Los Alamos National Laboratory Poisson Superfish Program Automesh written by James H. Billen and Lloyd M. Young The original Poisson Superfish codes were developed by Ron F. Holsinger in collaboration with Klaus Halbach. These programs are provided as a service to the accelerator community by the Los Alamos Accelerator Code Group (LAACG). (c) Copyright 1985-2005, by the Regents of the University of California. This software was produced under U. S. Government contract W-7405-ENG-36 by Los Alamos National Laboratory, which is operated by the University of California for the U. S. Department of Energy. Neither the Government nor the University makes any warranty, express or implied, or assumes any liability or responsibility for its use, or represents that use of this software would not infringe privately owned rights. Unpublished - rights reserved under Copyright Laws of the United States. Program Automesh 7.17 released 1-13-2006 Program file: C:\LANL\AUTOFISH.EXE Problem file: Z:\HOME\JCG\.WINE\SUPERFISH-EXAMPLES\MAG-INSUL.AF 3-29-2008 22:54:02 SF.INI file: Z:\home\jcg\SF.INI 2-15-2008 9:33:32 Problem description: 805 MHz TM010 Cavity Mag Insulation In this problem, Kmax < Lmax Coordinates and lengths have dimensions of centimeters. Region data: IREG = 1 MAT = 1 CUR = 0.0 DEN = 0.0 ITRI = 0 [equal weight triangles] IBOUND = 1 [Neumann boundary] IPDIAG = 0 [no extra Automesh diagnostics] DX = 0.1 XMIN = 0.0 XMAX = 12 DY = 0.0866025 [=DX*sin(60)] YMIN = 0.0 YMAX = 15.287 DX1 = 0.1 KMAX = 121 DY1 = 0.0863672 LMAX = 178 ITOT = 22140 Memory used for the solution file: 797.040 K Memory used for Automesh setup data: 363.984 K Region 1 boundary points from the PO namelist: Point NT X0 Y0 X Y R THETA A B 1 1 0.000 0.000 2 1 0.000 15.29 3 1 2.266 15.29 4 5 3.536 14.09 1.270 1.270 5 1 3.500 13.90 6 1 3.220 13.50 7 1 2.849 13.15 8 1 2.475 12.10 9 1 2.353 10.87 10 1 2.373 9.711 11 1 2.536 8.528 12 1 2.923 7.345 13 1 3.615 6.237 14 1 4.471 5.381 15 1 5.550 4.776 16 1 7.037 4.373 17 1 8.157 4.278 18 1 10.00 4.178 19 1 12.00 4.100 20 1 12.00 0.000 21 1 0.000 0.000 Number of user-supplied fixed points = 21 Fixed points added at line regions = 0 Fixed points added on overlapping regions = 0 Total number of fixed points = 21 Logical path finding for region 1 (includes extra boundary points at intersections of line regions plus points from other user-supplied segments) Point NT X Y R A B Fwd Bkw 2 1 0.000 15.29 178 178 3 1 2.266 15.29 24 24 4 2 3.536 14.09 1.270 1.270 22 22 5 1 3.500 13.90 3 3 6 1 3.220 13.50 6 6 7 1 2.849 13.15 7 7 8 1 2.475 12.10 13 13 9 1 2.353 10.87 15 15 10 1 2.373 9.711 14 14 11 1 2.536 8.528 15 15 12 1 2.923 7.345 15 15 13 1 3.615 6.237 15 15 14 1 4.471 5.381 14 14 15 1 5.550 4.776 16 16 16 1 7.037 4.373 18 18 17 1 8.157 4.278 13 13 18 1 10.00 4.178 20 20 19 1 12.00 4.100 21 21 20 1 12.00 0.000 48 48 21 1 0.000 0.000 121 121 Region 1 mesh points K L X Y 1 1 0.00000000 0.00000000 1 2 0.00000000 8.636723164E-02 1 3 0.00000000 0.172734463 1 4 0.00000000 0.259101695 1 5 0.00000000 0.345468927 1 6 0.00000000 0.431836158 1 7 0.00000000 0.518203390 1 8 0.00000000 0.604570621 1 9 0.00000000 0.690937853 1 10 0.00000000 0.777305085 1 11 0.00000000 0.863672316 1 12 0.00000000 0.950039548 1 13 0.00000000 1.03640678 1 14 0.00000000 1.12277401 1 15 0.00000000 1.20914124 1 16 0.00000000 1.29550847 1 17 0.00000000 1.38187571 1 18 0.00000000 1.46824294 1 19 0.00000000 1.55461017 1 20 0.00000000 1.64097740 1 21 0.00000000 1.72734463 1 22 0.00000000 1.81371186 1 23 0.00000000 1.90007910 1 24 0.00000000 1.98644633 1 25 0.00000000 2.07281356 1 26 0.00000000 2.15918079 1 27 0.00000000 2.24554802 1 28 0.00000000 2.33191525 1 29 0.00000000 2.41828249 1 30 0.00000000 2.50464972 1 31 0.00000000 2.59101695 1 32 0.00000000 2.67738418 1 33 0.00000000 2.76375141 1 34 0.00000000 2.85011864 1 35 0.00000000 