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 = 28
|   Segment [0] from curve   43
|      600 samples [3173..3772]
|     0.116 of the curve [0.612__0.727]
|   Segment [1] from curve   46 (reversed)
|      600 samples [ 208.. 807]
|     0.097 of the curve [0.034__0.130]
| Candidate after realignment and trimming:
|   Candidate index = 28
|   Segment [0] from curve   43
|      513 samples [3216..3728]
|     0.099 of the curve [0.620__0.719]
|   Segment [1] from curve   46 (reversed)
|      513 samples [ 252.. 764]
|     0.083 of the curve [0.041__0.123]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 2 0
7 3 0
11 5 0
15 6 0
19 7 0
23 7 0
27 7 0
31 6 0
35 6 0
39 5 0
43 4 0
46 3 0
50 2 0
54 1 0
58 1 0
62 0 0
66 0 0
70 0 0
74 0 0
78 0 0
82 1 0
86 1 0
90 2 0
94 3 0
98 3 0
102 4 0
106 4 0
110 4 0
114 4 0
118 3 0
122 3 0
126 3 0
130 2 0
134 2 0
138 2 0
142 2 0
146 2 0
150 3 0
154 3 0
158 4 0
162 5 0
165 6 0
169 7 0
173 8 0
177 9 0
181 9 0
185 10 0
189 11 0
193 11 0
197 11 0
201 11 0
205 10 0
209 10 0
213 10 0
217 9 0
221 9 0
225 9 0
229 9 0
233 8 0
237 8 0
241 9 0
245 9 0
249 9 0
253 10 0
257 10 0
261 11 0
265 11 0
269 11 0
273 12 0
277 12 0
281 12 0
285 11 0
289 11 0
293 10 0
297 10 0
301 9 0
304 8 0
308 8 0
312 7 0
316 7 0
320 6 0
324 6 0
328 6 0
332 6 0
336 5 0
340 5 0
344 5 0
348 6 0
352 6 0
356 6 0
360 6 0
364 6 0
368 6 0
372 6 0
376 6 0
380 7 0
384 7 0
388 7 0
392 7 0
396 7 0
400 7 0
404 7 0
408 7 0
412 7 0
416 6 0
420 6 0
424 5 0
428 4 0
432 3 0
436 2 0
439 1 0
443 -1 0
447 -2 0
451 -3 0
455 -4 0
459 -4 0
463 -5 0
467 -5 0
471 -5 0
475 -6 0
479 -5 0
483 -5 0
487 -4 0
491 -3 0
494 -2 0
498 -1 0
502 0 0
506 2 0
509 4 0
513 6 0
516 8 0
519 10 0
523 12 0
526 15 0
529 17 0
532 20 0
535 22 0
539 24 0
542 27 0
545 29 0
549 31 0
552 33 0
555 35 0
559 37 0
562 39 0
566 41 0
570 42 0
574 44 0
577 45 0
581 47 0
585 48 0
588 50 0
592 51 0
596 52 0
600 53 0
604 55 0
607 56 0
611 57 0
615 59 0
619 60 0
622 62 0
626 63 0
629 65 0
633 67 0
637 69 0
640 71 0
644 73 0
647 75 0
650 77 0
654 79 0
657 81 0
661 83 0
664 85 0
667 88 0
671 90 0
674 92 0
678 94 0
681 96 0
685 97 0
688 99 0
692 101 0
696 102 0
700 103 0
704 104 0
708 105 0
712 105 0
716 105 0
720 106 0
724 106 0
728 106 0
732 106 0
736 106 0
739 106 0
743 107 0
747 107 0
751 108 0
755 108 0
759 109 0
763 109 0
767 110 0
771 111 0
775 111 0
779 112 0
783 112 0
787 113 0
791 113 0
795 114 0
799 114 0
803 114 0
807 115 0
811 115 0
815 115 0
819 114 0
823 114 0
827 114 0
831 113 0
835 113 0
839 112 0
843 112 0
847 111 0
851 110 0
855 110 0
859 109 0
863 108 0
866 108 0
870 108 0
874 107 0
878 107 0
882 107 0
886 108 0
890 108 0
894 108 0
898 109 0
902 109 0
906 109 0
910 110 0
914 110 0
918 111 0
922 111 0
926 112 0
930 112 0
934 113 0
938 113 0
942 113 0
946 113 0
950 113 0
954 113 0
