begin frb_curve_t (format of 2004-04-30)
| Input candidate set:
| Last edited on 2005-01-02 00:20:33 by stolfi
| 
| False candidates
| Generated from ../../std/s/raw.can by swapping segments
| between candidates.
| 
| 
| frb_analyze
|   maxShift =    0.000 pixels
|   nSamples = 513
| 
| Input candidate:
|   Candidate index = 6
|   Segment [0] from curve    5
|      933 samples [3102..4034]
|     0.134 of the curve [0.446__0.580]
|   Segment [1] from curve    7 (reversed)
|     1407 samples [4903..6309]
|     0.212 of the curve [0.737__0.948]
| Candidate after realignment and trimming:
|   Candidate index = 6
|   Segment [0] from curve    5
|      513 samples [3312..3824]
|     0.074 of the curve [0.476__0.550]
|   Segment [1] from curve    7 (reversed)
|      513 samples [5350..5862]
|     0.077 of the curve [0.804__0.881]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 2 0
12 3 0
16 3 0
20 4 0
23 5 0
27 6 0
31 6 0
35 7 0
39 8 0
43 9 0
47 10 0
51 11 0
55 11 0
59 12 0
63 13 0
67 14 0
70 14 0
74 15 0
78 16 0
82 17 0
86 18 0
90 19 0
94 20 0
98 21 0
102 22 0
105 23 0
109 25 0
113 26 0
117 27 0
120 29 0
124 30 0
128 32 0
131 34 0
135 35 0
139 37 0
142 39 0
146 40 0
149 42 0
153 44 0
157 46 0
160 48 0
164 49 0
167 51 0
171 53 0
175 54 0
178 56 0
182 58 0
185 60 0
189 61 0
193 63 0
196 65 0
200 66 0
204 68 0
207 69 0
211 71 0
215 72 0
219 73 0
223 74 0
226 75 0
230 77 0
234 78 0
238 79 0
242 80 0
245 81 0
249 83 0
253 84 0
257 86 0
260 87 0
264 89 0
268 91 0
271 92 0
275 94 0
279 95 0
282 97 0
286 99 0
290 100 0
293 102 0
297 103 0
301 104 0
305 106 0
309 107 0
312 108 0
316 109 0
320 110 0
324 111 0
328 112 0
332 113 0
335 115 0
339 116 0
343 118 0
347 119 0
350 121 0
354 123 0
357 125 0
361 127 0
364 129 0
367 131 0
371 133 0
374 135 0
378 137 0
381 139 0
384 141 0
388 143 0
391 145 0
395 147 0
399 149 0
402 151 0
406 152 0
409 154 0
413 156 0
417 157 0
420 159 0
424 160 0
428 161 0
432 162 0
436 164 0
440 165 0
443 166 0
447 166 0
451 167 0
455 168 0
459 169 0
463 169 0
467 170 0
471 170 0
475 170 0
479 170 0
483 170 0
487 170 0
491 170 0
495 170 0
499 169 0
503 169 0
507 168 0
511 167 0
515 166 0
519 165 0
522 164 0
526 162 0
530 161 0
533 159 0
537 158 0
541 156 0
544 154 0
548 153 0
552 151 0
555 149 0
559 148 0
563 146 0
566 145 0
570 143 0
574 142 0
578 140 0
581 139 0
585 138 0
589 136 0
593 135 0
597 134 0
600 133 0
604 132 0
608 132 0
612 131 0
616 131 0
620 131 0
624 131 0
628 131 0
632 131 0
636 131 0
640 131 0
644 131 0
648 131 0
652 130 0
656 130 0
660 130 0
664 130 0
668 129 0
672 129 0
676 129 0
680 129 0
684 128 0
688 128 0
692 128 0
696 128 0
700 128 0
704 128 0
708 128 0
712 127 0
716 127 0
720 126 0
724 126 0
728 125 0
732 124 0
736 123 0
740 122 0
743 121 0
747 120 0
751 118 0
755 117 0
759 116 0
762 114 0
766 113 0
770 111 0
774 110 0
777 109 0
781 107 0
785 106 0
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793 104 0
796 103 0
800 102 0
804 102 0
808 101 0
812 101 0
816 101 0
820 101 0
824 101 0
828 102 0
832 102 0
836 103 0
840 104 0
844 106 0
847 107 0
851 109 0
855 110 0
858 112 0
862 114 0
866 115 0
869 117 0
873 118 0
