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 = 31
|   Segment [0] from curve   46
|      600 samples [3229..3828]
|     0.097 of the curve [0.522__0.619]
|   Segment [1] from curve   67 (reversed)
|      600 samples [1009..1608]
|     0.065 of the curve [0.109__0.174]
| Candidate after realignment and trimming:
|   Candidate index = 31
|   Segment [0] from curve   46
|      513 samples [3272..3784]
|     0.083 of the curve [0.529__0.612]
|   Segment [1] from curve   67 (reversed)
|      513 samples [1053..1565]
|     0.056 of the curve [0.114__0.170]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 0 0
8 1 0
12 1 0
16 2 0
20 2 0
24 2 0
28 2 0
32 2 0
36 1 0
40 0 0
44 -1 0
47 -2 0
51 -3 0
55 -4 0
59 -5 0
63 -6 0
67 -6 0
71 -7 0
75 -7 0
79 -7 0
83 -7 0
87 -7 0
91 -7 0
95 -6 0
99 -6 0
103 -6 0
107 -6 0
111 -6 0
115 -6 0
119 -6 0
123 -6 0
127 -5 0
131 -5 0
135 -4 0
139 -3 0
143 -3 0
147 -2 0
150 -1 0
154 0 0
158 1 0
162 2 0
166 2 0
170 3 0
174 4 0
178 5 0
182 5 0
186 6 0
190 7 0
194 8 0
197 8 0
201 9 0
205 10 0
209 10 0
213 11 0
217 11 0
221 11 0
225 11 0
229 11 0
233 11 0
237 11 0
241 10 0
245 10 0
249 9 0
253 8 0
257 6 0
261 5 0
264 4 0
268 2 0
272 1 0
275 -1 0
279 -2 0
283 -4 0
287 -5 0
291 -5 0
295 -6 0
299 -6 0
303 -6 0
307 -5 0
311 -4 0
314 -3 0
318 -2 0
322 -2 0
326 -1 0
330 0 0
334 0 0
338 1 0
342 1 0
346 1 0
350 1 0
354 1 0
358 1 0
362 1 0
366 1 0
370 1 0
374 0 0
378 0 0
382 -1 0
386 -1 0
390 -2 0
394 -3 0
398 -4 0
401 -5 0
405 -6 0
409 -7 0
413 -8 0
417 -9 0
421 -9 0
425 -10 0
429 -10 0
433 -10 0
437 -10 0
441 -10 0
445 -10 0
449 -9 0
453 -9 0
457 -8 0
461 -7 0
464 -6 0
468 -5 0
472 -3 0
476 -2 0
480 -1 0
483 0 0
487 2 0
491 3 0
495 5 0
498 6 0
502 8 0
506 9 0
510 10 0
514 11 0
518 11 0
522 12 0
526 12 0
530 12 0
534 11 0
538 11 0
541 10 0
545 9 0
549 8 0
553 7 0
557 5 0
561 4 0
564 3 0
568 1 0
571 -1 0
575 -3 0
579 -4 0
582 -6 0
586 -8 0
590 -9 0
593 -11 0
597 -12 0
601 -13 0
605 -15 0
609 -16 0
612 -17 0
616 -18 0
620 -19 0
624 -20 0
628 -20 0
632 -21 0
636 -21 0
640 -22 0
644 -22 0
648 -21 0
652 -21 0
656 -20 0
660 -19 0
663 -17 0
667 -16 0
671 -14 0
674 -12 0
678 -11 0
681 -8 0
685 -6 0
688 -4 0
691 -2 0
695 0 0
698 3 0
701 5 0
705 7 0
708 9 0
712 10 0
715 12 0
719 14 0
723 15 0
727 16 0
731 17 0
734 18 0
738 19 0
742 19 0
746 20 0
750 20 0
754 20 0
758 20 0
762 20 0
766 20 0
770 21 0
774 21 0
778 22 0
782 23 0
786 24 0
790 25 0
793 27 0
797 28 0
801 30 0
804 32 0
808 33 0
812 35 0
815 36 0
819 38 0
823 40 0
826 41 0
830 43 0
834 45 0
837 46 0
841 48 0
845 50 0
848 51 0
852 53 0
856 54 0
860 55 0
863 56 0
867 57 0
871 58 0
875 59 0
879 59 0
883 60 0
887 61 0
891 62 0
895 63 0
899 64 0
902 66 0
906 67 0
910 69 0
913 71 0
917 73 0
920 75 0
