xy (123);
12

DESCRIPTION

14       This is an integer version of the self-similar Koch curve,
15
16           Helge von Koch, "Une Méthode Géométrique Élémentaire pour l'Étude
17           de Certaines Questions de la Théorie des Courbes Planes", Acta
18           Arithmetica, volume 30, 1906, pages 145-174.
19           <http://archive.org/details/actamathematica11lefgoog>
20
21       It goes along the X axis and makes triangular excursions upwards.
22
23                                      8                                   3
24                                    /  \
25                             6---- 7     9----10                18-...    2
26                              \              /                    \
27                    2           5          11          14          17     1
28                  /  \        /              \        /  \        /
29            0----1     3---- 4                12----13    15----16    <- Y=0
30
31            ^
32           X=0   2  3  4  5  6  7  8  9 10 11 12 13 14 15 16 17 18 19
33
34       The replicating shape is the initial N=0 to N=4,
35
36                   *
37                  / \
38             *---*   *---*
39
40       which is rotated and repeated 3 times in the same pattern to give
41       sections N=4 to N=8, N=8 to N=12, and N=12 to N=16.  Then that N=0 to
42       N=16 is itself replicated three times at the angles of the base
43       pattern, and so on infinitely.
44
45       The X,Y coordinates are arranged on a square grid using every second
46       point, per "Triangular Lattice" in Math::PlanePath.  The result is
47       flattened triangular segments with diagonals at a 45 degree angle.
48
49   Level Ranges
50       Each replication adds 3 copies of the existing points and is thus 4
51       times bigger, so if N=0 to N=4 is reckoned as level 1 then a given
52       replication level goes from
53
54           Nstart = 0
55           Nlevel = 4^level   (inclusive)
56
57       Each replication is 3 times the width.  The initial N=0 to N=4 figure
58       is 6 wide and in general a level runs from
59
60           Xstart = 0
61           Xlevel = 2*3^level   at N=Nlevel
62
63       The highest Y is 3 times greater at each level similarly.  The peak is
64       at the midpoint of each level,
65
66           Npeak = (4^level)/2
67           Ypeak = 3^level
68           Xpeak = 3^level
69
70       It can be seen that the N=6 point backtracks horizontally to the same X
71       as the start of its section N=4 to N=8.  This happens in the further
72       replications too and is the maximum extent of the backtracking.
73
74       The Nlevel is multiplied by 4 to get the end of the next higher level.
75       The same 4*N can be applied to all points N=0 to N=Nlevel to get the
76       same shape but a factor of 3 bigger X,Y coordinates.  The in-between
77       points 4*N+1, 4*N+2 and 4*N+3 are then new finer structure in the
78       higher level.
79
80   Fractal
81       Koch conceived the curve as having a fixed length and infinitely fine
82       structure, making it continuous everywhere but differentiable nowhere.
83       The code here can be pressed into use for that sort of construction for
84       a given level of granularity by scaling
85
86           X/3^level
87           Y/3^level
88
89       which makes it a fixed 2 wide by 1 high.  Or for unit-side equilateral
90       triangles then apply further factors 1/2 and sqrt(3)/2, as noted in
91       "Triangular Lattice" in Math::PlanePath.
92
93           (X/2) / 3^level
94           (Y*sqrt(3)/2) / 3^level
95
96   Area
97       The area under the curve to a given level can be calculated from its
98       self-similar nature.  The curve at level+1 is 3 times wider and higher
99       and adds a triangle of unit area onto each line segment.  So reckoning
100       the line segment N=0 to N=1 as level=0 (which is area[0]=0),
101
102           area[level] = 9*area[level-1] + 4^(level-1)
103                       = 4^(level-1) + 9*4^(level-2) + ... + 9^(level-1)*4^0
104
105                         9^level - 4^level
106                       = -----------------
107                                 5
108
109                       = 0, 1, 13, 133, 1261, 11605, 105469, ...  (A016153)
110
111       The sides are 6 different angles.  The triangles added on the sides are
112       always the same shape either pointing up or down.  Base width=2 and
113       height=1 gives area=1.
114
115              *            *-----*   ^
116             / \            \   /    | height=1
117            /   \            \ /     |
118           *-----*            *      v     triangle area = 2*1/2 = 1
119
120           <-----> width=2
121
122       If the Y coordinates are stretched to make equilateral triangles then
123       the number of triangles is not changed and so the area increases by a
124       factor of the area of the equilateral triangle, sqrt(3)/4.
125

