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 = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 2 0
11 4 0
15 5 0
19 6 0
23 7 0
27 8 0
31 9 0
34 10 0
38 12 0
42 13 0
46 15 0
49 16 0
53 18 0
57 19 0
60 21 0
64 22 0
68 24 0
71 26 0
75 27 0
79 29 0
83 30 0
86 31 0
90 33 0
94 34 0
97 36 0
101 38 0
105 40 0
108 42 0
112 43 0
115 45 0
119 47 0
122 49 0
126 50 0
130 51 0
134 52 0
138 53 0
142 53 0
146 52 0
150 52 0
154 50 0
157 49 0
161 47 0
164 45 0
168 43 0
171 41 0
174 39 0
178 37 0
181 35 0
185 34 0
189 33 0
193 32 0
197 32 0
201 32 0
205 32 0
209 33 0
213 34 0
217 35 0
221 36 0
225 36 0
228 37 0
232 37 0
236 38 0
240 38 0
244 38 0
248 37 0
252 37 0
256 37 0
260 36 0
264 36 0
268 35 0
272 34 0
276 34 0
280 33 0
284 32 0
288 31 0
292 30 0
296 29 0
299 28 0
303 26 0
306 24 0
310 22 0
313 19 0
316 16 0
319 13 0
321 11 0
325 8 0
328 6 0
332 5 0
335 4 0
339 3 0
344 4 0
347 5 0
351 6 0
355 7 0
359 9 0
362 11 0
366 13 0
369 15 0
373 16 0
376 18 0
380 20 0
383 22 0
387 24 0
391 26 0
394 27 0
398 29 0
401 31 0
405 32 0
409 34 0
412 36 0
416 37 0
420 38 0
424 40 0
427 41 0
431 42 0
435 43 0
439 44 0
443 45 0
447 46 0
451 46 0
455 47 0
459 48 0
463 48 0
466 49 0
470 50 0
474 51 0
478 52 0
482 53 0
486 54 0
490 55 0
494 56 0
497 57 0
501 58 0
505 59 0
509 60 0
513 61 0
517 61 0
521 62 0
525 63 0
529 64 0
533 65 0
536 66 0
540 67 0
544 68 0
548 69 0
552 70 0
556 71 0
560 71 0
564 72 0
568 72 0
572 72 0
576 72 0
580 73 0
584 73 0
588 73 0
592 73 0
596 73 0
600 73 0
604 73 0
608 73 0
612 73 0
616 73 0
620 73 0
624 72 0
628 72 0
632 72 0
636 72 0
640 72 0
644 73 0
648 73 0
652 73 0
656 74 0
660 75 0
664 75 0
668 76 0
671 76 0
675 77 0
679 77 0
683 77 0
687 78 0
691 78 0
695 78 0
699 78 0
703 78 0
707 77 0
711 77 0
715 76 0
719 75 0
723 74 0
727 73 0
731 72 0
734 70 0
738 68 0
741 66 0
745 64 0
748 62 0
752 60 0
755 58 0
759 56 0
762 54 0
766 52 0
769 50 0
773 48 0
776 46 0
779 44 0
783 42 0
786 40 0
790 38 0
793 37 0
797 35 0
800 33 0
804 31 0
808 29 0
811 28 0
815 26 0
819 25 0
822 23 0
826 22 0
830 21 0
834 20 0
838 19 0
842 19 0
846 18 0
850 17 0
854 16 0
858 16 0
862 15 0
866 15 0
870 14 0
874 14 0
878 13 0
881 13 0
885 13 0
889 12 0
893 12 0
897 12 0
901 11 0
905 11 0
909 11 0
913 12 0
917 12 0
921 13 0
925 14 0
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933 16 0
937 18 0
940 20 0
944 21 0
947 23 0
951 25 0
954 27 0
958 29 0
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965 33 0
968 35 0
971 37 0
975 39 0
979 41 0
982 43 0
986 44 0
989 46 0
993 47 0