2.93648588 1 36 0.00000000 3.02285311 1 37 0.00000000 3.10922034 1 38 0.00000000 3.19558757 1 39 0.00000000 3.28195480 1 40 0.00000000 3.36832203 1 41 0.00000000 3.45468927 1 42 0.00000000 3.54105650 1 43 0.00000000 3.62742373 1 44 0.00000000 3.71379096 1 45 0.00000000 3.80015819 1 46 0.00000000 3.88652542 1 47 0.00000000 3.97289266 1 48 0.00000000 4.05925989 1 49 0.00000000 4.14562712 1 50 0.00000000 4.23199435 1 51 0.00000000 4.31836158 1 52 0.00000000 4.40472881 1 53 0.00000000 4.49109605 1 54 0.00000000 4.57746328 1 55 0.00000000 4.66383051 1 56 0.00000000 4.75019774 1 57 0.00000000 4.83656497 1 58 0.00000000 4.92293220 1 59 0.00000000 5.00929944 1 60 0.00000000 5.09566667 1 61 0.00000000 5.18203390 1 62 0.00000000 5.26840113 1 63 0.00000000 5.35476836 1 64 0.00000000 5.44113559 1 65 0.00000000 5.52750282 1 66 0.00000000 5.61387006 1 67 0.00000000 5.70023729 1 68 0.00000000 5.78660452 1 69 0.00000000 5.87297175 1 70 0.00000000 5.95933898 1 71 0.00000000 6.04570621 1 72 0.00000000 6.13207345 1 73 0.00000000 6.21844068 1 74 0.00000000 6.30480791 1 75 0.00000000 6.39117514 1 76 0.00000000 6.47754237 1 77 0.00000000 6.56390960 1 78 0.00000000 6.65027684 1 79 0.00000000 6.73664407 1 80 0.00000000 6.82301130 1 81 0.00000000 6.90937853 1 82 0.00000000 6.99574576 1 83 0.00000000 7.08211299 1 84 0.00000000 7.16848023 1 85 0.00000000 7.25484746 1 86 0.00000000 7.34121469 1 87 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0.00000000 10.5368023 1 124 0.00000000 10.6231695 1 125 0.00000000 10.7095367 1 126 0.00000000 10.7959040 1 127 0.00000000 10.8822712 1 128 0.00000000 10.9686384 1 129 0.00000000 11.0550056 1 130 0.00000000 11.1413729 1 131 0.00000000 11.2277401 1 132 0.00000000 11.3141073 1 133 0.00000000 11.4004746 1 134 0.00000000 11.4868418 1 135 0.00000000 11.5732090 1 136 0.00000000 11.6595763 1 137 0.00000000 11.7459435 1 138 0.00000000 11.8323107 1 139 0.00000000 11.9186780 1 140 0.00000000 12.0050452 1 141 0.00000000 12.0914124 1 142 0.00000000 12.1777797 1 143 0.00000000 12.2641469 1 144 0.00000000 12.3505141 1 145 0.00000000 12.4368814 1 146 0.00000000 12.5232486 1 147 0.00000000 12.6096158 1 148 0.00000000 12.6959831 1 149 0.00000000 12.7823503 1 150 0.00000000 12.8687175 1 151 0.00000000 12.9550847 1 152 0.00000000 13.0414520 1 153 0.00000000 13.1278192 1 154 0.00000000 13.2141864 1 155 0.00000000 13.3005537 1 156 0.00000000 13.3869209 1 157 0.00000000 13.4732881 1 158 0.00000000 13.5596554 1 159 0.00000000 13.6460226 1 160 0.00000000 13.7323898 1 161 0.00000000 13.8187571 1 162 0.00000000 13.9051243 1 163 0.00000000 13.9914915 1 164 0.00000000 14.0778588 1 165 0.00000000 14.1642260 1 166 0.00000000 14.2505932 1 167 0.00000000 14.3369605 1 168 0.00000000 14.4233277 1 169 0.00000000 14.5096949 1 170 0.00000000 14.5960621 1 171 0.00000000 14.6824294 1 172 0.00000000 14.7687966 1 173 0.00000000 14.8551638 1 174 0.00000000 14.9415311 1 175 0.00000000 15.0278983 1 176 0.00000000 15.1142655 1 177 0.00000000 15.2006328 1 178 0.00000000 15.2870000 2 178 9.852173913E-02 15.2870000 3 178 0.197043478 15.2870000 4 178 0.295565217 15.2870000 5 178 0.394086957 15.2870000 6 178 0.492608696 15.2870000 7 178 0.591130435 15.2870000 8 178 0.689652174 15.2870000 9 178 0.788173913 15.2870000 10 178 0.886695652 15.2870000 11 178 0.985217391 15.2870000 12 178 1.08373913 15.2870000 13 178 1.18226087 15.2870000 14 178 1.28078261 15.2870000 15 178 1.37930435 15.2870000 16 178 1.47782609 15.2870000 17 178 1.57634783 15.2870000 18 178 1.67486957 15.2870000 19 178 1.77339130 15.2870000 20 178 1.87191304 15.2870000 21 178 1.97043478 15.2870000 22 178 2.06895652 15.2870000 23 178 2.16747826 15.2870000 24 178 2.26600000 15.2870000 25 178 2.36473531 15.2833067 26 178 2.46268936 15.2719792 27 178 2.55909055 15.2531753 27 177 2.65321465 15.2271486 28 177 2.74440271 15.1942331 29 177 2.83207284 15.1548255 