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 = 14
|   Segment [0] from curve   18
|      600 samples [5367..5966]
|     0.097 of the curve [0.872__0.969]
|   Segment [1] from curve   30 (reversed)
|      600 samples [1267..1866]
|     0.209 of the curve [0.442__0.650]
| Candidate after realignment and trimming:
|   Candidate index = 14
|   Segment [0] from curve   18
|      513 samples [5410..5922]
|     0.083 of the curve [0.879__0.962]
|   Segment [1] from curve   30 (reversed)
|      513 samples [1311..1823]
|     0.179 of the curve [0.457__0.635]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 0 0
8 1 0
12 1 0
16 1 0
20 1 0
24 2 0
28 2 0
32 2 0
36 3 0
40 3 0
44 3 0
48 4 0
52 4 0
56 5 0
60 6 0
64 6 0
68 7 0
72 8 0
75 8 0
79 9 0
83 10 0
87 11 0
91 12 0
95 12 0
99 13 0
103 14 0
107 15 0
111 15 0
115 16 0
119 17 0
122 18 0
126 20 0
130 21 0
134 23 0
137 24 0
141 26 0
145 27 0
148 29 0
152 30 0
156 31 0
160 31 0
164 32 0
168 32 0
172 31 0
176 31 0
180 31 0
184 31 0
188 30 0
192 30 0
196 30 0
200 30 0
204 31 0
208 31 0
212 31 0
216 32 0
220 32 0
224 33 0
228 34 0
232 34 0
236 35 0
240 36 0
244 36 0
248 37 0
251 38 0
255 38 0
259 38 0
263 38 0
267 38 0
271 38 0
275 38 0
279 37 0
283 36 0
287 36 0
291 35 0
295 34 0
299 33 0
303 33 0
307 32 0
311 32 0
315 31 0
319 31 0
323 30 0
327 30 0
331 30 0
335 30 0
339 29 0
343 29 0
347 28 0
351 27 0
354 26 0
358 25 0
362 24 0
366 23 0
370 23 0
374 22 0
378 21 0
382 21 0
386 21 0
390 22 0
394 22 0
398 23 0
402 24 0
405 26 0
409 27 0
413 29 0
416 30 0
420 32 0
424 34 0
427 36 0
431 37 0
434 39 0
438 41 0
442 42 0
446 43 0
450 44 0
453 45 0
457 46 0
461 46 0
465 46 0
469 45 0
473 44 0
477 43 0
481 42 0
485 41 0
488 39 0
492 38 0
496 36 0
500 35 0
503 34 0
507 32 0
511 31 0
515 30 0
519 29 0
522 27 0
526 26 0
530 25 0
534 23 0
537 21 0
541 20 0
544 18 0
548 16 0
552 15 0
556 14 0
560 13 0
564 13 0
568 13 0
572 13 0
576 14 0
580 14 0
583 15 0
587 16 0
591 17 0
595 18 0
599 19 0
603 20 0
607 20 0
611 20 0
615 20 0
619 20 0
623 20 0
627 19 0
631 18 0
635 18 0
639 17 0
643 17 0
647 16 0
651 16 0
655 16 0
659 15 0
663 15 0
667 15 0
671 15 0
675 15 0
679 15 0
683 15 0
686 16 0
690 17 0
694 18 0
698 19 0
702 21 0
705 22 0
709 24 0
713 26 0
716 27 0
720 29 0
724 30 0
727 32 0
731 33 0
735 35 0
738 36 0
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746 40 0
749 41 0
753 43 0
757 45 0
760 47 0
764 48 0
768 50 0
771 51 0
775 53 0
779 54 0
782 56 0
786 58 0
790 59 0
793 61 0
797 63 0
800 65 0
804 67 0
807 69 0
811 71 0
814 72 0
818 73 0
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826 75 0
830 75 0
834 75 0
838 75 0
842 75 0
846 75 0
850 74 0
854 74 0
858 74 0
862 73 0
866 73 0
870 73 0
874 73 0
878 73 0
882 73 0
886 73 0
890 72 0
894 72 0
898 72 0
902 71 0
906 71 0
910 71 0
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969 48 0
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980 43 0
