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 = 45
|   Segment [0] from curve   88
|      600 samples [4720..5319]
|     0.096 of the curve [0.758__0.855]
|   Segment [1] from curve  107 (reversed)
|      600 samples [2662..3261]
|     0.066 of the curve [0.293__0.359]
| Candidate after realignment and trimming:
|   Candidate index = 45
|   Segment [0] from curve   88
|      513 samples [4763..5275]
|     0.082 of the curve [0.765__0.848]
|   Segment [1] from curve  107 (reversed)
|      513 samples [2706..3218]
|     0.056 of the curve [0.298__0.354]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
3 2 0
7 5 0
10 7 0
13 9 0
16 12 0
19 15 0
22 18 0
25 20 0
27 23 0
30 26 0
33 29 0
36 32 0
39 35 0
41 38 0
44 41 0
46 44 0
49 47 0
51 50 0
54 53 0
56 57 0
58 60 0
61 63 0
63 66 0
66 69 0
69 72 0
72 74 0
75 76 0
79 78 0
83 80 0
86 81 0
90 83 0
94 83 0
98 84 0
102 85 0
106 85 0
110 85 0
114 85 0
118 86 0
122 86 0
126 86 0
130 87 0
134 87 0
138 88 0
142 88 0
146 89 0
150 90 0
154 90 0
158 91 0
162 91 0
166 91 0
170 92 0
174 92 0
178 92 0
182 91 0
186 91 0
190 91 0
194 91 0
197 90 0
201 90 0
205 89 0
209 89 0
213 89 0
217 88 0
221 88 0
225 87 0
229 86 0
233 85 0
237 84 0
241 83 0
244 81 0
248 80 0
252 78 0
255 76 0
259 74 0
262 72 0
265 69 0
269 67 0
272 65 0
275 62 0
278 60 0
282 58 0
285 56 0
288 54 0
292 51 0
295 49 0
299 47 0
302 45 0
306 43 0
309 42 0
313 40 0
316 38 0
320 36 0
323 34 0
326 32 0
330 30 0
333 27 0
337 25 0
340 23 0
343 21 0
347 19 0
350 16 0
353 14 0
357 12 0
360 10 0
364 8 0
367 6 0
371 5 0
375 3 0
379 3 0
383 2 0
386 2 0
390 2 0
394 2 0
398 2 0
402 3 0
406 4 0
410 5 0
414 6 0
418 7 0
422 8 0
426 9 0
429 10 0
433 11 0
437 12 0
441 13 0
445 14 0
449 15 0
453 16 0
457 16 0
461 17 0
465 16 0
469 16 0
473 16 0
477 15 0
480 14 0
484 13 0
488 12 0
492 10 0
496 9 0
499 8 0
503 6 0
507 5 0
511 4 0
515 3 0
519 3 0
523 2 0
527 2 0
531 2 0
535 2 0
539 2 0
543 3 0
547 3 0
551 3 0
555 4 0
559 4 0
563 5 0
567 5 0
571 5 0
575 6 0
579 6 0
583 7 0
587 7 0
591 7 0
595 7 0
599 7 0
602 7 0
606 7 0
610 7 0
614 7 0
618 7 0
622 6 0
626 6 0
630 6 0
634 7 0
638 7 0
642 7 0
646 7 0
650 8 0
654 8 0
658 8 0
662 9 0
666 10 0
670 10 0
674 11 0
678 11 0
682 12 0
686 13 0
690 14 0
694 15 0
698 16 0
702 17 0
705 18 0
709 18 0
713 19 0
717 20 0
721 21 0
725 22 0
729 22 0
733 22 0
737 22 0
741 22 0
745 22 0
749 21 0
753 21 0
757 20 0
761 18 0
764 17 0
768 16 0
772 14 0
775 13 0
779 11 0
783 10 0
787 8 0
791 7 0
794 6 0
798 5 0
802 4 0
806 3 0
810 3 0
814 2 0
818 1 0
822 1 0
826 0 0
830 0 0
834 -1 0
838 -1 0
842 -2 0
846 -2 0
850 -2 0
854 -2 0
858 -1 0
862 -1 0
866 0 0
870 0 0
873 1 0
877 2 0
881 3 0
885 3 0
889 4 0
893 5 0
897 6 0
