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 = 21
|   Segment [0] from curve   26
|      600 samples [ 188.. 787]
|     0.098 of the curve [0.031__0.128]
|   Segment [1] from curve   40 (reversed)
|      600 samples [1003..1602]
|     0.125 of the curve [0.208__0.333]
| Candidate after realignment and trimming:
|   Candidate index = 21
|   Segment [0] from curve   26
|      513 samples [ 231.. 743]
|     0.083 of the curve [0.038__0.121]
|   Segment [1] from curve   40 (reversed)
|      513 samples [1047..1559]
|     0.107 of the curve [0.218__0.324]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 1 0
12 2 0
16 2 0
20 3 0
24 3 0
28 3 0
32 3 0
36 3 0
40 3 0
44 3 0
48 3 0
52 3 0
56 3 0
60 3 0
64 3 0
68 3 0
72 2 0
76 2 0
80 1 0
84 0 0
88 0 0
91 -1 0
95 -2 0
99 -3 0
103 -4 0
107 -5 0
111 -6 0
115 -6 0
119 -7 0
123 -7 0
127 -6 0
131 -6 0
135 -5 0
139 -4 0
142 -2 0
146 -1 0
150 1 0
153 3 0
157 5 0
160 7 0
163 9 0
167 11 0
170 14 0
173 16 0
176 19 0
179 21 0
182 24 0
185 26 0
189 29 0
192 31 0
195 34 0
198 36 0
201 39 0
204 41 0
207 44 0
210 46 0
214 49 0
217 51 0
220 54 0
223 57 0
226 59 0
229 61 0
232 64 0
236 66 0
239 68 0
242 70 0
246 72 0
250 74 0
253 76 0
257 77 0
260 79 0
264 80 0
268 82 0
272 83 0
275 84 0
279 86 0
283 87 0
287 88 0
291 89 0
294 91 0
298 92 0
302 94 0
306 95 0
309 96 0
313 98 0
317 99 0
321 101 0
324 102 0
328 103 0
332 104 0
336 104 0
340 105 0
344 105 0
348 105 0
352 106 0
356 106 0
360 106 0
364 106 0
368 106 0
372 106 0
376 106 0
380 106 0
384 106 0
388 106 0
392 106 0
396 107 0
400 107 0
404 108 0
408 108 0
412 109 0
416 109 0
420 110 0
424 111 0
428 112 0
432 112 0
436 112 0
440 113 0
444 113 0
448 113 0
452 112 0
456 112 0
460 111 0
464 111 0
467 110 0
471 109 0
475 109 0
479 108 0
483 108 0
487 108 0
491 107 0
495 107 0
499 107 0
503 107 0
507 107 0
511 107 0
515 107 0
519 108 0
523 109 0
527 109 0
531 111 0
535 112 0
539 113 0
542 114 0
546 114 0
550 115 0
554 115 0
558 116 0
562 116 0
566 116 0
570 116 0
574 116 0
578 116 0
582 115 0
586 115 0
590 115 0
594 115 0
598 114 0
602 114 0
606 114 0
610 113 0
614 113 0
618 112 0
622 112 0
626 112 0
630 112 0
634 111 0
638 112 0
642 112 0
646 112 0
650 112 0
654 113 0
658 114 0
662 114 0
666 115 0
670 116 0
673 118 0
677 119 0
681 120 0
685 121 0
689 122 0
693 123 0
696 125 0
700 126 0
704 127 0
708 128 0
712 129 0
716 130 0
720 131 0
723 132 0
727 133 0
731 133 0
735 134 0
739 135 0
743 135 0
747 136 0
751 136 0
755 136 0
759 137 0
763 137 0
767 137 0
771 137 0
775 137 0
779 136 0
783 136 0
787 136 0
791 136 0
795 135 0
799 134 0
803 134 0
807 133 0
811 132 0
815 131 0
818 129 0
822 128 0
826 127 0
830 126 0
834 125 0
837 124 0
841 122 0
845 121 0
849 121 0
853 120 0
857 119 0
861 118 0
865 117 0
869 117 0
873 116 0
877 115 0
880 114 0
884 114 0
888 113 0
892 112 0
896 111 0
900 110 0