FUNCTIONS

127       See "FUNCTIONS" in Math::PlanePath for behaviour common to all path
128       classes.
129
130       "$path = Math::PlanePath::KochCurve->new ()"
131           Create and return a new path object.
132
133       "($x,$y) = $path->n_to_xy ($n)"
134           Return the X,Y coordinates of point number $n on the path.  Points
135           begin at 0 and if "$n < 0" then the return is an empty list.
136
137           Fractional positions give an X,Y position along a straight line
138           between the integer positions.
139
140       "($n_lo, $n_hi) = $path->rect_to_n_range ($x1,$y1, $x2,$y2)"
141           The returned range is exact, meaning $n_lo and $n_hi are the
142           smallest and biggest in the rectangle.
143
144       "$n = $path->n_start()"
145           Return 0, the first N in the path.
146
147   Level Methods
148       "($n_lo, $n_hi) = $path->level_to_n_range($level)"
149           Return "(0, 4**$level)".
150

FORMULAS

152   N to Turn
153       The curve always turns either +60 degrees or -120 degrees, it never
154       goes straight ahead.  In the base 4 representation of N the lowest non-
155       zero digit gives the turn.  The first turn is at N=1 so there's always
156       a non-zero digit in N.
157
158          low digit
159           base 4         turn
160          ---------   ------------
161             1         +60 degrees (left)
162             2        -120 degrees (right)
163             3         +60 degrees (left)
164
165       For example N=8 is 20 base 4, so lowest nonzero "2" means turn -120
166       degrees for the next segment.
167
168       If the least significant digit is non-zero then it determines the turn,
169       making the base N=0 to N=4 shape.  If the least significant is zero
170       then the next level up is in control, eg. N=0,4,8,12,16, making a turn
171       according to the base shape again at that higher level.  The first and
172       last segments of the base shape are "straight" so there's no extra
173       adjustment to apply in those higher digits.
174
175       This base 4 digit rule is equivalent to counting low 0-bits.  A low
176       base-4 digit 1 or 3 is an even number of low 0-bits and a low digit 2
177       is an odd number of low 0-bits.
178
179           count low 0-bits         turn
180           ----------------     ------------
181                even             +60 degrees (left)
182                odd             -120 degrees (right)
183
184       For example N=8 in binary "1000" has 3 low 0-bits and 3 is odd so turn
185       -120 degrees (right).
186
187       See "Turn" in Math::PlanePath::GrayCode for a similar turn sequence
188       arising from binary Gray code.
189
190   N to Next Turn
191       The turn at N+1, ie the next turn, can be found from the base-4 digits
192       by considering how the digits of N change when 1 is added, and the low-
193       digit turn calculation is applied on those changed digits.
194
195       Adding 1 means low digit 0, 1 or 2 will become non-zero.  Any low 3s
196       wrap around to become low 0s.  So the turn at N+1 can be found from the
197       digits of N by seeking the lowest non-3
198
199          lowest non-3       turn
200           digit of N       at N+1
201          ------------   ------------
202               0          +60 degrees (left)
203               1         -120 degrees (right)
204               2          +60 degrees (left)
205
206   N to Direction
207       The total turn at a given N can be found by counting digits 1 and 2 in
208       base 4.
209
210           direction = ((count of 1-digits in base 4)
211                        - (count of 2-digits in base 4)) * 60 degrees
212
213       For example N=11 is "23" in base 4, so 60*(0-1) = -60 degrees.
214
215       In this formula the count of 1s and 2s can go past 360 degrees,
216       representing a spiralling around which occurs at progressively higher
217       replication levels.  The direction can be taken mod 360 degrees, or the
218       count mod 6, for a direction 0 to 5 if desired.
219
220   N to abs(dX),abs(dY)
221       The direction expressed as abs(dX) and abs(dY) can be calculated simply
222       from N modulo 3.  abs(dX) is a repeating pattern 2,1,1 and abs(dY)
223       repeating 0,1,1.
224
225           N mod 3     abs(dX),abs(dY)
226           -------     ---------------
227              0             2,0            horizontal, East or West
228              1             1,1            slope North-East or South-West
229              2             1,1            slope North-West or South-East
230
231       This works because the direction calculation above corresponds to N mod
232       3.  Each N digit in base 4 becomes
233
234           N digit
235           base 4    direction add
236           -------   -------------
237              0            0
238              1            1
239              2           -1
240              3            0
241
242       Notice that direction == Ndigit mod 3.  Then because 4==1 mod 3 the
243       power-of-4 for each digit reduces down to 1,
244
245           N = 4^k * digit_k + ... 4^0 * digit_0
246           N mod 3 = 1 * digit_k + ... 1 * digit_0
247                   = digit_k + ... digit_0
248           same as
249           direction = digit_k + ... + digit_0    taken mod 3
250
251   Rectangle to N Range -- Level
252       An easy over-estimate of the N values in a rectangle can be had from
253       the Xlevel formula above.  If Xlevel>rectangleX then Nlevel is past the
254       rectangle extent.
255
256           X = 2*3^level
257
258       so
259
260           floorlevel = floor log_base_3(X/2)
261           Nhi = 4^(floorlevel+1) - 1
262
263       For example a rectangle extending to X=13 has floorlevel =
264       floor(log3(13/2))=1 and so Nhi=4^(1+1)-1=15.
265
266       The rounding-down of the log3 ensures a point such as X=18 which is the
267       first in the next Nlevel will give that next level.  So
268       floorlevel=log3(18/2)=2 (exactly) and Nhi=4^(2+1)-1=63.
269
270       The worst case for this over-estimate is when rectangleX==Xlevel, ie.
271       the rectangle is just into the next level.  In that case Nhi is nearly
272       a factor 4 bigger than it needs to be.
273
274   Rectangle to N Range -- Exact
275       The exact Nlo and Nhi in a rectangle can be found by searching along
276       the curve.  For Nlo search forward from the origin N=0.  For Nhi search
277       backward from the Nlevel over-estimate described above.
278
279       At a given digit position in the prospective N the sub-part of the
280       curve comprising the lower digits has a certain triangular extent.  If
281       it's outside the target rectangle then step to the next digit value,
282       and to the next of the digit above when past digit=3 (or below digit=0
283       when searching backwards).
284
285       There's six possible orientations for the curve sub-part.  In the
286       following pictures "o" is the start and the surrounding lines show the
287       triangular extent.  There's just four curve parts shown in each, but
288       these triangles bound a sub-curve of any level.
289
290          rot=0   -+-               +-----------------+
291                --   --              - .-+-*   *-+-o -
292              --   *   --             --    \ /    --
293            --    / \    --             --   *   --
294           - o-+-*   *-+-. -              --   --
295          +-----------------+       rot=3   -+-
296
297          rot=1
298          +---------+               rot=4    /+
299          |      . /                        / |
300          |     / /                        / o|
301          |*-+-* /                        / / |
302          | \   /                        / *  |
303          |  * /                        /   \ |
304          | / /                        / *-+-*|
305          |o /                        / /     |
306          | /                        / .      |
307          +/                        +---------+
308
309          +\  rot=2                 +---------+
310          | \                        \ o      |
311          |. \                        \ \     |
312          | \ \                        \ *-+-*|
313          |  * \                        \   / |
314          | /   \                        \ *  |
315          |*-+-* \                        \ \ |
316          |     \ \                        \ .|
317          |      o \                rot=5   \ |
318          +---------+                        \+
319
320       The "." is the start of the next sub-curve.  It belongs to the next
321       digit value and so can be excluded.  For rot=0 and rot=3 this means
322       simply shortening the X range permitted.  For rot=1 and rot=4 similarly
323       the Y range.  For rot=2 and rot=5 it would require a separate test.
324
325       Tight sub-part extent checking reduces the sub-parts which are
326       examined, but it works perfectly well with a looser check, such as a
327       square box for the sub-curve extents.  Doing that might be easier if
328       the target region is not a rectangle but instead some trickier shape.
329