30 176 2.91572575 15.1093665 31 176 2.99494462 15.0583230 31 175 3.06939043 15.0021725 32 174 3.13879295 14.9413924 33 174 3.20294358 14.8764493 33 173 3.26168490 14.8077936 34 172 3.31490226 14.7358548 34 171 3.36251352 14.6610419 35 170 3.40446278 14.5837416 35 169 3.44071379 14.5043200 36 168 3.47124453 14.4231239 35 167 3.49604273 14.3404831 36 166 3.51510252 14.2567138 36 165 3.52842171 14.1721206 37 164 3.53600000 14.0870000 36 163 3.51800000 13.9935000 36 162 3.50000000 13.9000000 35 161 3.44400000 13.8200000 35 160 3.38800000 13.7400000 34 159 3.33200000 13.6600000 34 158 3.27600000 13.5800000 33 157 3.22000000 13.5000000 33 156 3.15816667 13.4413333 32 156 3.09633333 13.3826667 31 155 3.03450000 13.3240000 31 154 2.97266667 13.2653333 30 154 2.91083333 13.2066667 29 153 2.84900000 13.1480000 29 152 2.81783333 13.0609167 28 151 2.78666667 12.9738333 28 150 2.75550000 12.8867500 28 149 2.72433333 12.7996667 28 148 2.69316667 12.7125833 27 147 2.66200000 12.6255000 27 146 2.63083333 12.5384167 26 145 2.59966667 12.4513333 26 144 2.56850000 12.3642500 26 143 2.53733333 12.2771667 26 142 2.50616667 12.1900833 25 141 2.47500000 12.1030000 25 140 2.46628571 12.0148571 25 139 2.45757143 11.9267143 25 138 2.44885714 11.8385714 25 137 2.44014286 11.7504286 25 136 2.43142857 11.6622857 25 135 2.42271429 11.5741429 25 134 2.41400000 11.4860000 24 133 2.40528571 11.3978571 25 132 2.39657143 11.3097143 24 131 2.38785714 11.2215714 25 130 2.37914286 11.1334286 24 129 2.37042857 11.0452857 25 128 2.36171429 10.9571429 24 127 2.35300000 10.8690000 25 126 2.35453846 10.7799385 24 125 2.35607692 10.6908769 25 124 2.35761538 10.6018154 24 123 2.35915385 10.5127538 25 122 2.36069231 10.4236923 24 121 2.36223077 10.3346308 25 120 2.36376923 10.2455692 24 119 2.36530769 10.1565077 25 118 2.36684615 10.0674462 24 117 2.36838462 9.97838462 25 116 2.36992308 9.88932308 24 115 2.37146154 9.80026154 25 114 2.37300000 9.71120000 25 113 2.38464286 9.62667143 25 112 2.39628571 9.54214286 25 111 2.40792857 9.45761429 26 110 2.41957143 9.37308571 26 109 2.43121429 9.28855714 26 108 2.44285714 9.20402857 26 107 2.45450000 9.11950000 26 106 2.46614286 9.03497143 26 105 2.47778571 8.95044286 26 104 2.48942857 8.86591429 26 103 2.50107143 8.78138571 27 102 2.51271429 8.69685714 26 101 2.52435714 8.61232857 27 100 2.53600000 8.52780000 27 99 2.56364286 8.44327857 27 98 2.59128571 8.35875714 27 97 2.61892857 8.27423571 28 96 2.64657143 8.18971429 28 95 2.67421429 8.10519286 28 94 2.70185714 8.02067143 28 93 2.72950000 7.93615000 29 92 2.75714286 7.85162857 29 91 2.78478571 7.76710714 29 90 2.81242857 7.68258571 29 89 2.84007143 7.59806429 30 88 2.86771429 7.51354286 29 87 2.89535714 7.42902143 30 86 2.92300000 7.34450000 30 85 2.97242857 7.26536429 31 84 3.02185714 7.18622857 31 83 3.07128571 7.10709286 32 82 3.12071429 7.02795714 32 81 3.17014286 6.94882143 33 80 3.21957143 6.86968571 33 79 3.26900000 6.79055000 34 79 3.31842857 6.71141429 35 78 3.36785714 6.63227857 35 77 3.41728571 6.55314286 36 76 3.46671429 6.47400714 36 75 3.51614286 6.39487143 37 74 3.56557143 6.31573571 37 73 3.61500000 6.23660000 38 72 3.68083077 6.17075385 38 71 3.74666154 6.10490769 39 71 3.81249231 6.03906154 40 70 3.87832308 5.97321538 40 69 3.94415385 5.90736923 41 68 4.00998462 5.84152308 42 68 4.07581538 5.77567692 42 67 4.14164615 5.70983077 43 66 4.20747692 5.64398462 43 65 4.27330769 5.57813846 44 65 4.33913846 5.51229231 45 64 4.40496923 5.44644615 45 63 4.47080000 5.38060000 46 63 4.54275333 5.34031333 47 62 4.61470667 5.30002667 48 62 4.68666000 5.25974000 48 61 4.75861333 5.21945333 49 61 4.83056667 5.17916667 50 60 4.90252000 5.13888000 51 60 4.97447333 5.09859333 51 59 5.04642667 5.05830667 52 59 5.11838000 5.01802000 53 58 5.19033333 4.97773333 54 58 5.26228667 4.93744667 54 57 5.33424000 4.89716000 55 57 5.40619333 