958 112 0
962 112 0
966 112 0
970 111 0
974 110 0
978 110 0
982 109 0
986 109 0
990 108 0
994 108 0
998 107 0
1002 107 0
1006 108 0
1010 108 0
1014 109 0
1018 109 0
1022 110 0
1025 111 0
1029 112 0
1033 114 0
1037 115 0
1041 116 0
1045 117 0
1048 118 0
1052 119 0
1056 120 0
1060 121 0
1064 122 0
1068 123 0
1072 124 0
1076 125 0
1079 126 0
1083 127 0
1087 128 0
1091 128 0
1095 129 0
1099 130 0
1103 131 0
1107 131 0
1111 131 0
1115 132 0
1119 132 0
1123 132 0
1127 132 0
1131 132 0
1135 132 0
1139 132 0
1143 132 0
1147 132 0
1151 132 0
1155 133 0
1159 133 0
1163 133 0
1167 133 0
1171 133 0
1175 133 0
1179 133 0
1183 133 0
1187 133 0
1191 132 0
1195 132 0
1199 131 0
1203 130 0
1206 129 0
1210 127 0
1214 126 0
1217 124 0
1221 122 0
1225 120 0
1228 118 0
1232 117 0
1235 115 0
1239 113 0
1242 111 0
1246 110 0
1250 108 0
1254 107 0
1257 105 0
1261 104 0
1265 103 0
1269 102 0
1273 101 0
1277 100 0
1281 99 0
1285 99 0
1288 99 0
1292 99 0
1296 99 0
1300 99 0
1304 99 0
1308 99 0
1312 99 0
1316 99 0
1320 99 0
1324 100 0
1328 100 0
1332 100 0
1336 101 0
1340 101 0
1344 102 0
1348 103 0
1352 104 0
1356 105 0
1360 106 0
1364 107 0
1368 108 0
1371 109 0
1375 110 0
1379 112 0
1383 113 0
1387 114 0
1391 115 0
1394 116 0
1398 116 0
1402 117 0
1406 118 0
1410 118 0
1414 118 0
1418 118 0
1422 118 0
1426 118 0
1430 117 0
1434 117 0
1438 116 0
1442 116 0
1446 115 0
1450 115 0
1454 114 0
1458 114 0
1462 113 0
1466 113 0
1470 113 0
1474 113 0
1478 113 0
1482 113 0
1486 114 0
1490 114 0
1494 114 0
1498 115 0
1502 115 0
1506 115 0
1510 116 0
1514 115 0
1518 115 0
1522 115 0
1526 114 0
1530 114 0
1534 113 0
1537 112 0
1541 111 0
1545 109 0
1549 108 0
1552 106 0
1556 104 0
1559 103 0
1563 100 0
1566 98 0
1570 96 0
1573 94 0
1576 92 0
1580 90 0
1583 88 0
1587 86 0
1590 84 0
1594 82 0
1597 80 0
1601 78 0
1605 77 0
1608 75 0
1612 74 0
1616 72 0
1620 71 0
1623 70 0
1627 69 0
1631 68 0
1635 68 0
1639 68 0
1643 68 0
1647 68 0
1651 68 0
1655 68 0
1659 68 0
1663 68 0
1667 68 0
1671 68 0
1675 68 0
1679 68 0
1683 68 0
1687 67 0
1691 67 0
1695 67 0
1699 67 0
1703 67 0
1707 68 0
1711 68 0
1715 69 0
1719 70 0
1723 71 0
1727 72 0
1730 73 0
1734 74 0
1738 75 0
1742 76 0
1746 77 0
1750 77 0
1754 78 0
1758 78 0
1762 78 0
1766 78 0
1770 78 0
1774 77 0
1778 77 0
1782 77 0
1786 76 0
1790 76 0
1794 75 0
1798 75 0
1802 74 0
1806 73 0
1810 72 0
1813 71 0
1817 70 0
1821 69 0
1825 67 0
1828 66 0
1832 64 0
1835 62 0
1839 60 0
1842 58 0
1846 56 0
1849 54 0
1853 52 0
1857 50 0
1860 49 0
1864 48 0
1868 47 0
1872 46 0
1876 46 0
1880 45 0
1884 45 0
1888 44 0
1892 43 0
1896 42 0
1899 41 0
1903 40 0
1907 39 0
1911 37 0
1914 35 0
1918 33 0
1921 32 0
1925 30 0
1928 27 0
1932 25 0
1935 23 0
1938 21 0
1942 19 0
1945 16 0
1948 14 0
1951 12 0
1955 9 0
1958 7 0
1961 5 0
1965 3 0
1969 2 0
1972 0 0
end frb_curve_t