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 = 38
|   Segment [0] from curve   77
|      600 samples [7466..8065]
|     0.064 of the curve [0.794__0.858]
|   Segment [1] from curve   91 (reversed)
|      600 samples [1828..2427]
|     0.085 of the curve [0.259__0.344]
| Candidate after realignment and trimming:
|   Candidate index = 38
|   Segment [0] from curve   77
|      513 samples [7509..8021]
|     0.055 of the curve [0.799__0.853]
|   Segment [1] from curve   91 (reversed)
|      513 samples [1872..2384]
|     0.073 of the curve [0.265__0.338]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
7 3 0
11 5 0
14 7 0
18 9 0
21 11 0
24 13 0
28 16 0
31 18 0
34 21 0
37 23 0
40 26 0
44 28 0
47 30 0
51 32 0
54 33 0
58 34 0
62 35 0
66 35 0
70 35 0
74 35 0
78 35 0
82 34 0
86 34 0
90 33 0
94 33 0
98 32 0
102 32 0
106 32 0
110 31 0
114 31 0
118 31 0
122 31 0
126 31 0
130 31 0
134 30 0
138 30 0
142 29 0
146 29 0
150 28 0
154 27 0
157 26 0
161 25 0
165 24 0
169 24 0
173 23 0
177 22 0
181 22 0
185 22 0
189 22 0
193 22 0
197 23 0
201 24 0
205 25 0
209 26 0
212 27 0
216 28 0
220 29 0
224 31 0
228 32 0
232 33 0
235 34 0
239 34 0
243 35 0
247 36 0
251 36 0
255 37 0
259 37 0
263 37 0
267 37 0
271 36 0
275 36 0
279 35 0
283 34 0
287 33 0
291 31 0
294 30 0
298 29 0
302 27 0
306 26 0
309 25 0
313 23 0
317 22 0
321 21 0
325 20 0
328 18 0
332 17 0
336 15 0
339 14 0
343 12 0
346 10 0
350 8 0
353 6 0
356 3 0
360 1 0
363 -1 0
366 -4 0
369 -6 0
372 -9 0
376 -11 0
379 -13 0
383 -15 0
386 -17 0
390 -18 0
394 -20 0
397 -21 0
401 -23 0
405 -24 0
409 -24 0
413 -25 0
417 -26 0
421 -26 0
425 -26 0
429 -26 0
433 -26 0
437 -26 0
441 -26 0
445 -25 0
449 -25 0
453 -24 0
457 -24 0
461 -23 0
465 -23 0
469 -22 0
472 -21 0
476 -21 0
480 -20 0
484 -19 0
488 -19 0
492 -18 0
496 -18 0
500 -18 0
504 -18 0
508 -17 0
512 -17 0
516 -17 0
520 -16 0
524 -15 0
528 -15 0
532 -14 0
536 -13 0
540 -12 0
544 -11 0
548 -10 0
551 -10 0
555 -9 0
559 -8 0
563 -7 0
567 -6 0
571 -5 0
575 -4 0
579 -3 0
583 -2 0
586 -1 0
590 1 0
594 2 0
597 4 0
601 6 0
604 8 0
608 10 0
611 12 0
614 14 0
618 17 0
621 19 0
624 21 0
627 24 0
631 26 0
634 28 0
638 29 0
642 31 0
645 32 0
649 34 0
653 35 0
657 36 0
661 36 0
665 36 0
669 37 0
673 37 0
677 36 0
681 36 0
685 36 0
689 36 0
693 36 0
697 36 0
701 36 0
705 36 0
709 37 0
713 38 0
716 39 0
720 40 0
724 41 0
728 42 0
732 44 0
735 45 0
739 46 0
743 48 0
747 49 0
751 50 0
755 51 0
758 52 0
762 52 0
766 53 0
770 53 0
774 54 0
778 53 0
782 53 0
786 53 0
790 52 0
794 50 0
798 49 0
801 47 0
805 45 0
808 43 0
811 41 0
815 38 0
818 36 0
821 33 0
824 31 0
827 28 0
830 26 0
834 24 0
838 23 0
841 21 0
845 20 0
849 19 0
853 19 0
857 19 0
861 19 0
865 19 0
869 19 0
873 19 0
877 20 0
881 20 0
885 20 0