OEIS

331       The Koch curve is in Sloane's Online Encyclopedia of Integer Sequences
332       in various forms,
333
334           <http://oeis.org/A035263> (etc)
335
336           A177702   abs(dX) from N=1 onwards, being 1,1,2 repeating
337           A011655   abs(dY), being 0,1,1 repeating
338           A035263   turn 1=left,0=right, by morphism
339           A096268   turn 0=left,1=right, by morphism
340           A056832   turn 1=left,2=right, by replicate and flip last
341           A029883   turn +/-1=left,0=right, Thue-Morse first differences
342           A089045   turn +/-1=left,0=right, by +/- something
343
344           A003159   N positions of left turns, ending even number 0 bits
345           A036554   N positions of right turns, ending odd number 0 bits
346
347           A020988   number of left turns N=0 to N < 4^k, being 2*(4^k-1)/3
348           A002450   number of right turns N=0 to N < 4^k, being (4^k-1)/3
349           A016153   area under the curve, (9^n-4^n)/5
350
351       For reference, A217586 is not quite the same as A096268 right turn.
352       A217586 differs by a 0<->1 flip at N=2^k due to different initial
353       a(1)=1.
354

HOME PAGE

363       <http://user42.tuxfamily.org/math-planepath/index.html>
364

LICENSE

366       Copyright 2011, 2012, 2013, 2014, 2015, 2016, 2017, 2018 Kevin Ryde
367
368       Math-PlanePath is free software; you can redistribute it and/or modify
369       it under the terms of the GNU General Public License as published by
370       the Free Software Foundation; either version 3, or (at your option) any
371       later version.
372
373       Math-PlanePath is distributed in the hope that it will be useful, but
374       WITHOUT ANY WARRANTY; without even the implied warranty of
375       MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
376       General Public License for more details.
377
378       You should have received a copy of the GNU General Public License along
379       with Math-PlanePath.  If not, see <http://www.gnu.org/licenses/>.
380
381
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383perl v5.30.0                      2019-08-17     Math::PlanePath::KochCurve(3)