904 108 0
907 107 0
911 106 0
915 105 0
919 103 0
923 102 0
927 101 0
931 100 0
934 100 0
938 99 0
942 99 0
946 99 0
950 99 0
954 100 0
958 100 0
962 101 0
966 102 0
970 102 0
974 103 0
978 104 0
982 105 0
986 105 0
990 106 0
994 107 0
998 108 0
1002 108 0
1006 109 0
1009 110 0
1013 111 0
1017 112 0
1021 113 0
1025 114 0
1029 115 0
1033 115 0
1037 116 0
1041 116 0
1045 116 0
1049 116 0
1053 115 0
1057 115 0
1061 114 0
1065 113 0
1069 113 0
1073 113 0
1077 112 0
1081 112 0
1085 113 0
1089 113 0
1093 114 0
1096 114 0
1100 115 0
1104 116 0
1108 117 0
1112 118 0
1116 119 0
1120 120 0
1124 121 0
1127 122 0
1131 123 0
1135 124 0
1139 124 0
1143 124 0
1147 124 0
1151 124 0
1155 123 0
1159 123 0
1163 121 0
1167 120 0
1170 118 0
1174 116 0
1177 114 0
1180 111 0
1183 109 0
1186 106 0
1189 103 0
1192 101 0
1195 98 0
1199 96 0
1202 94 0
1205 92 0
1209 90 0
1213 89 0
1217 88 0
1220 87 0
1224 86 0
1228 85 0
1232 84 0
1236 84 0
1240 83 0
1244 82 0
1248 81 0
1252 80 0
1256 79 0
1259 77 0
1263 76 0
1267 74 0
1270 73 0
1274 71 0
1278 70 0
1282 68 0
1285 67 0
1289 66 0
1293 65 0
1297 64 0
1301 63 0
1305 62 0
1309 62 0
1313 61 0
1317 61 0
1321 61 0
1325 61 0
1329 61 0
1333 61 0
1337 62 0
1340 63 0
1344 64 0
1348 65 0
1352 66 0
1356 67 0
1360 68 0
1364 69 0
1367 70 0
1371 71 0
1375 72 0
1379 73 0
1383 74 0
1387 74 0
1391 75 0
1395 75 0
1399 75 0
1403 76 0
1407 75 0
1411 75 0
1415 75 0
1419 74 0
1423 73 0
1427 72 0
1430 71 0
1434 69 0
1438 68 0
1441 66 0
1445 64 0
1449 63 0
1452 61 0
1456 59 0
1459 57 0
1463 55 0
1467 54 0
1470 52 0
1474 51 0
1478 50 0
1482 49 0
1486 49 0
1490 48 0
1494 48 0
1498 49 0
1502 49 0
1506 50 0
1510 50 0
1514 51 0
1517 52 0
1521 54 0
1525 55 0
1529 56 0
1533 57 0
1537 58 0
1540 60 0
1544 61 0
1548 62 0
1552 63 0
1555 65 0
1559 66 0
1563 68 0
1567 69 0
1570 71 0
1574 72 0
1578 74 0
1581 75 0
1585 77 0
1589 78 0
1593 80 0
1596 81 0
1600 83 0
1604 84 0
1607 86 0
1611 87 0
1615 89 0
1619 90 0
1623 91 0
1626 92 0
1630 92 0
1634 93 0
1638 93 0
1642 93 0
1646 93 0
1650 93 0
1654 92 0
1658 92 0
1662 91 0
1666 90 0
1670 90 0
1674 89 0
1678 87 0
1682 86 0
1685 85 0
1689 83 0
1693 82 0
1696 80 0
1700 78 0
1703 75 0
1706 73 0
1709 70 0
1712 68 0
1715 65 0
1718 63 0
1722 60 0
1725 58 0
1728 56 0
1731 54 0
1735 52 0
1739 50 0
1742 48 0
1746 47 0
1750 46 0
1754 44 0
1757 43 0
1761 42 0
1765 41 0
1769 41 0
1773 40 0
1777 39 0
1781 38 0
1785 38 0
1789 37 0
1793 36 0
1797 36 0
1801 35 0
1805 35 0
1809 34 0
1812 34 0
1816 33 0
1820 32 0
1824 31 0
1828 30 0
1832 29 0
1836 28 0
1840 27 0
1844 27 0
1848 26 0
1852 25 0
1856 25 0
1860 25 0
1864 24 0
1868 24 0
1872 24 0
1876 23 0
1880 23 0
1883 22 0
1887 21 0
1891 20 0
1895 19 0
1899 17 0
1902 16 0
1906 14 0
1910 13 0
1913 11 0
1917 9 0
1921 8 0
1924 6 0
1928 5 0
1932 4 0
1936 3 0
1940 2 0
1944 1 0
1948 1 0
1952 0 0
1956 0 0
end frb_curve_t