924 77 0
927 78 0
931 80 0
934 82 0
938 84 0
942 85 0
945 86 0
949 87 0
953 88 0
957 88 0
961 89 0
965 89 0
969 89 0
973 89 0
977 89 0
981 88 0
985 88 0
989 87 0
993 86 0
997 85 0
1001 84 0
1004 83 0
1008 81 0
1012 80 0
1016 78 0
1019 77 0
1023 75 0
1027 73 0
1030 71 0
1034 70 0
1037 68 0
1041 66 0
1044 64 0
1047 61 0
1051 59 0
1054 57 0
1057 55 0
1061 53 0
1064 50 0
1067 48 0
1071 46 0
1074 44 0
1077 41 0
1080 39 0
1084 37 0
1087 34 0
1090 32 0
1093 30 0
1097 27 0
1100 25 0
1103 22 0
1106 20 0
1109 17 0
1112 15 0
1116 13 0
1119 10 0
1122 8 0
1125 6 0
1129 4 0
1132 2 0
1136 0 0
1140 -2 0
1143 -3 0
1147 -5 0
1151 -6 0
1155 -7 0
1158 -8 0
1162 -9 0
1166 -10 0
1170 -11 0
1174 -12 0
1178 -13 0
1182 -14 0
1186 -15 0
1190 -16 0
1194 -16 0
1198 -16 0
1202 -16 0
1206 -16 0
1209 -15 0
1213 -14 0
1217 -13 0
1221 -12 0
1225 -10 0
1228 -8 0
1232 -7 0
1235 -5 0
1239 -3 0
1242 -1 0
1246 1 0
1249 3 0
1253 5 0
1256 7 0
1260 9 0
1263 11 0
1266 14 0
1270 16 0
1273 18 0
1276 20 0
1280 22 0
1283 24 0
1287 26 0
1291 27 0
1294 28 0
1298 29 0
1302 30 0
1306 31 0
1310 31 0
1314 31 0
1318 31 0
1322 30 0
1326 30 0
1330 30 0
1334 30 0
1338 30 0
1342 30 0
1346 31 0
1350 31 0
1354 31 0
1358 32 0
1362 32 0
1366 33 0
1370 33 0
1374 33 0
1378 33 0
1382 34 0
1386 34 0
1390 34 0
1394 34 0
1398 34 0
1402 34 0
1406 35 0
1410 35 0
1414 35 0
1418 35 0
1422 36 0
1426 36 0
1430 36 0
1434 36 0
1438 36 0
1442 36 0
1446 37 0
1450 37 0
1454 37 0
1458 37 0
1462 38 0
1466 38 0
1470 38 0
1474 39 0
1478 39 0
1482 38 0
1486 38 0
1490 38 0
1494 37 0
1498 36 0
1501 35 0
1505 33 0
1509 32 0
1513 31 0
1516 29 0
1520 27 0
1524 26 0
1527 24 0
1531 23 0
1535 21 0
1538 19 0
1542 17 0
1546 16 0
1549 14 0
1553 12 0
1556 10 0
1559 7 0
1562 5 0
1566 3 0
1569 1 0
1572 -1 0
1576 -3 0
1580 -5 0
1583 -7 0
1587 -8 0
1591 -8 0
1595 -8 0
1599 -8 0
1603 -7 0
1607 -7 0
1611 -5 0
1615 -4 0
1618 -2 0
1622 -1 0
1625 1 0
1629 3 0
1633 4 0
1636 6 0
1640 8 0
1644 9 0
1648 10 0
1652 11 0
1655 12 0
1659 13 0
1663 14 0
1667 15 0
1671 16 0
1675 17 0
1678 19 0
1682 20 0
1686 22 0
1689 23 0
1693 25 0
1697 26 0
1701 28 0
1704 29 0
1708 30 0
1712 31 0
1716 32 0
1720 33 0
1724 33 0
1728 33 0
1732 33 0
1736 33 0
1740 32 0
1744 32 0
1748 31 0
1752 30 0
1756 29 0
1760 28 0
1763 27 0
1767 26 0
1771 25 0
1775 24 0
1779 23 0
1783 22 0
1786 20 0
1790 19 0
1794 18 0
1798 17 0
1802 16 0
1805 14 0
1809 13 0
1813 12 0
1817 10 0
1821 9 0
1824 8 0
1828 7 0
1832 6 0
1836 5 0
1840 4 0
1844 4 0
1848 3 0
1852 2 0
1855 1 0
1859 0 0
1863 -1 0
1867 -2 0
1871 -3 0
1875 -4 0
1879 -5 0
1883 -6 0
1887 -6 0
1891 -7 0
1895 -7 0
1899 -7 0
1903 -7 0
1907 -6 0
1911 -6 0
1915 -6 0
1919 -5 0
1923 -5 0
1927 -4 0
1930 -3 0
1934 -3 0
1938 -2 0
1942 -1 0
1946 0 0
end frb_curve_t