4.85687333 56 56 5.47814667 4.81658667 57 56 5.55010000 4.77630000 58 56 5.63754706 4.75260588 59 56 5.72499412 4.72891176 59 55 5.81244118 4.70521765 60 55 5.89988824 4.68152353 61 55 5.98733529 4.65782941 62 55 6.07478235 4.63413529 63 54 6.16222941 4.61044118 64 54 6.24967647 4.58674706 65 54 6.33712353 4.56305294 66 54 6.42457059 4.53935882 66 53 6.51201765 4.51566471 67 53 6.59946471 4.49197059 68 53 6.68691176 4.46827647 69 53 6.77435882 4.44458235 70 52 6.86180588 4.42088824 71 52 6.94925294 4.39719412 72 52 7.03670000 4.37350000 73 52 7.13003333 4.36554167 74 52 7.22336667 4.35758333 75 52 7.31670000 4.34962500 75 51 7.41003333 4.34166667 76 51 7.50336667 4.33370833 77 51 7.59670000 4.32575000 78 51 7.69003333 4.31779167 79 51 7.78336667 4.30983333 80 51 7.87670000 4.30187500 81 50 7.97003333 4.29391667 82 50 8.06336667 4.28595833 83 50 8.15670000 4.27800000 84 50 8.25371579 4.27273684 85 50 8.35073158 4.26747368 86 50 8.44774737 4.26221053 87 50 8.54476316 4.25694737 88 50 8.64177895 4.25168421 89 50 8.73879474 4.24642105 90 50 8.83581053 4.24115789 91 50 8.93282632 4.23589474 92 50 9.02984211 4.23063158 92 49 9.12685789 4.22536842 93 49 9.22387368 4.22010526 94 49 9.32088947 4.21484211 95 49 9.41790526 4.20957895 96 49 9.51492105 4.20431579 97 49 9.61193684 4.19905263 98 49 9.70895263 4.19378947 99 49 9.80596842 4.18852632 100 49 9.90298421 4.18326316 101 49 10.0000000 4.17800000 102 49 10.1000000 4.17410000 103 49 10.2000000 4.17020000 104 49 10.3000000 4.16630000 105 49 10.4000000 4.16240000 106 49 10.5000000 4.15850000 107 49 10.6000000 4.15460000 108 49 10.7000000 4.15070000 109 49 10.8000000 4.14680000 110 49 10.9000000 4.14290000 111 49 11.0000000 4.13900000 112 48 11.1000000 4.13510000 113 48 11.2000000 4.13120000 114 48 11.3000000 4.12730000 115 48 11.4000000 4.12340000 116 48 11.5000000 4.11950000 117 48 11.6000000 4.11560000 118 48 11.7000000 4.11170000 119 48 11.8000000 4.10780000 120 48 11.9000000 4.10390000 121 48 12.0000000 4.10000000 121 47 12.0000000 4.01276596 121 46 12.0000000 3.92553191 121 45 12.0000000 3.83829787 121 44 12.0000000 3.75106383 121 43 12.0000000 3.66382979 121 42 12.0000000 3.57659574 121 41 12.0000000 3.48936170 121 40 12.0000000 3.40212766 121 39 12.0000000 3.31489362 121 38 12.0000000 3.22765957 121 37 12.0000000 3.14042553 121 36 12.0000000 3.05319149 121 35 12.0000000 2.96595745 121 34 12.0000000 2.87872340 121 33 12.0000000 2.79148936 121 32 12.0000000 2.70425532 121 31 12.0000000 2.61702128 121 30 12.0000000 2.52978723 121 29 12.0000000 2.44255319 121 28 12.0000000 2.35531915 121 27 12.0000000 2.26808511 121 26 12.0000000 2.18085106 121 25 12.0000000 2.09361702 121 24 12.0000000 2.00638298 121 23 12.0000000 1.91914894 121 22 12.0000000 1.83191489 121 21 12.0000000 1.74468085 121 20 12.0000000 1.65744681 121 19 12.0000000 1.57021277 121 18 12.0000000 1.48297872 121 17 12.0000000 1.39574468 121 16 12.0000000 1.30851064 121 15 12.0000000 1.22127660 121 14 12.0000000 1.13404255 121 13 12.0000000 1.04680851 121 12 12.0000000 0.959574468 121 11 12.0000000 0.872340426 121 10 12.0000000 0.785106383 121 9 12.0000000 0.697872340 121 8 12.0000000 0.610638298 121 7 12.0000000 0.523404255 121 6 12.0000000 0.436170213 121 5 12.0000000 0.348936170 121 4 12.0000000 0.261702128 121 3 12.0000000 0.174468085 121 2 12.0000000 8.723404255E-02 121 1 12.0000000 0.00000000 120 1 11.9000000 0.00000000 119 1 11.8000000 0.00000000 118 1 11.7000000 0.00000000 117 1 11.6000000 0.00000000 116 1 11.5000000 0.00000000 115 1 11.4000000 0.00000000 114 1 11.3000000 0.00000000 113 1 11.2000000 0.00000000 112 1 11.1000000 0.00000000 111 1 11.0000000 0.00000000 110 1 10.9000000 0.00000000 109 1 10.8000000 0.00000000 108 1 10.7000000 0.00000000 107 1 10.6000000 0.00000000 106 1 10.5000000 0.00000000 105 1 10.4000000 0.00000000 104 1 10.3000000 0.00000000 103 1 10.2000000 