/* diffusion_space_boundary.mdl */ outer_sphere POLYGON_LIST { VERTEX_LIST { /* 121 vertices */ [ -0.001410785, -0.2362454, 0.08335576 ] [ -0.01780837, -0.2516501, -0.0006421834 ] [ -0.05937655, -0.2353018, -0.06576727 ] [ 0.0279906, -0.2427799, -0.07180504 ] [ 0.08093795, -0.2364106, 0.0438595 ] [ 0.05586358, -0.2126203, 0.1201004 ] [ -0.07767814, -0.2063909, 0.1180139 ] [ -0.0671087, -0.2356571, 0.06524749 ] [ -0.1272268, -0.2178787, 0.004371809 ] [ 0.004315294, -0.2065727, -0.1413824 ] [ 0.1274769, -0.2135913, -0.04377161 ] [ 0.1569521, -0.1951887, 0.02455416 ] [ 0.1418329, -0.1800824, 0.104278 ] [ 0.07248025, -0.1745889, 0.1661066 ] [ -0.007174806, -0.2065335, 0.1454043 ] [ -0.05848983, -0.1721896, 0.1732112 ] [ -0.1331997, -0.1816853, 0.113015 ] [ -0.1824824, -0.1688888, 0.03911076 ] [ -0.141098, -0.1881348, -0.09431654 ] [ -0.07252129, -0.1975954, -0.1411487 ] [ -0.036547, -0.1723556, -0.1790417 ] [ 0.0517818, -0.1728326, -0.1750902 ] [ 0.09370372, -0.1994309, -0.1236064 ] [ 0.1530931, -0.1767767, -0.0883883 ] [ 0.179671, -0.1733441, -0.03019099 ] [ 0.2147873, -0.1303337, 0.02432669 ] [ 0.1434242, -0.1219281, 0.1672063 ] [ 0.03399005, -0.1305566, 0.2144017 ] [ -0.08492006, -0.1240068, 0.203519 ] [ -0.1732773, -0.1227972, 0.1364745 ] [ -0.2178034, -0.1228996, 0.03765783 ] [ -0.1949512, -0.155598, -0.03058337 ] [ -0.1875, -0.125, -0.1082532 ] [ -0.1530931, -0.125, -0.1530931 ] [ -0.09376599, -0.1208615, -0.2000799 ] [ 0.009199748, -0.121018, -0.2210459 ] [ 0.1712388, -0.1294234, -0.1327402 ] [ 0.2091291, -0.125, -0.05603592 ] [ 0.2274107, -0.08552179, 0.07961413 ] [ 0.1060414, -0.05951366, 0.2211318 ] [ -1.055e-08, -0.06470476, 0.2414815 ] [ -0.0957566, -0.06103058, 0.2267198 ] [ -0.1933822, -0.06096871, 0.1526954 ] [ -0.2420439, -0.06769987, -0.02692275 ] [ -0.1944024, -0.06840607, -0.1486448 ] [ -0.09563898, -0.05954642, -0.2267473 ] [ 0.02401068, -0.06048138, -0.2451412 ] [ 0.1082523, -0.1096981, -0.1991373 ] [ 0.1962489, -0.06109235, -0.148669 ] [ 0.2416562, -0.05952644, -0.04076754 ] [ 0.2432562, 0.007103224, 0.06787483 ] [ 0.184807, -0.02150626, 0.1712395 ] [ 0.09722752, -1.678416e-05, 0.2345535 ] [ -0.02129262, 0.0009322711, 0.2523641 ] [ -0.141355, 0.001864933, 0.2093998 ] [ -0.2435856, -0.02233689, 0.0615908 ] [ -0.2484487, -0.004142507, -0.04654768 ] [ -0.2165063, 0, -0.125 ] [ -0.156592, -4.680632e-05, -0.1966713 ] [ -0.06470475, 0, -0.2414815 ] [ 2.975e-09, 0, -0.25 ] [ 0.09511957, -0.007885473, -0.2351248 ] [ 0.2021673, -0.002071119, -0.1560739 ] [ 0.2520101, -0.001247548, -0.03537183 ] [ 0.2297974, 0.06117812, 0.08901264 ] [ 0.1707532, 0.06470476, 0.1707532 ] [ 0.08184908, 0.05938224, 0.2311162 ] [ -0.0431365, 0.05824219, 0.2425265 ] [ -0.1511131, 0.06170667, 0.1936593 ] [ -0.2081488, 0.04440554, 0.1352122 ] [ -0.2447854, 0.05811835, 0.01862216 ] [ -0.2332532, 0.06470476, -0.06250001 ] [ -0.1957007, 0.06020238, -0.1493131 ] [ -0.1207407, 0.06470476, -0.2091291 ] [ -0.01933366, 0.05927885, -0.2444312 ] [ 0.1004681, 0.05763602, -0.2245983 ] [ 0.197508, 0.06025914, -0.1482569 ] [ 0.2438104, 0.06086085, -0.03310229 ] [ 0.2018613, 0.1262901, 0.08712561 ] [ 0.1285197, 0.1290221, 0.1745306 ] [ 0.02023664, 0.1230168, 0.2193952 ] [ -0.05603599, 0.125, 0.2091291 ] [ -0.1344649, 0.1305505, 0.1690954 ] [ -0.2077825, 0.1233373, 0.07427815 ] [ -0.2181493, 0.1222292, -0.03765681 ] [ -0.1745069, 0.1213199, -0.1362997 ] [ -0.08196295, 0.1301412, -0.200663 ] [ 0.03966941, 0.1213752, -0.2179828 ] [ 0.1082532, 0.125, -0.1875 ] [ 0.1790474, 0.1226704, -0.1297414 ] [ 0.218219, 0.1243934, -0.02701682 ] [ 0.1635082, 0.1736114, 0.08037736 ] [ 0.06644527, 0.1733496, 0.1697063 ] [ -0.0258115, 0.1807771, 0.1734476 ] [ -0.08838835, 0.1767767, 0.1530931 ] [ -0.1469543, 0.1743963, 0.1062248 ] [ -0.1707532, 0.1767767, 0.04575315 ] [ -0.1846547, 0.1659601, -0.03994525 ] [ -0.1420277, 0.1749307, -0.1121914 ] [ -0.008875633, 0.1738442, -0.1812742 ] [ 0.08491268, 0.1663364, -0.1686559 ] [ 0.1457026, 0.1767603, -0.1052103 ] [ 0.1742668, 0.1805883, -0.01711861 ] [ 0.1076203, 0.2001131, 0.1090573 ] [ 0.04679238, 0.2127899, 0.1237692 ] [ -0.04930289, 0.2178639, 0.11826 ] [ -0.1136844, 0.2123029, 0.06951706 ] [ -0.1361563, 0.2116244, -0.01295504 ] [ -0.0988507, 0.2131008, -0.08775166 ] [ -0.05796323, 0.2021848, -0.140095 ] [ 