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 = 2
|   Segment [0] from curve    1
|      600 samples [3804..4403]
|     0.102 of the curve [0.645__0.747]
|   Segment [1] from curve   15 (reversed)
|      600 samples [ 805..1404]
|     0.123 of the curve [0.166__0.289]
| Candidate after realignment and trimming:
|   Candidate index = 2
|   Segment [0] from curve    1
|      513 samples [3847..4359]
|     0.087 of the curve [0.652__0.739]
|   Segment [1] from curve   15 (reversed)
|      513 samples [ 849..1361]
|     0.106 of the curve [0.175__0.280]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 -2 0
7 -3 0
11 -5 0
15 -7 0
18 -8 0
22 -9 0
26 -10 0
30 -11 0
34 -11 0
38 -11 0
42 -11 0
46 -11 0
50 -11 0
54 -11 0
58 -11 0
62 -11 0
66 -11 0
70 -12 0
74 -12 0
78 -12 0
82 -12 0
86 -12 0
90 -12 0
94 -12 0
98 -11 0
102 -10 0
106 -9 0
109 -8 0
113 -6 0
117 -5 0
120 -3 0
124 -2 0
128 0 0
131 2 0
135 3 0
139 5 0
142 6 0
146 8 0
150 9 0
154 10 0
158 11 0
161 13 0
165 14 0
169 15 0
173 16 0
177 17 0
181 18 0
185 19 0
188 20 0
192 22 0
196 23 0
200 24 0
203 26 0
207 28 0
211 29 0
214 31 0
217 33 0
221 35 0
224 38 0
228 40 0
231 42 0
234 44 0
238 46 0
241 48 0
245 50 0
249 51 0
253 52 0
256 54 0
260 54 0
264 55 0
268 56 0
272 56 0
276 57 0
280 58 0
284 58 0
288 59 0
292 60 0
296 60 0
300 61 0
304 62 0
307 63 0
311 64 0
315 65 0
319 66 0
323 67 0
327 68 0
331 69 0
334 70 0
338 71 0
342 72 0
346 74 0
350 75 0
354 76 0
357 78 0
361 79 0
365 80 0
369 82 0
372 83 0
376 84 0
380 85 0
384 86 0
388 87 0
392 88 0
396 88 0
400 89 0
404 90 0
408 90 0
412 90 0
416 91 0
419 91 0
423 92 0
427 93 0
431 93 0
435 94 0
439 95 0
443 96 0
447 97 0
451 98 0
455 98 0
459 99 0
463 100 0
467 101 0
471 101 0
475 101 0
479 101 0
483 101 0
486 101 0
490 100 0
494 100 0
498 99 0
502 98 0
506 98 0
510 98 0
514 97 0
518 97 0
522 97 0
526 97 0
530 97 0
534 97 0
538 97 0
542 98 0
546 98 0
550 98 0
554 99 0
558 99 0
562 99 0
566 100 0
570 100 0
574 101 0
578 101 0
582 102 0
586 102 0
590 103 0
594 103 0
598 103 0
602 104 0
606 105 0
610 105 0
614 106 0
618 107 0
621 108 0
625 109 0
629 111 0
633 112 0
636 114 0
640 116 0
644 117 0
647 119 0
650 121 0
654 124 0
657 126 0
661 128 0
664 130 0
667 132 0
671 134 0
674 136 0
678 138 0
682 139 0
685 141 0
689 142 0
693 143 0
697 144 0
701 144 0
705 144 0
709 144 0
713 144 0
717 144 0
721 143 0
725 143 0
729 143 0
733 142 0
737 142 0
741 141 0
745 140 0
749 140 0
753 139 0
757 138 0
760 137 0
764 136 0
768 135 0
772 134 0
776 133 0
780 132 0
784 131 0
787 130 0
791 129 0
795 128 0
799 127 0
803 125 0
807 124 0
810 123 0
814 122 0
818 120 0
822 119 0
825 117 0
829 116 0
833 114 0
836 113 0
840 111 0
844 110 0
848 108 0
851 107 0
855 105 0
859 104 0
862 102 0
866 101 0
870 100 0
874 98 0
878 97 0
882 96 0
885 95 0
