#C A small spacefiller.
#C Spacefillers are the fastest-growing known pattern in Conway's
#C  Game of Life (probably the fastest possible). They fill space
#C  to a density of 1/2, conjectured to be the maximum density,
#C  and they do it at a speed of c/2 in each of the 4 directions,
#C  which has been proven to be the maximum possible speed.
#C This pattern starts with 200 cells, not the record lowest number
#C  of starting cells for a spacefiller (at the time of this writing,
#C  the record is 187).  Quadratic-growth patterns that start with
#C  as few as 26 ON cells are now known, but their growth rate is
#C  comparatively slow.
#C The population of spacefillers are easy to compute. This one's
#C  equations are:
#C       [(t+17)^2+511]/4 for t divisible by 4;
#C       [(t+17)^2+608]/4 for t mod 4 = 1;
#C       [(t+17)^2+563]/4 for t mod 4 = 2;
#C       [(t+17)^2+580]/4 for t mod 4 = 3.
#C Most spacefillers at this time have p2 stretchers on the left and
#C  right instead of the flipper stretchers in this pattern.
#C Original idea and middle part by Al Hensel; original construction
#C  and top/bottom stretchers by Hartmut Holzwart; size optimization
#C  by David Bell, Al Hensel, and Tim Coe.
#C This spacefiller by Hartmut Holzwart, 4 Nov 1998.
#C From Alan Hensel's "lifebc" pattern collection.
x = 49, y = 26, rule = B3/S23
20b3o3b3o$19bobbo3bobbo$4o18bo3bo18b4o$o3bo17bo3bo17bo3bo$o8bo12bo3bo
12bo8bo$bobbobboobbo25bobboobbobbo$6bo5bo7b3o3b3o7bo5bo$6bo5bo8bo5bo8b
o5bo$6bo5bo8b7o8bo5bo$bobbobboobbobboo4bo7bo4boobbobboobbobbo$o8bo3boo
4b11o4boo3bo8bo$o3bo9boo17boo9bo3bo$4o11b19o11b4o$16bobo11bobo$19b11o$
19bo9bo$20b9o$24bo$20b3o3b3o$22bo3bo$$21b3ob3o$21b3ob3o$20bobooboobo$
20b3o3b3o$21bo5bo!