0.04331413, 0.212445, -0.128983 ] [ 0.1078905, 0.2126827, -0.0768572 ] [ 0.124335, 0.2190651, 0.01703469 ] [ 0.06986009, 0.2356123, 0.0521889 ] [ 0.0235818, 0.2365796, 0.07710663 ] [ -0.04037083, 0.2387544, 0.06791353 ] [ -0.0815405, 0.2381149, -0.00400773 ] [ -0.02812905, 0.2387584, -0.07391271 ] [ 0.03277151, 0.2356899, -0.08068607 ] [ 0.07967193, 0.2376954, -0.01918247 ] [ 0, 0.25, 0 ] } ELEMENT_CONNECTIONS { /* 238 mesh elements */ [ 1, 3, 4 ] [ 1, 4, 0 ] [ 1, 0, 7 ] [ 1, 2, 3 ] [ 3, 10, 4 ] [ 4, 10, 11 ] [ 4, 5, 0 ] [ 0, 5, 14 ] [ 0, 14, 7 ] [ 7, 14, 6 ] [ 7, 8, 1 ] [ 1, 8, 2 ] [ 2, 8, 18 ] [ 2, 18, 19 ] [ 2, 19, 3 ] [ 3, 19, 9 ] [ 3, 9, 22 ] [ 3, 22, 10 ] [ 10, 24, 11 ] [ 11, 12, 4 ] [ 4, 12, 5 ] [ 5, 12, 13 ] [ 5, 13, 14 ] [ 14, 15, 6 ] [ 6, 15, 16 ] [ 6, 16, 7 ] [ 7, 16, 8 ] [ 8, 16, 17 ] [ 8, 17, 31 ] [ 8, 31, 18 ] [ 19, 20, 9 ] [ 9, 20, 21 ] [ 9, 21, 22 ] [ 10, 22, 23 ] [ 10, 23, 24 ] [ 24, 25, 11 ] [ 11, 25, 12 ] [ 12, 25, 38 ] [ 12, 38, 26 ] [ 12, 26, 13 ] [ 13, 26, 27 ] [ 13, 27, 14 ] [ 14, 27, 15 ] [ 15, 27, 28 ] [ 15, 28, 16 ] [ 16, 28, 29 ] [ 16, 29, 17 ] [ 17, 29, 30 ] [ 17, 30, 31 ] [ 18, 31, 32 ] [ 18, 32, 33 ] [ 18, 33, 19 ] [ 19, 33, 34 ] [ 19, 34, 20 ] [ 20, 34, 35 ] [ 20, 35, 21 ] [ 21, 35, 47 ] [ 21, 47, 22 ] [ 22, 47, 36 ] [ 22, 36, 23 ] [ 23, 36, 24 ] [ 24, 36, 37 ] [ 24, 37, 25 ] [ 25, 49, 38 ] [ 26, 38, 51 ] [ 26, 51, 39 ] [ 26, 39, 27 ] [ 27, 39, 40 ] [ 27, 40, 28 ] [ 28, 40, 41 ] [ 28, 41, 29 ] [ 29, 41, 42 ] [ 29, 42, 30 ] [ 30, 42, 55 ] [ 30, 55, 43 ] [ 30, 43, 31 ] [ 31, 43, 32 ] [ 32, 43, 44 ] [ 32, 44, 33 ] [ 33, 44, 34 ] [ 34, 44, 45 ] [ 34, 45, 35 ] [ 35, 45, 46 ] [ 35, 46, 47 ] [ 36, 47, 48 ] [ 36, 48, 37 ] [ 37, 48, 49 ] [ 37, 49, 25 ] [ 49, 63, 38 ] [ 38, 63, 50 ] [ 38, 50, 51 ] [ 39, 51, 52 ] [ 39, 52, 40 ] [ 40, 52, 53 ] [ 40, 53, 41 ] [ 41, 53, 54 ] [ 41, 54, 42 ] [ 42, 54, 69 ] [ 42, 69, 55 ] [ 43, 55, 56 ] [ 43, 56, 44 ] [ 44, 56, 57 ] [ 44, 57, 58 ] [ 44, 58, 45 ] [ 45, 58, 59 ] [ 45, 59, 46 ] [ 46, 59, 60 ] [ 46, 60, 61 ] [ 46, 61, 47 ] [ 47, 61, 48 ] [ 48, 61, 62 ] [ 48, 62, 49 ] [ 49, 62, 63 ] [ 63, 77, 50 ] [ 50, 77, 64 ] [ 50, 64, 51 ] [ 51, 64, 65 ] [ 51, 65, 