0.00000000 102 1 10.1000000 0.00000000 101 1 10.0000000 0.00000000 100 1 9.90000000 0.00000000 99 1 9.80000000 0.00000000 98 1 9.70000000 0.00000000 97 1 9.60000000 0.00000000 96 1 9.50000000 0.00000000 95 1 9.40000000 0.00000000 94 1 9.30000000 0.00000000 93 1 9.20000000 0.00000000 92 1 9.10000000 0.00000000 91 1 9.00000000 0.00000000 90 1 8.90000000 0.00000000 89 1 8.80000000 0.00000000 88 1 8.70000000 0.00000000 87 1 8.60000000 0.00000000 86 1 8.50000000 0.00000000 85 1 8.40000000 0.00000000 84 1 8.30000000 0.00000000 83 1 8.20000000 0.00000000 82 1 8.10000000 0.00000000 81 1 8.00000000 0.00000000 80 1 7.90000000 0.00000000 79 1 7.80000000 0.00000000 78 1 7.70000000 0.00000000 77 1 7.60000000 0.00000000 76 1 7.50000000 0.00000000 75 1 7.40000000 0.00000000 74 1 7.30000000 0.00000000 73 1 7.20000000 0.00000000 72 1 7.10000000 0.00000000 71 1 7.00000000 0.00000000 70 1 6.90000000 0.00000000 69 1 6.80000000 0.00000000 68 1 6.70000000 0.00000000 67 1 6.60000000 0.00000000 66 1 6.50000000 0.00000000 65 1 6.40000000 0.00000000 64 1 6.30000000 0.00000000 63 1 6.20000000 0.00000000 62 1 6.10000000 0.00000000 61 1 6.00000000 0.00000000 60 1 5.90000000 0.00000000 59 1 5.80000000 0.00000000 58 1 5.70000000 0.00000000 57 1 5.60000000 0.00000000 56 1 5.50000000 0.00000000 55 1 5.40000000 0.00000000 54 1 5.30000000 0.00000000 53 1 5.20000000 0.00000000 52 1 5.10000000 0.00000000 51 1 5.00000000 0.00000000 50 1 4.90000000 0.00000000 49 1 4.80000000 0.00000000 48 1 4.70000000 0.00000000 47 1 4.60000000 0.00000000 46 1 4.50000000 0.00000000 45 1 4.40000000 0.00000000 44 1 4.30000000 0.00000000 43 1 4.20000000 0.00000000 42 1 4.10000000 0.00000000 41 1 4.00000000 0.00000000 40 1 3.90000000 0.00000000 39 1 3.80000000 0.00000000 38 1 3.70000000 0.00000000 37 1 3.60000000 0.00000000 36 1 3.50000000 0.00000000 35 1 3.40000000 0.00000000 34 1 3.30000000 0.00000000 33 1 3.20000000 0.00000000 32 1 3.10000000 0.00000000 31 1 3.00000000 0.00000000 30 1 2.90000000 0.00000000 29 1 2.80000000 0.00000000 28 1 2.70000000 0.00000000 27 1 2.60000000 0.00000000 26 1 2.50000000 0.00000000 25 1 2.40000000 0.00000000 24 1 2.30000000 0.00000000 23 1 2.20000000 0.00000000 22 1 2.10000000 0.00000000 21 1 2.00000000 0.00000000 20 1 1.90000000 0.00000000 19 1 1.80000000 0.00000000 18 1 1.70000000 0.00000000 17 1 1.60000000 0.00000000 16 1 1.50000000 0.00000000 15 1 1.40000000 0.00000000 14 1 1.30000000 0.00000000 13 1 1.20000000 0.00000000 12 1 1.10000000 0.00000000 11 1 1.00000000 0.00000000 10 1 0.900000000 0.00000000 9 1 0.800000000 0.00000000 8 1 0.700000000 0.00000000 7 1 0.600000000 0.00000000 6 1 0.500000000 0.00000000 5 1 0.400000000 0.00000000 4 1 0.300000000 0.00000000 3 1 0.200000000 0.00000000 2 1 0.100000000 0.00000000 1 1 0.00000000 0.00000000 Region 1 done, 21 fixed points, 579 total boundary points. Logical boundary segment end points for region 1: Segment Starting Point Ending Point K L K L 1 1 1 1 178 2 1 178 24 178 3 24 178 37 164 4 37 164 36 162 5 36 162 33 157 6 33 157 29 153 7 29 153 25 141 8 25 141 24 127 9 24 127 25 114 10 25 114 27 100 11 27 100 30 86 12 30 86 37 73 13 37 73 45 63 14 45 63 57 56 15 57 56 72 52 16 72 52 83 50 17 83 50 101 49 18 101 49 121 48 19 121 48 121 1 20 121 1 1 1 Drive point at X = 0.001, K = 2, Y = 15.127, L = 176. Region 2 mesh points K L X Y 2 176 1.000000000E-03 15.1270000 Processing boundary data... Memory used for additional setup arrays: 573.232 K Region 1 Material = 1 Region boundary indicator = 1 Equal-weight triangles Region 1 is closed. Region 2 Material = 1 Region boundary indicator = -1 Driving field = 1 Equal-weight triangles Region 2 contains a single point. Logical boundary segment end points for all regions: Segment Starting Point Ending Point Index K L Index K L 1 1 1 1 178 1 178 2 178 1 178 201 24 178 3 201 24 178 222 37 164 4 222 37 164 224 36 162 5 224 36 