begin frb_curve_t (format of 2004-04-30)
| Input candidate set:
| Last edited on 2005-01-01 23:36:33 by stolfi
| 
| True and recognizable candidates
| Essentially entered by hand
| Some of them refined with PZRefineCands
| 
| 
| frb_analyze
|   maxShift =    0.847 pixels
|   nSamples = 513
| 
| Input candidate:
|   Candidate index = 39
|   Segment [0] from curve   89
|      649 samples [4027..4675]
|     0.096 of the curve [0.594__0.690]
|   Segment [1] from curve  106 (reversed)
|      650 samples [3147..3796]
|     0.099 of the curve [0.480__0.579]
| Candidate after realignment and trimming:
|   Candidate index = 39
|   Segment [0] from curve   89
|      513 samples [4172..4684]
|     0.076 of the curve [0.616__0.691]
|   Segment [1] from curve  106 (reversed)
|      513 samples [3133..3645]
|     0.078 of the curve [0.478__0.556]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
3 -2 0
7 -4 0
10 -6 0
14 -8 0
18 -9 0
21 -11 0
25 -12 0
29 -12 0
33 -13 0
37 -13 0
41 -13 0
45 -13 0
49 -12 0
53 -12 0
57 -11 0
61 -11 0
65 -10 0
69 -9 0
73 -9 0
77 -8 0
81 -8 0
85 -8 0
89 -7 0
93 -6 0
97 -6 0
101 -5 0
104 -4 0
108 -2 0
112 -1 0
115 1 0
119 3 0
122 5 0
125 8 0
128 10 0
131 13 0
134 16 0
137 18 0
141 21 0
144 23 0
147 25 0
151 27 0
155 28 0
158 29 0
162 30 0
166 31 0
170 31 0
174 31 0
178 31 0
182 31 0
186 30 0
190 30 0
194 29 0
198 28 0
202 27 0
206 26 0
209 24 0
213 23 0
217 21 0
220 19 0
224 17 0
227 15 0
231 13 0
234 11 0
238 10 0
242 8 0
245 7 0
249 6 0
253 6 0
257 6 0
261 6 0
265 6 0
269 6 0
273 7 0
277 8 0
281 9 0
285 10 0
289 11 0
292 12 0
296 14 0
300 15 0
304 16 0
307 18 0
311 19 0
315 21 0
318 23 0
322 24 0
326 26 0
329 27 0
333 29 0
337 30 0
341 32 0
344 33 0
348 34 0
352 35 0
356 36 0
360 37 0
364 38 0
368 39 0
372 39 0
376 40 0
380 40 0
384 41 0
388 41 0
392 42 0
396 42 0
399 43 0
403 43 0
407 43 0
411 43 0
415 44 0
419 44 0
423 44 0
427 45 0
431 45 0
435 45 0
439 46 0
443 46 0
447 47 0
451 47 0
455 47 0
459 48 0
463 48 0
467 49 0
471 49 0
475 50 0
479 50 0
483 51 0
487 51 0
491 52 0
495 53 0
499 54 0
503 55 0
506 56 0
510 58 0
514 59 0
517 61 0
521 63 0
524 65 0
528 67 0
532 69 0
535 70 0
539 72 0
542 74 0
546 75 0
550 77 0
553 78 0
557 80 0
561 81 0
565 82 0
569 83 0
572 85 0
576 86 0
580 87 0
584 89 0
587 90 0
591 92 0
595 93 0
599 94 0
602 96 0
606 97 0
610 98 0
614 100 0
618 101 0
621 102 0
625 103 0
629 105 0
633 106 0
637 107 0
640 108 0
644 109 0
648 111 0
652 112 0
656 113 0
659 114 0
663 116 0
667 117 0
671 118 0
675 120 0
678 121 0
682 122 0
686 123 0
690 124 0
694 125 0
698 126 0
702 126 0
706 126 0
710 126 0
714 126 0
718 125 0
721 124 0
725 123 0
729 122 0
733 120 0
736 118 0
740 117 0
744 115 0
747 113 0
750 110 0
754 108 0
757 106 0
760 104 0
763 101 0
767 99 0
770 96 0
773 94 0
776 92 0
780 90 0
783 88 0
787 86 0
791 85 0
794 83 0
798 82 0
802 81 0
806 80 0
810 79 0
814 78 0
818 78 0
822 77 0