889 20 0
893 19 0
897 19 0
901 18 0
905 17 0
909 17 0
913 16 0
917 15 0
920 14 0
924 13 0
928 12 0
932 10 0
936 9 0
940 8 0
943 7 0
947 6 0
951 4 0
955 3 0
959 2 0
963 1 0
967 1 0
971 0 0
975 0 0
979 0 0
983 0 0
987 0 0
991 0 0
995 0 0
999 1 0
1002 1 0
1006 2 0
1010 3 0
1014 4 0
1018 5 0
1022 6 0
1026 8 0
1029 9 0
1033 10 0
1037 11 0
1041 12 0
1045 13 0
1049 14 0
1053 14 0
1057 15 0
1061 15 0
1065 15 0
1069 16 0
1073 16 0
1077 16 0
1081 16 0
1085 16 0
1089 16 0
1093 16 0
1097 15 0
1101 15 0
1105 15 0
1109 15 0
1113 14 0
1117 14 0
1121 14 0
1125 14 0
1129 14 0
1133 14 0
1137 14 0
1141 15 0
1144 16 0
1148 17 0
1152 18 0
1156 19 0
1160 21 0
1164 22 0
1167 23 0
1171 24 0
1175 24 0
1179 25 0
1183 25 0
1187 24 0
1191 24 0
1195 23 0
1199 22 0
1203 21 0
1207 20 0
1210 18 0
1214 17 0
1218 15 0
1222 14 0
1225 12 0
1229 11 0
1233 10 0
1237 9 0
1240 7 0
1244 7 0
1248 6 0
1252 5 0
1256 5 0
1260 5 0
1264 4 0
1268 4 0
1272 4 0
1276 5 0
1280 5 0
1284 5 0
1288 6 0
1292 7 0
1296 8 0
1300 9 0
1303 11 0
1307 13 0
1310 15 0
1313 17 0
1317 20 0
1320 22 0
1323 25 0
1326 27 0
1330 29 0
1333 31 0
1337 33 0
1341 34 0
1344 35 0
1348 36 0
1352 36 0
1356 36 0
1360 36 0
1364 36 0
1368 36 0
1372 36 0
1376 35 0
1380 35 0
1384 35 0
1388 35 0
1392 35 0
1396 34 0
1400 34 0
1404 34 0
1408 34 0
1412 34 0
1416 33 0
1420 33 0
1424 32 0
1428 32 0
1432 31 0
1436 31 0
1440 31 0
1444 31 0
1448 31 0
1452 31 0
1456 32 0
1460 33 0
1464 35 0
1467 36 0
1471 38 0
1475 40 0
1478 41 0
1482 43 0
1485 45 0
1489 47 0
1492 48 0
1496 50 0
1500 52 0
1503 54 0
1507 56 0
1510 57 0
1514 59 0
1517 61 0
1521 64 0
1524 65 0
1528 67 0
1531 69 0
1535 70 0
1539 72 0
1543 72 0
1547 73 0
1551 73 0
1555 73 0
1559 72 0
1563 71 0
1566 70 0
1570 68 0
1574 67 0
1577 65 0
1581 63 0
1584 61 0
1588 60 0
1592 58 0
1596 57 0
1599 56 0
1603 55 0
1607 54 0
1611 54 0
1615 53 0
1619 52 0
1623 51 0
1627 51 0
1631 50 0
1635 49 0
1639 48 0
1643 47 0
1646 46 0
1650 45 0
1654 43 0
1658 42 0
1661 40 0
1665 38 0
1668 36 0
1671 33 0
1674 31 0
1677 28 0
1680 25 0
1682 22 0
1685 19 0
1688 16 0
1690 13 0
1693 10 0
1696 7 0
1699 4 0
1702 2 0
1705 -1 0
1708 -3 0
1711 -6 0
1715 -8 0
1718 -10 0
1721 -12 0
1725 -14 0
1728 -17 0
1731 -19 0
1735 -21 0
1738 -23 0
1742 -25 0
1745 -27 0
1749 -29 0
1752 -30 0
1756 -31 0
1760 -32 0
1764 -32 0
1768 -32 0
1772 -31 0
1776 -29 0
1779 -27 0
1782 -25 0
1785 -22 0
1788 -19 0
1791 -16 0
1793 -13 0
1796 -10 0
1799 -7 0
1802 -4 0
1805 -2 0
1808 1 0
1811 3 0
1814 5 0
1818 7 0
1822 8 0
1826 9 0
1829 10 0
1833 11 0
1837 11 0
1841 11 0
1845 11 0
1849 10 0
1853 10 0
1857 9 0
1861 9 0
1865 8 0
1869 7 0
1873 6 0
1877 6 0
1881 5 0
1885 4 0
1889 3 0
1893 2 0
1897 2 0
1901 1 0
1905 1 0
1909 0 0
1913 0 0
1917 0 0
1921 0 0
1925 0 0
end frb_curve_t