162 229 33 157 6 229 33 157 235 29 153 7 235 29 153 247 25 141 8 247 25 141 261 24 127 9 261 24 127 274 25 114 10 274 25 114 288 27 100 11 288 27 100 302 30 86 12 302 30 86 316 37 73 13 316 37 73 329 45 63 14 329 45 63 344 57 56 15 344 57 56 361 72 52 16 361 72 52 373 83 50 17 373 83 50 392 101 49 18 392 101 49 412 121 48 19 412 121 48 459 121 1 20 459 121 1 579 1 1 Relaxation parameters, 9629 unknown points. The upper triangle of point (1,176) has a negative or near zero area: Area = 0.4318365E-04 cm^2 Index K L X Y Upper Lower 21650 1 176 0.0000000 15.1142655 1 1 21651 2 176 0.0010000 15.1270000 1 1 21773 1 177 0.0000000 15.2006328 1 1 The lower triangle of point (1,176) has a negative or near zero area: Area = 0.4318360E-04 cm^2 Index K L X Y Upper Lower 21650 1 176 0.0000000 15.1142655 1 1 21651 2 176 0.0010000 15.1270000 1 1 21527 1 175 0.0000000 15.0278983 1 1 Optimizing mesh by successive over relaxation... -------X coordinate-------- -------Y coordinate-------- Cycle Residual ETA RHO Residual ETA RHO 1 7.173E-03 1.0000 1.6000 1.388E-03 1.0000 1.6000 2 7.687E-03 0.6736 1.6000 1.369E-03 0.6361 1.6000 3 5.232E-03 0.6805 1.6000 9.010E-04 0.6581 1.6000 4 3.542E-03 0.6771 1.6000 6.072E-04 0.6740 1.6000 5 2.418E-03 0.6827 1.6000 4.168E-04 0.6864 1.6000 6 1.640E-03 0.6781 1.6000 2.905E-04 0.6969 1.6000 7 1.125E-03 0.6861 1.6000 2.053E-04 0.7067 1.6000 8 7.647E-04 0.6797 1.6000 1.472E-04 0.7169 1.6000 9 5.301E-04 0.6932 1.6000 1.073E-04 0.7291 1.6000 10 3.630E-04 0.6849 1.6000 7.985E-05 0.7442 1.6000 11 2.576E-04 0.7096 1.6000 6.096E-05 0.7635 1.6000 12 1.807E-04 0.7015 1.6000 4.797E-05 0.7868 1.6000 13 1.349E-04 0.7465 1.6000 3.902E-05 0.8134 1.6000 14 1.004E-04 0.7444 1.6000 3.280E-05 0.8406 1.6000 15 8.153E-05 0.8119 1.6000 2.840E-05 0.8660 1.6000 16 6.649E-05 0.8155 1.6000 2.520E-05 0.8873 1.6000 17 5.863E-05 0.8818 1.6000 2.279E-05 0.9041 1.6000 18 5.170E-05 0.8817 1.6000 2.088E-05 0.9164 1.6000 19 4.780E-05 0.9247 1.6000 1.932E-05 0.9253 1.6000 20 4.403E-05 0.9210 1.6000 1.800E-05 0.9317 1.6000 21 4.156E-05 0.9440 1.6000 1.685E-05 0.9363 1.6000 22 3.912E-05 0.9411 1.6000 1.584E-05 0.9397 1.6000 23 3.729E-05 0.9533 1.6000 1.492E-05 0.9423 1.6000 24 3.551E-05 0.9522 1.6000 1.409E-05 0.9443 1.6000 25 3.405E-05 0.9591 1.6000 1.333E-05 0.9460 1.6000 26 7.327E-05 2.1515 1.8193 2.449E-05 1.8367 1.7959 27 6.955E-05 0.9492 1.8193 2.240E-05 0.9149 1.7959 28 6.598E-05 0.9487 1.8193 2.054E-05 0.9171 1.7959 29 6.287E-05 0.9529 1.8193 1.889E-05 0.9192 1.7959 30 5.990E-05 0.9527 1.8193 1.740E-05 0.9212 1.7959 31 5.729E-05 0.9564 1.8193 1.606E-05 0.9231 1.7959 32 5.479E-05 0.9564 1.8193 1.485E-05 0.9248 1.7959 33 5.256E-05 0.9594 1.8193 1.376E-05 0.9265 1.7959 34 5.044E-05 0.9596 1.8193 1.277E-05 0.9282 1.7959 35 4.853E-05 0.9621 1.8193 1.188E-05 0.9299 1.7959 36 4.670E-05 0.9624 1.8193 1.106E-05 0.9315 1.7959 37 4.505E-05 0.9645 1.8193 1.032E-05 0.9331 1.7959 38 4.347E-05 0.9649 1.8193 9.649E-06 0.9347 1.7959 39 4.202E-05 0.9667 1.8193 9.033E-06 0.9363 1.7959 40 4.063E-05 0.9671 1.8193 8.472E-06 0.9378 1.7959 41 3.935E-05 0.9685 1.8193 7.958E-06 0.9394 1.7959 42 3.813E-05 0.9689 1.8193 7.488E-06 0.9409 1.7959 43 3.699E-05 0.9701 1.8193 7.058E-06 0.9425 1.7959 44 3.590E-05 0.9705 1.8193 6.663E-06 0.9440 1.7959 45 3.487E-05 0.9714 1.8193 6.300E-06 0.9455 1.7959 46 3.389E-05 0.9718 1.8193 5.966E-06 0.9471 1.7959 47 3.296E-05 0.9725 1.8193 5.659E-06 0.9486 1.7959 48 3.206E-05 0.9729 1.8193 5.377E-06 0.9500 1.7959 49 3.121E-05 0.9735 1.8193 5.116E-06 0.9515 1.7959 50 3.039E-05 0.9737 1.8193 4.875E-06 0.9529 1.7959 51 5.309E-05 1.7468 1.9064 6.773E-06 1.3894 1.8702 52 5.130E-05 0.9663 1.9064 6.414E-06 0.9470 1.8702 53 4.955E-05 0.9659 1.9064 6.087E-06 0.9490 1.8702 54 4.783E-05 0.9653 1.9064 5.787E-06 0.9507 1.8702 55 4.615E-05 0.9649 1.9064 5.510E-06 0.9522 1.8702 56 4.451E-05 0.9644 1.9064 5.254E-06 