826 77 0
830 77 0
834 77 0
838 77 0
842 77 0
846 77 0
850 78 0
854 78 0
858 79 0
861 80 0
865 81 0
869 81 0
873 82 0
877 83 0
881 84 0
885 84 0
889 84 0
893 85 0
897 84 0
901 84 0
905 83 0
909 82 0
913 81 0
916 80 0
920 79 0
924 77 0
928 75 0
931 74 0
935 72 0
939 71 0
942 69 0
946 68 0
950 66 0
954 65 0
957 64 0
961 63 0
965 63 0
969 62 0
973 62 0
977 62 0
981 62 0
985 63 0
989 63 0
993 64 0
997 65 0
1001 66 0
1005 67 0
1009 68 0
1013 69 0
1016 70 0
1020 72 0
1024 74 0
1027 75 0
1031 77 0
1034 79 0
1038 81 0
1041 83 0
1045 85 0
1049 86 0
1052 88 0
1056 90 0
1060 91 0
1063 92 0
1067 93 0
1071 94 0
1075 95 0
1079 96 0
1083 97 0
1087 97 0
1091 97 0
1095 97 0
1099 97 0
1103 97 0
1107 97 0
1111 96 0
1115 95 0
1119 95 0
1123 94 0
1127 93 0
1130 92 0
1134 92 0
1138 91 0
1142 90 0
1146 90 0
1150 90 0
1154 89 0
1158 89 0
1162 89 0
1166 89 0
1170 89 0
1174 89 0
1178 89 0
1182 89 0
1186 89 0
1190 89 0
1194 89 0
1198 88 0
1202 88 0
1206 87 0
1210 86 0
1214 86 0
1218 85 0
1222 84 0
1226 83 0
1230 83 0
1234 82 0
1238 81 0
1242 81 0
1245 80 0
1249 80 0
1253 79 0
1257 79 0
1261 78 0
1265 77 0
1269 76 0
1273 75 0
1277 74 0
1281 73 0
1285 72 0
1288 71 0
1292 69 0
1296 68 0
1300 67 0
1304 66 0
1308 65 0
1311 65 0
1315 64 0
1319 63 0
1323 62 0
1327 61 0
1331 61 0
1335 60 0
1339 59 0
1343 58 0
1347 57 0
1351 56 0
1354 55 0
1358 54 0
1362 54 0
1366 53 0
1370 52 0
1374 52 0
1378 51 0
1382 51 0
1386 51 0
1390 50 0
1394 50 0
1398 49 0
1402 49 0
1406 48 0
1410 48 0
1414 47 0
1418 46 0
1422 45 0
1426 45 0
1430 44 0
1433 43 0
1437 42 0
1441 41 0
1445 41 0
1449 40 0
1453 40 0
1457 39 0
1461 39 0
1465 39 0
1469 38 0
1473 38 0
1477 38 0
1481 37 0
1485 36 0
1489 36 0
1493 34 0
1497 33 0
1500 32 0
1504 31 0
1508 29 0
1512 28 0
1516 27 0
1519 26 0
1523 25 0
1527 25 0
1531 24 0
1535 24 0
1539 24 0
1543 24 0
1547 24 0
1551 24 0
1555 24 0
1559 24 0
1563 24 0
1567 24 0
1571 24 0
1575 24 0
1579 24 0
1583 24 0
1587 23 0
1591 23 0
1595 22 0
1599 22 0
1603 21 0
1607 20 0
1611 20 0
1615 19 0
1619 18 0
1623 18 0
1627 17 0
1631 17 0
1635 17 0
1639 17 0
1643 17 0
1647 17 0
1651 17 0
1655 17 0
1659 17 0
1663 17 0
1667 16 0
1671 16 0
1675 15 0
1679 15 0
1682 14 0
1686 13 0
1690 12 0
1694 12 0
1698 11 0
1702 11 0
1706 10 0
1710 10 0
1714 9 0
1718 9 0
1722 8 0
1726 8 0
1730 8 0
1734 8 0
1738 7 0
1742 7 0
1746 7 0
1750 7 0
1754 7 0
1758 8 0
1762 8 0
1766 9 0
1770 9 0
1774 9 0
1778 10 0
1782 10 0
1786 11 0
1790 11 0
1794 11 0
1798 11 0
1802 10 0
1806 10 0
1810 10 0
1814 9 0
1818 9 0
1822 8 0
1826 8 0
1830 8 0
1834 8 0
1838 8 0
1842 9 0
1846 10 0
1850 11 0
1853 11 0
1857 12 0
1861 14 0
1865 15 0
1869 15 0
1873 16 0
1877 17 0
1881 18 0
1885 19 0
1889 19 0
1893 19 0
1897 20 0
1901 20 0
1905 20 0
1909 20 0
1912 19 0
1916 19 0
1920 18 0
1924 17 0
1928 16 0
1932 15 0
1936 14 0
1940 13 0
1944 12 0
1947 10 0
1951 9 0
1955 8 0
1959 6 0
1962 5 0
1966 3 0
1970 2 0
1973 0 0
end frb_curve_t