% BinaryCounterSquareCapped2x2.tiles
%   2x2 proofreading tiles for the BinaryCounterSquareCapped tile set. 
%   Works best among the one-counter squares.  But still, facets cause 
%   trouble, and results aren't as good as for Sierpinski. 
tile edges matches {{N E S W}*}
num tile types=176
num binding types=238
tile edges={
{63 66 52 0}(red)
{32 64 63 0}(red)
{31 2 65 64}(red)
{65 1 51 66}
{67 70 62 1}(red4)
{12 68 67 2}(red4)
{11 4 69 68}(red4)
{69 3 61 70}
{71 74 62 3}(red3)
{10 72 71 4}(red3)
{9 6 73 72}(red3)
{73 5 61 74}
{75 78 62 5}(red2)
{12 76 75 6}(red2)
{11 8 77 76}(red2)
{77 7 61 78}
{79 82 62 7}(red1)
{10 80 79 8}(red1)
{9 48 81 80}(red1)
{81 47 61 82}
{83 86 34 47}(brown2)
{12 84 83 48}(brown2)
{11 50 85 84}(brown2)
{85 49 33 86}
{87 90 14 49}(brown1)
{38 88 87 50}(brown1)
{37 14 89 88}(brown1)
{89 13 13 90}
{91 94 14 17}
{34 92 91 18}
{33 14 93 92}
{93 13 13 94}
{95 98 34 61}
{62 96 95 62}
{61 18 97 96}
{97 17 33 98}
{99 102 14 13}[2](pink1)
{14 100 99 14}[2](pink1)
{13 14 101 100}[2](pink1)
{101 13 13 102}[2](pink1)
{103 106 16 15}[2](pink2)
{16 104 103 16}[2](pink2)
{15 16 105 104}[2](pink2)
{105 15 15 106}[2](pink2)
{107 110 18 15}
{16 108 107 16}
{15 36 109 108}
{109 35 17 110}
{111 114 14 35}
{18 112 111 36}
{17 14 113 112}
{113 13 13 114}
{115 118 62 61}(tan)
{62 116 115 62}(tan)
{61 62 117 116}(tan)
{117 61 61 118}
{119 122 10 23}(blue3)
{10 120 119 24}(blue3)
{9 24 121 120}(blue3)
{121 23 9 122}
{123 126 12 23}(green)
{12 124 123 24}(green)
{11 24 125 124}(green)
{125 23 11 126}
{127 130 12 19}(blue2)
{10 128 127 20}(blue2)
{9 20 129 128}(blue2)
{129 19 11 130}
{131 134 10 21}(green2)
{12 132 131 22}(green2)
{11 20 133 132}(green2)
{133 19 9 134}
{135 138 12 21}(green3)
{12 136 135 22}(green3)
{11 22 137 136}(green3)
{137 21 11 138}
{139 142 10 21}(blue1)
{10 140 139 22}(blue1)
{9 22 141 140}(blue1)
{141 21 9 142}
{143 146 26 23}
{40 144 143 24}
{39 16 145 144}
{145 15 25 146}
{147 150 28 23}
{42 148 147 24}
{41 16 149 148}
{149 15 27 150}
{151 154 38 19}
{26 152 151 20}
{25 36 153 152}
{153 35 37 154}
{155 158 42 19}
{26 156 155 20}
{25 16 157 156}
{157 15 41 158}
{159 162 40 21}
{28 160 159 22}
{27 16 161 160}
{161 15 39 162}
{163 166 44 0}
{30 164 163 0}
{29 24 165 164}
{165 23 43 166}
{167 170 46 0}
{32 168 167 0}
{31 24 169 168}
{169 23 45 170}
{171 174 32 0}
{54 172 171 0}
{53 20 173 172}
{173 19 31 174}
{175 178 30 0}
{46 176 175 0}
{45 20 177 176}
{177 19 29 178}
{179 182 30 0}
{44 180 179 0}
{43 22 181 180}
{181 21 29 182}
{183 186 32 0}
{46 184 183 0}
{45 22 185 184}
{185 21 31 186}
{187 190 52 0}(magenta)
{52 188 187 0}(magenta)
{51 62 189 188}(magenta)
{189 61 51 190}
{191 194 54 0}
{0 192 191 0}
{0 56 193 192}
{193 55 53 194}
{195 198 58 0}
{52 196 195 0}
{51 18 197 196}
{197 17 57 198}
{199 202 0 0}
{58 200 199 0}
{57 60 201 200}
{201 59 0 202}
{203 206 0 59}
{14 204 203 60}
{13 52 205 204}
{205 51 0 206}
{207 210 0 51}(orange)
{14 208 207 52}(orange)
{13 52 209 208}(orange)
{209 51 0 210}
{211 214 10 55}(gold)
{0 212 211 56}(gold)
{0 56 213 212}(gold)
{213 55 9 214}
{215 218 26 55}(purple)
{0 216 215 56}(purple)
{0 56 217 216}(purple)
{217 55 25 218}
{219 222 16 55}(cyan)
{0 220 219 56}(cyan)
{0 56 221 220}(cyan)
{221 55 15 222}
{223 226 18 55}
{0 224 223 56}
{0 58 225 224}
{225 57 17 226}
{227 230 56 57}
{0 228 227 58}
{0 0 229 228}
{229 0 55 230}
{231 234 56 13}(blue)
{56 232 231 14}(blue)
{55 0 233 232}(blue)
{233 0 55 234}
{235 238 0 51}
{56 236 235 52}
{55 0 237 236}
{237 0 0 238}}
binding strengths=
{1 2 1 2 1 2 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 2 1 2 1 2 1 2 1 1 2 1 2 1 2 1 2 1 1 1 2 1 1 1 2 1 1 1 1 2 2 1 2  2 2 1 2  2 2 1 2  2 2 1 2  2 2 1 2  2 2 1 2  2 2 1 2  2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 2 1 1 1 2 1 2 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1}

size=128
block=6
seed=110,5,1 
update_rate=150000
Gse=12.4
Gmc=24