0.9535 1.8702 57 4.291E-05 0.9640 1.9064 5.015E-06 0.9545 1.8702 58 4.135E-05 0.9636 1.9064 4.791E-06 0.9553 1.8702 59 3.983E-05 0.9633 1.9064 4.580E-06 0.9560 1.8702 60 3.835E-05 0.9629 1.9064 4.380E-06 0.9564 1.8702 61 3.692E-05 0.9626 1.9064 4.191E-06 0.9567 1.8702 62 3.552E-05 0.9623 1.9064 4.010E-06 0.9569 1.8702 63 3.417E-05 0.9620 1.9064 3.838E-06 0.9570 1.8702 64 3.286E-05 0.9617 1.9064 3.672E-06 0.9569 1.8702 65 3.160E-05 0.9615 1.9064 3.514E-06 0.9568 1.8702 66 3.037E-05 0.9612 1.9064 3.362E-06 0.9567 1.8702 67 2.919E-05 0.9610 1.9064 3.216E-06 0.9565 1.8702 68 2.804E-05 0.9607 1.9064 3.075E-06 0.9562 1.8702 69 2.693E-05 0.9604 1.9064 2.939E-06 0.9559 1.8702 70 2.585E-05 0.9601 1.9064 2.809E-06 0.9556 1.8702 71 2.481E-05 0.9598 1.9064 2.683E-06 0.9553 1.8702 72 2.381E-05 0.9594 1.9064 2.562E-06 0.9549 1.8702 73 2.283E-05 0.9591 1.9064 2.446E-06 0.9546 1.8702 74 2.189E-05 0.9587 1.9064 2.334E-06 0.9542 1.8702 75 2.097E-05 0.9583 1.9064 2.226E-06 0.9539 1.8702 76 2.322E-05 1.1072 1.9232 2.646E-06 1.1888 1.9019 77 2.219E-05 0.9556 1.9232 2.516E-06 0.9505 1.9019 78 2.119E-05 0.9547 1.9232 2.389E-06 0.9496 1.9019 79 2.021E-05 0.9538 1.9232 2.266E-06 0.9487 1.9019 80 1.926E-05 0.9529 1.9232 2.148E-06 0.9479 1.9019 81 1.833E-05 0.9520 1.9232 2.034E-06 0.9470 1.9019 82 1.744E-05 0.9512 1.9232 1.925E-06 0.9462 1.9019 83 1.657E-05 0.9503 1.9232 1.820E-06 0.9453 1.9019 84 1.573E-05 0.9494 1.9232 1.719E-06 0.9445 1.9019 85 1.492E-05 0.9486 1.9232 1.622E-06 0.9437 1.9019 86 1.414E-05 0.9477 1.9232 1.529E-06 0.9430 1.9019 87 1.339E-05 0.9468 1.9232 1.441E-06 0.9422 1.9019 88 1.267E-05 0.9460 1.9232 1.357E-06 0.9415 1.9019 89 1.197E-05 0.9451 1.9232 1.277E-06 0.9408 1.9019 90 1.130E-05 0.9442 1.9232 1.200E-06 0.9402 1.9019 91 1.066E-05 0.9433 1.9232 1.128E-06 0.9396 1.9019 92 1.005E-05 0.9423 1.9232 1.059E-06 0.9390 1.9019 93 9.459E-06 0.9414 1.9232 9.938E-07 0.9386 1.9019 Iteration converged. Generation completed. Problem description: 805 MHz TM010 Cavity Mag Insulation In this problem, Kmax < Lmax Problem file: Z:\HOME\JCG\.WINE\SUPERFISH-EXAMPLES\MAG-INSUL.AF 3-29-2008 22:54:02 Problem file length: 897 bytes Originating program: Autofish Problem type: Unknown RF Cavity Problem constants and variables. Letter A in the code column indicates a value supplied in the Automesh input file. Variable Code Value Description ALPHAT 3.930000000E-03 Temperature coefficient of resistance ASCALE 3767.30313 Scaling factor for H at drive point BETA 0.0 Particle velocity BETA1 0.100000000 Starting BETA in transit-time table BETA2 0.950000000 Ending BETA in transit-time table CCLDELK 1.00000000 Increment for coupling for table in SFO CCLMAXK 6.00000000 Highest coupling for table in SFO CCLMINK 1.00000000 Lowest coupling for table in SFO CLENGTH 0.0 Cavity length for normalization in SFO CLIGHT 2.997924580E+10 Exact speed of light in cm/sec CONV 1.00000000 Length conversion (number of units per cm) DBETA 5.000000000E-02 BETA increment in transit-time table DELFR 0.0 Frequency step size for a resonance search DIAGDLL 0 If 1, DLL writes diagnostics to DiagDLL.txt DPHI 180.000000 Phase length of the problem geometry DSLOPE 1.00000000 Slope of D(k^2) function DSTOLER 2.000000000E-02 Tolerance required on D(k^2) DX1 0.100000000 First X mesh interval (at XMIN) DXMIN 0.100000000 Minimum X mesh interval (found by Automesh) DYMIN 8.636723993E-02 Minimum Y mesh interval (found by Automesh) ENORM 1000000.00 Field normalization for NORM=4 option EPS0 8.854187818E-12 Permittivity of free space EPSIK 1.000000000E-04 Frequency convergence parameter EPSO 1.000000000E-05 Convergence parameter in mesh optimization EZERO 1000000.00 E0 for normalization in SFO when NORM=0 EZEROT 1000000.00 E0*T for normalization in SFO when NORM=1 FMU0 1.256637061E-06 Permeability of free space FREQ A 800.000000 RF cavity resonant frequency