889 94 0
893 94 0
897 93 0
901 91 0
905 90 0
908 89 0
912 87 0
915 85 0
919 83 0
922 81 0
925 78 0
929 76 0
932 74 0
935 72 0
939 69 0
942 68 0
946 66 0
950 64 0
953 63 0
957 62 0
961 61 0
965 60 0
969 59 0
973 58 0
977 57 0
981 57 0
984 56 0
988 55 0
992 54 0
996 53 0
1000 52 0
1004 50 0
1007 49 0
1011 48 0
1015 46 0
1019 45 0
1022 43 0
1026 42 0
1030 41 0
1034 40 0
1038 39 0
1042 39 0
1046 38 0
1050 38 0
1054 38 0
1058 38 0
1062 38 0
1066 39 0
1070 39 0
1074 40 0
1078 40 0
1082 41 0
1086 41 0
1090 42 0
1094 42 0
1098 43 0
1102 43 0
1105 44 0
1109 45 0
1113 45 0
1117 46 0
1121 47 0
1125 48 0
1129 49 0
1133 50 0
1136 52 0
1140 53 0
1144 54 0
1148 56 0
1151 57 0
1155 59 0
1159 60 0
1163 61 0
1167 62 0
1171 62 0
1175 62 0
1179 62 0
1183 62 0
1187 62 0
1191 61 0
1194 60 0
1198 59 0
1202 57 0
1206 56 0
1209 54 0
1213 52 0
1217 51 0
1220 49 0
1224 47 0
1227 45 0
1231 43 0
1234 41 0
1237 39 0
1241 37 0
1244 34 0
1247 32 0
1251 30 0
1254 28 0
1257 25 0
1261 23 0
1264 21 0
1267 19 0
1271 17 0
1275 15 0
1278 14 0
1282 12 0
1286 11 0
1290 10 0
1294 10 0
1298 10 0
1302 10 0
1306 10 0
1310 10 0
1314 11 0
1318 11 0
1322 12 0
1325 12 0
1330 12 0
1334 12 0
1338 12 0
1342 12 0
1345 11 0
1349 10 0
1353 10 0
1357 9 0
1361 9 0
1365 8 0
1369 8 0
1373 8 0
1377 8 0
1381 8 0
1385 8 0
1389 8 0
1393 9 0
1397 9 0
1401 9 0
1405 10 0
1409 10 0
1413 10 0
1417 11 0
1421 11 0
1425 12 0
1429 12 0
1433 13 0
1437 14 0
1441 15 0
1444 16 0
1448 18 0
1452 19 0
1455 21 0
1459 23 0
1462 26 0
1465 28 0
1468 31 0
1470 34 0
1473 37 0
1476 40 0
1479 43 0
1481 46 0
1484 49 0
1487 52 0
1490 54 0
1493 57 0
1496 59 0
1499 62 0
1502 64 0
1506 67 0
1509 69 0
1512 71 0
1516 73 0
1520 74 0
1523 76 0
1527 77 0
1531 78 0
1535 78 0
1539 79 0
1543 79 0
1547 79 0
1551 79 0
1555 79 0
1559 79 0
1563 78 0
1567 78 0
1571 78 0
1575 78 0
1579 78 0
1583 78 0
1587 78 0
1591 78 0
1595 78 0
1599 78 0
1603 78 0
1607 78 0
1611 77 0
1615 77 0
1619 77 0
1623 77 0
1627 76 0
1631 76 0
1635 76 0
1639 76 0
1643 76 0
1647 75 0
1651 75 0
1655 74 0
1659 74 0
1663 73 0
1667 73 0
1671 72 0
1675 72 0
1679 72 0
1683 71 0
1687 71 0
1691 71 0
1695 70 0
1699 70 0
1703 70 0
1706 69 0
1710 69 0
1714 68 0
1718 68 0
1722 67 0
1726 66 0
1730 65 0
1734 64 0
1738 63 0
1742 62 0
1745 61 0
1749 59 0
1753 58 0
1756 56 0
1760 54 0
1764 53 0
1768 51 0
1771 50 0
1775 49 0
1779 47 0
1783 46 0
1786 44 0
1790 43 0
1794 42 0
1798 40 0
1801 39 0
1805 37 0
1809 35 0
1812 34 0
1816 32 0
1819 30 0
1823 28 0
1826 26 0
1830 24 0
1833 22 0
1837 20 0
1840 19 0
1844 17 0
1848 16 0
1852 15 0
1856 14 0
1860 14 0
1864 14 0
1868 13 0
1872 13 0
1876 13 0
1880 13 0
1884 13 0
1888 13 0
1892 12 0
1896 12 0
1900 12 0
1904 11 0
1908 10 0
1912 10 0
1915 9 0
1919 8 0
1923 7 0
1927 6 0
1931 5 0
1935 4 0
1939 3 0
1942 1 0
1946 0 0
end frb_curve_t