997 49 0
1001 50 0
1005 51 0
1009 52 0
1013 52 0
1016 53 0
1020 53 0
1024 54 0
1028 54 0
1032 54 0
1036 54 0
1040 55 0
1044 55 0
1048 56 0
1052 56 0
1056 57 0
1060 58 0
1064 58 0
1068 59 0
1072 60 0
1076 60 0
1080 60 0
1084 60 0
1088 60 0
1092 60 0
1096 60 0
1100 59 0
1104 58 0
1108 57 0
1112 57 0
1115 56 0
1119 54 0
1123 53 0
1127 52 0
1131 51 0
1135 50 0
1138 49 0
1142 48 0
1146 46 0
1150 45 0
1154 44 0
1158 43 0
1161 41 0
1165 40 0
1169 38 0
1172 36 0
1176 35 0
1180 33 0
1183 32 0
1187 30 0
1191 29 0
1195 29 0
1199 28 0
1203 28 0
1207 29 0
1211 30 0
1215 30 0
1218 31 0
1222 32 0
1226 33 0
1230 34 0
1234 35 0
1238 36 0
1242 37 0
1246 37 0
1250 38 0
1254 39 0
1258 40 0
1261 41 0
1265 42 0
1269 44 0
1273 45 0
1276 47 0
1280 49 0
1283 50 0
1287 52 0
1291 54 0
1294 56 0
1298 57 0
1301 59 0
1305 61 0
1309 62 0
1313 64 0
1316 65 0
1320 66 0
1324 68 0
1328 69 0
1332 70 0
1335 71 0
1339 72 0
1343 72 0
1347 73 0
1351 73 0
1355 73 0
1359 73 0
1363 73 0
1367 72 0
1371 72 0
1375 71 0
1379 70 0
1383 68 0
1386 67 0
1390 65 0
1394 64 0
1397 62 0
1401 60 0
1405 59 0
1408 58 0
1412 57 0
1416 56 0
1420 55 0
1424 55 0
1428 56 0
1432 56 0
1436 57 0
1440 58 0
1444 59 0
1448 60 0
1452 61 0
1456 61 0
1460 61 0
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1491 54 0
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1502 52 0
1506 51 0
1510 51 0
1514 51 0
1518 51 0
1522 50 0
1526 50 0
1530 50 0
1534 49 0
1538 48 0
1542 47 0
1546 46 0
1549 44 0
1553 41 0
1556 39 0
1558 36 0
1561 33 0
1563 30 0
1565 26 0
1568 23 0
1570 19 0
1572 16 0
1574 13 0
1577 10 0
1580 7 0
1583 5 0
1586 2 0
1590 0 0
1593 -2 0
1597 -4 0
1600 -6 0
1604 -7 0
1608 -8 0
1611 -9 0
1615 -10 0
1619 -11 0
1623 -11 0
1627 -11 0
1631 -11 0
1635 -11 0
1639 -11 0
1643 -10 0
1647 -10 0
1651 -9 0
1655 -8 0
1659 -8 0
1663 -7 0
1667 -5 0
1671 -4 0
1674 -3 0
1678 -1 0
1681 1 0
1685 3 0
1688 5 0
1692 7 0
1695 9 0
1699 11 0
1702 13 0
1705 15 0
1709 17 0
1712 19 0
1716 21 0
1720 23 0
1724 24 0
1727 24 0
1731 24 0
1735 24 0
1739 23 0
1743 22 0
1747 21 0
1751 20 0
1755 18 0
1758 17 0
1762 15 0
1766 14 0
1769 13 0
1773 11 0
1777 10 0
1781 10 0
1785 9 0
1789 8 0
1793 8 0
1797 7 0
1801 7 0
1805 6 0
1809 6 0
1813 5 0
1817 3 0
1820 2 0
1824 0 0
1828 -1 0
1831 -3 0
1835 -5 0
1839 -6 0
1842 -7 0
1846 -8 0
1850 -9 0
1854 -10 0
1858 -11 0
1862 -11 0
1866 -12 0
1870 -12 0
1874 -12 0
1878 -11 0
1882 -11 0
1886 -10 0
1890 -9 0
1893 -8 0
1897 -6 0
1901 -5 0
1905 -4 0
1909 -2 0
1912 -2 0
1916 -1 0
1920 0 0
1924 0 0
1928 0 0
1932 0 0
end frb_curve_t