FREQD 0.0 Design frequency for a cavity (MHz) HPHI 5000.00000 Normalization magnetic field for NORM=2 IBETA 0 If >0, SFO writes transit-time vs BETA ICCC 1 1 for real arrays, 2 for complex arrays ICCP 1 If 1, compute material power loss ICORNER1 0 First corner segment for computing average H ICORNER2 0 Last corner segment for computing average H ICYLIN 1 0 for X,Y problems, 1 for Z,R problems IMAX 123 KMAX+2 INFODATA 0 Number of tuning-code parameters IOBSEG -1 First segment of the CCL outer boundary IPIVOT 1 Pivoting in matrix inversion routines IRESID 0 If 1, calculate potential residuals IRMAX 25 Used in optimization of RHOXY IRTYPE 0 Surface resistance option indicator ISLOT 0 If 1, SFO computes coupling-slot power loss ITFILE 0 If 1, SFO writes transit-time plot file ITOT 22140 (KMAX+2)*(LMAX+2) KDRI 2 K coordinate of the drive point KMAX 121 Number of horizontal logical mesh points KMETHOD 0 Wavenumber computation method (1= use beta) KPROB A 1 Problem type indicator (Superfish) LAST35 0 Code for last program to update T35 file LCYCLE 93 Iteration number in mesh optimization LDRI 176 L coordinate of the drive point LINT 1 Logical-mesh coordinate for Ez integration LMAX 178 Number of vertical logical mesh points MAXCY -1 Maximum number of cycles (-1: use default) MAXPPR 580 Maximum points per region NAIR 10086 Number of air points NBND 121 Number of Dirichlet boundary points NBSLF 1 Left-side boundary condition NBSLO 0 Lower boundary condition NBSRT 1 Right-side boundary condition NBSUP 1 Upper boundary condition NDRI 21651 Drive point index = IRLAX(NPINP) NEGAT 0 Zero-area triangle indicator NFE 0 Number of iron points NHSTEM 1 Number of half stems NINTER 0 Number of interface points NMATR 0 Number of material records in T35 file NORM 0 Normalization method in SFO NPBOUND 579 Total number of boundary points in the mesh NPINP 10208 Total points in problem NPONTS 9629 Number of unknown relaxation points NREG 2 Number of regions NRMSEG 1 Normalization segment number for NORM=2 NSEG 20 Number of boundary segments NSPL 1 Number of special-potential points NSTEP 0 Number of steps for a resonance search OMEGAM 1.000000000E-03 Used in optimization of RHOXY PI 3.14159265 The number pi to machine precision PLCELL 360.000000 Phase length per cell for multicell problems RESIDR 1.000000000E-08 Residual resistance of a superconductor RFMU 1.00000000 Permeability for rf surface resistance RHO 1.724100000E-06 Material resistivity (Ohm-m) RHOR 1.724100000E-06 Reference resistivity (Ohm-cm) at TEMPR RHOXY 1.60000000 Over-relaxation factor in mesh optimization RMASS -2.00000000 Rest mass energy of particle in SFO RS 0.0 RF surface resistance (Ohms) RSTEM 1.00000000 Stem radius in cm SLOSS 3.000000000E-02 Coupling-slot power factor per % coupling TC 9.20000000 Critical temperature of a superconductor TEMPC 20.0000000 Normal conductor operating temperature TEMPK 2.00000000 Operating temperature of a superconductor TEMPR 20.0000000 Reference temperature for IRTYPE=3 TRIAVG 4.332322732E-03 Average area of all triangles TRIMAX 5.965238516E-03 Area of the largest positive-area triangle TRIMIN 2.094831524E-03 Area of the smallest positive-area triangle VOLUME 2711.03952 Cavity volume (cylindrical symmetry only) XDRI A 7.088593680E-02 X coordinate of the drive point XMAXG 12.0000000 Upper X bound of the problem geometry XMING 0.0 Lower X bound of the problem geometry XNORM1 0.0 Starting X for NORM=4 integration path XNORM2 0.0 Ending X for NORM=4 integration path XYAREA 85.9359537 Total cross sectional area YDRI A 15.1142744 Y coordinate of the drive point YMAXG 15.2870000 Upper Y bound of the problem geometry YMING 0.0 Lower Y bound of the problem geometry YNORM1 0.0 Starting Y for NORM=4 integration path YNORM2 0.0 Ending Y for NORM=4 integration path ZCTR 0.0 Reference Z in transit-time integrals