877 119 0
881 120 0
885 121 0
889 122 0
893 123 0
897 124 0
901 124 0
905 124 0
909 124 0
913 124 0
917 124 0
920 123 0
924 122 0
928 121 0
932 120 0
936 119 0
940 117 0
943 116 0
947 115 0
951 113 0
955 112 0
958 110 0
962 109 0
966 108 0
970 107 0
974 106 0
978 105 0
981 104 0
985 103 0
989 102 0
993 101 0
997 100 0
1001 99 0
1005 98 0
1009 97 0
1012 96 0
1016 95 0
1020 93 0
1024 92 0
1028 91 0
1032 90 0
1035 89 0
1039 87 0
1043 86 0
1047 84 0
1050 83 0
1054 81 0
1058 80 0
1061 78 0
1065 76 0
1068 74 0
1072 73 0
1076 71 0
1079 69 0
1083 67 0
1086 66 0
1090 64 0
1094 62 0
1097 61 0
1101 59 0
1105 58 0
1108 56 0
1112 55 0
1116 54 0
1120 53 0
1124 51 0
1128 51 0
1132 50 0
1135 49 0
1139 49 0
1143 48 0
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1151 47 0
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1163 45 0
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1171 43 0
1175 42 0
1178 40 0
1182 39 0
1186 37 0
1190 36 0
1193 34 0
1197 33 0
1201 31 0
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1208 28 0
1212 27 0
1215 25 0
1219 23 0
1223 21 0
1226 20 0
1230 18 0
1233 16 0
1237 14 0
1240 12 0
1244 10 0
1247 8 0
1251 6 0
1254 4 0
1257 2 0
1261 0 0
1264 -2 0
1268 -4 0
1272 -5 0
1275 -7 0
1279 -8 0
1283 -8 0
1287 -9 0
1291 -9 0
1295 -9 0
1299 -9 0
1303 -9 0
1307 -8 0
1311 -8 0
1315 -7 0
1319 -7 0
1323 -7 0
1327 -6 0
1331 -6 0
1335 -6 0
1339 -7 0
1343 -7 0
1347 -8 0
1351 -8 0
1355 -9 0
1359 -10 0
1363 -11 0
1366 -12 0
1370 -13 0
1374 -14 0
1378 -15 0
1382 -15 0
1386 -16 0
1390 -16 0
1394 -17 0
1398 -17 0
1402 -17 0
1406 -18 0
1410 -17 0
1414 -17 0
1418 -17 0
1422 -16 0
1426 -16 0
1430 -15 0
1434 -13 0
1437 -12 0
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1448 -7 0
1452 -5 0
1455 -3 0
1459 -1 0
1462 0 0
1466 2 0
1470 4 0
1473 5 0
1477 7 0
1481 8 0
1484 10 0
1488 12 0
1492 13 0
1495 15 0
1499 17 0
1502 19 0
1506 21 0
1509 22 0
1513 24 0
1517 26 0
1520 27 0
1524 29 0
1528 30 0
1532 31 0
1536 31 0
1540 31 0
1544 31 0
1548 31 0
1552 31 0
1556 30 0
1560 29 0
1563 28 0
1567 27 0
1571 25 0
1575 24 0
1578 22 0
1582 21 0
1586 19 0
1590 18 0
1593 17 0
1597 15 0
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1605 13 0
1609 12 0
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1617 11 0
1621 10 0
1625 10 0
1629 10 0
1633 10 0
1637 10 0
1641 9 0
1645 9 0
1649 9 0
1652 8 0
1656 7 0
1660 6 0
1664 4 0
1667 3 0
1671 1 0
1674 -1 0
1678 -3 0
1682 -5 0
1685 -7 0
1689 -8 0
1693 -10 0
1696 -11 0
1700 -12 0
1704 -13 0
1708 -14 0
1712 -14 0
1716 -13 0
1720 -13 0
1724 -12 0
1727 -10 0
1731 -8 0
1734 -6 0
1738 -4 0
1741 -2 0
1744 1 0
1748 3 0
1751 5 0
1755 7 0
1758 9 0
1762 10 0
1765 12 0
1769 13 0
1773 15 0
1777 16 0
1781 17 0
1784 18 0
1788 19 0
1792 20 0
1796 21 0
1800 22 0
1804 22 0
1808 23 0
1812 23 0
1816 23 0
1820 23 0
1824 23 0
1828 23 0
1832 22 0
1836 22 0
1840 22 0
1844 22 0
1848 22 0
1852 21 0
1856 21 0
1860 21 0
1864 21 0
1868 20 0
1872 20 0
1876 19 0
1880 19 0
1884 18 0
1888 18 0
1892 17 0
1896 16 0
1900 16 0
1903 15 0
1907 14 0
1911 12 0
1915 11 0
1919 10 0
1922 8 0
1926 7 0
1930 6 0
1934 4 0
1937 3 0
1941 1 0
1945 0 0
end frb_curve_t