901 6 0
905 7 0
909 8 0
913 8 0
917 9 0
921 10 0
924 12 0
928 13 0
932 14 0
936 16 0
939 17 0
943 18 0
947 19 0
951 20 0
955 21 0
959 21 0
963 22 0
967 22 0
971 22 0
975 21 0
979 21 0
983 20 0
987 19 0
991 19 0
995 18 0
999 17 0
1002 16 0
1006 16 0
1010 15 0
1014 15 0
1018 14 0
1022 14 0
1026 14 0
1030 14 0
1034 14 0
1038 14 0
1042 14 0
1046 14 0
1050 14 0
1054 14 0
1058 15 0
1062 16 0
1066 17 0
1070 18 0
1073 20 0
1077 22 0
1080 24 0
1083 26 0
1087 29 0
1090 32 0
1092 34 0
1095 37 0
1098 40 0
1101 42 0
1104 45 0
1108 47 0
1111 49 0
1115 50 0
1119 52 0
1123 52 0
1127 53 0
1131 53 0
1135 54 0
1139 54 0
1143 55 0
1147 55 0
1150 56 0
1154 57 0
1158 57 0
1162 58 0
1166 59 0
1170 60 0
1174 61 0
1178 62 0
1182 63 0
1186 63 0
1190 64 0
1194 65 0
1197 66 0
1201 66 0
1205 67 0
1209 68 0
1213 69 0
1217 70 0
1221 71 0
1225 72 0
1229 73 0
1233 73 0
1237 74 0
1241 74 0
1245 73 0
1249 73 0
1252 72 0
1256 71 0
1260 70 0
1264 68 0
1268 67 0
1271 65 0
1275 64 0
1279 62 0
1282 60 0
1286 58 0
1289 57 0
1293 55 0
1296 53 0
1300 51 0
1303 49 0
1307 47 0
1310 44 0
1313 42 0
1317 40 0
1320 38 0
1324 36 0
1327 34 0
1331 33 0
1335 31 0
1338 30 0
1342 29 0
1346 28 0
1350 27 0
1354 26 0
1358 25 0
1362 24 0
1366 24 0
1370 23 0
1374 23 0
1378 23 0
1382 22 0
1386 22 0
1390 23 0
1394 23 0
1397 24 0
1401 25 0
1405 26 0
1409 27 0
1413 29 0
1416 30 0
1420 32 0
1423 34 0
1427 35 0
1431 37 0
1434 39 0
1438 41 0
1441 43 0
1445 45 0
1448 47 0
1452 48 0
1456 50 0
1459 51 0
1463 53 0
1467 54 0
1471 55 0
1475 56 0
1478 57 0
1482 58 0
1486 58 0
1490 59 0
1494 59 0
1498 59 0
1502 59 0
1506 59 0
1510 59 0
1514 59 0
1518 58 0
1522 58 0
1526 57 0
1530 57 0
1534 56 0
1538 55 0
1542 55 0
1546 54 0
1550 53 0
1554 52 0
1558 51 0
1562 51 0
1566 50 0
1569 49 0
1573 48 0
1577 48 0
1581 47 0
1585 46 0
1589 46 0
1593 45 0
1597 45 0
1601 44 0
1605 44 0
1609 43 0
1613 43 0
1617 43 0
1621 42 0
1625 41 0
1629 41 0
1633 40 0
1637 39 0
1640 38 0
1644 37 0
1648 35 0
1652 33 0
1655 31 0
1658 29 0
1662 27 0
1665 24 0
1668 22 0
1671 19 0
1674 17 0
1677 15 0
1681 12 0
1684 10 0
1688 9 0
1692 7 0
1695 6 0
1699 5 0
1703 4 0
1707 3 0
1711 2 0
1715 2 0
1719 1 0
1723 1 0
1727 0 0
1731 0 0
1735 0 0
1739 -1 0
1743 -1 0
1747 -2 0
1751 -2 0
1755 -2 0
1759 -3 0
1763 -3 0
1767 -4 0
1771 -4 0
1775 -5 0
1779 -5 0
1782 -5 0
1786 -5 0
1791 -5 0
1795 -5 0
1799 -5 0
1803 -5 0
1807 -5 0
1811 -5 0
1814 -5 0
1818 -5 0
1822 -4 0
1826 -4 0
1830 -4 0
1834 -4 0
1839 -5 0
1843 -5 0
1847 -5 0
1851 -5 0
1854 -5 0
1858 -5 0
1862 -4 0
1866 -4 0
1870 -4 0
1874 -3 0
1878 -2 0
1882 -2 0
1886 -1 0
1890 -1 0
1894 0 0
1898 1 0
1902 1 0
1906 2 0
1910 2 0
1914 2 0
1918 2 0
1922 2 0
1926 1 0
1930 1 0
1934 0 0
end frb_curve_t