52 ] [ 52, 65, 66 ] [ 52, 66, 53 ] [ 53, 66, 67 ] [ 53, 67, 54 ] [ 54, 67, 68 ] [ 54, 68, 69 ] [ 55, 69, 70 ] [ 55, 70, 56 ] [ 56, 70, 71 ] [ 56, 71, 57 ] [ 57, 71, 72 ] [ 57, 72, 58 ] [ 58, 72, 73 ] [ 58, 73, 59 ] [ 59, 73, 74 ] [ 59, 74, 60 ] [ 60, 74, 61 ] [ 61, 74, 75 ] [ 61, 75, 62 ] [ 62, 75, 76 ] [ 62, 76, 63 ] [ 63, 76, 77 ] [ 77, 90, 64 ] [ 64, 90, 78 ] [ 64, 78, 65 ] [ 65, 78, 79 ] [ 65, 79, 66 ] [ 66, 79, 80 ] [ 66, 80, 67 ] [ 67, 80, 81 ] [ 67, 81, 68 ] [ 68, 81, 82 ] [ 68, 82, 69 ] [ 69, 82, 83 ] [ 69, 83, 70 ] [ 70, 83, 84 ] [ 70, 84, 71 ] [ 71, 84, 72 ] [ 72, 84, 85 ] [ 72, 85, 73 ] [ 73, 85, 86 ] [ 73, 86, 74 ] [ 74, 86, 87 ] [ 74, 87, 75 ] [ 75, 87, 88 ] [ 75, 88, 76 ] [ 76, 88, 89 ] [ 76, 89, 77 ] [ 77, 89, 90 ] [ 90, 102, 78 ] [ 78, 102, 91 ] [ 78, 91, 79 ] [ 79, 91, 103 ] [ 79, 103, 92 ] [ 79, 92, 80 ] [ 80, 92, 93 ] [ 80, 93, 81 ] [ 81, 93, 82 ] [ 82, 93, 94 ] [ 82, 94, 95 ] [ 82, 95, 83 ] [ 83, 95, 96 ] [ 83, 96, 84 ] [ 84, 96, 97 ] [ 84, 97, 85 ] [ 85, 97, 98 ] [ 85, 98, 86 ] [ 86, 98, 109 ] [ 86, 109, 99 ] [ 86, 99, 87 ] [ 87, 99, 100 ] [ 87, 100, 88 ] [ 88, 100, 89 ] [ 89, 100, 101 ] [ 89, 101, 90 ] [ 90, 101, 102 ] [ 102, 112, 91 ] [ 91, 112, 103 ] [ 92, 103, 104 ] [ 92, 104, 93 ] [ 93, 104, 105 ] [ 93, 105, 94 ] [ 94, 105, 95 ] [ 95, 105, 106 ] [ 95, 106, 96 ] [ 96, 106, 107 ] [ 96, 107, 97 ] [ 97, 107, 98 ] [ 98, 107, 108 ] [ 98, 108, 109 ] [ 99, 109, 110 ] [ 99, 110, 100 ] [ 100, 110, 101 ] [ 101, 110, 111 ] [ 101, 111, 102 ] [ 102, 111, 112 ] [ 112, 119, 113 ] [ 112, 113, 103 ] [ 103, 113, 104 ] [ 104, 113, 114 ] [ 104, 114, 105 ] [ 105, 114, 115 ] [ 105, 115, 106 ] [ 106, 115, 116 ] [ 106, 116, 107 ] [ 107, 116, 108 ] [ 108, 116, 117 ] [ 108, 117, 109 ] [ 109, 117, 110 ] [ 110, 117, 118 ] [ 110, 118, 111 ] [ 111, 118, 119 ] [ 111, 119, 112 ] [ 119, 120, 113 ] [ 113, 120, 114 ] [ 114, 120, 115 ] [ 115, 120, 116 ] [ 116, 120, 117 ] [ 117, 120, 118 ] [ 118, 120, 119 ] } FULLY_CLOSED = NO ADD_EFFECTOR { STATE = GluT.T0 DENSITY = GluT_density ELEMENT = ALL_ELEMENTS POLE_ORIENTATION = POSITIVE_BACK /* Positive pole is on back face of mesh elements (facing diffusion space). */ } }