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987 41 0
991 41 0
995 42 0
999 42 0
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1007 44 0
1011 45 0
1015 46 0
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1022 49 0
1026 50 0
1030 51 0
1034 52 0
1038 52 0
1042 53 0
1046 53 0
1050 53 0
1054 53 0
1058 53 0
1062 53 0
1066 53 0
1070 53 0
1074 53 0
1078 52 0
1082 52 0
1086 51 0
1090 51 0
1094 50 0
1097 49 0
1101 47 0
1105 46 0
1109 45 0
1113 44 0
1117 44 0
1121 43 0
1125 43 0
1129 43 0
1133 43 0
1137 43 0
1141 44 0
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1200 51 0
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1232 57 0
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1243 61 0
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1282 69 0
1286 68 0
1290 68 0
1294 67 0
1298 67 0
1302 66 0
1306 65 0
1310 64 0
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1317 61 0
1321 60 0
1325 59 0
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1349 46 0
1353 43 0
1356 41 0
1359 38 0
1362 36 0
1365 33 0
1368 31 0
1372 29 0
1375 27 0
1379 25 0
1382 23 0
1386 22 0
1390 21 0
1394 20 0
1398 20 0
1402 19 0
1406 20 0
1410 20 0
1414 21 0
1418 21 0
1422 22 0
1425 23 0
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1433 24 0
1437 25 0
1441 25 0
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1449 25 0
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1457 24 0
1461 24 0
1465 24 0
1469 24 0
1473 25 0
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1501 31 0
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1520 34 0
1524 34 0
1528 33 0
1532 33 0
1536 32 0
1540 31 0
1544 30 0
1548 28 0
1551 27 0
1555 25 0
1559 24 0
1563 23 0
1566 21 0
1570 20 0
1574 19 0
1578 18 0
1582 18 0
1586 17 0
1590 16 0
1594 15 0
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1605 13 0
1609 12 0
1613 10 0
1617 9 0
1621 8 0
1624 6 0
1628 5 0
1632 4 0
1636 2 0
1639 1 0
1643 -1 0
1647 -3 0
1650 -4 0
1654 -6 0
1657 -8 0
1660 -11 0
1664 -13 0
1667 -15 0
1670 -18 0
1673 -20 0
1676 -23 0
1680 -25 0
1683 -27 0
1686 -30 0
1690 -32 0
1693 -34 0
1697 -36 0
1700 -37 0
1704 -39 0
1707 -41 0
1711 -42 0
1715 -43 0
1719 -45 0
1723 -46 0
1726 -47 0
1730 -48 0
1734 -49 0
1738 -50 0
1742 -51 0
1746 -51 0
1750 -52 0
1754 -52 0
1758 -53 0
1762 -53 0
1766 -52 0
1770 -52 0
1774 -51 0
1777 -49 0
1781 -48 0
1785 -46 0
1788 -44 0
1791 -41 0
1794 -39 0
1797 -36 0
1800 -33 0
1803 -30 0
1805 -27 0
1808 -24 0
1811 -21 0
1813 -18 0
1816 -15 0
1819 -13 0
1822 -10 0
1825 -7 0
1828 -5 0
1831 -3 0
1835 0 0
1838 2 0
1842 3 0
1845 5 0
1849 7 0
1853 8 0
1856 10 0
1860 11 0
1864 13 0
1868 14 0
1872 15 0
1875 16 0
1879 17 0
1883 17 0
1887 18 0
1891 17 0
1895 17 0
1899 16 0
1903 15 0
1907 14 0
1911 13 0
1915 12 0
1918 11 0
1922 9 0
1926 8 0
1930 7 0
1934 6 0
1938 5 0
1941 3 0
1945 2 0
1949 0 0
end frb_curve_t