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 = 19
|   Segment [0] from curve   25
|      754 samples [   7.. 760]
|     0.123 of the curve [0.001__0.124]
|   Segment [1] from curve   30 (reversed)
|      667 samples [  10.. 676]
|     0.232 of the curve [0.003__0.236]
| Candidate after realignment and trimming:
|   Candidate index = 19
|   Segment [0] from curve   25
|      513 samples [ 127.. 639]
|     0.083 of the curve [0.021__0.104]
|   Segment [1] from curve   30 (reversed)
|      513 samples [  87.. 599]
|     0.179 of the curve [0.030__0.209]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 3 0
11 4 0
15 5 0
19 6 0
23 7 0
27 7 0
31 8 0
35 9 0
39 10 0
43 10 0
47 11 0
51 11 0
55 12 0
59 12 0
63 12 0
67 11 0
71 11 0
74 10 0
78 10 0
82 9 0
86 9 0
90 8 0
94 8 0
98 8 0
102 9 0
106 9 0
110 10 0
114 11 0
118 12 0
122 13 0
126 14 0
130 15 0
134 16 0
138 17 0
141 17 0
145 18 0
149 18 0
153 18 0
157 18 0
161 18 0
165 18 0
169 18 0
173 18 0
177 17 0
181 17 0
185 17 0
189 17 0
193 18 0
197 18 0
201 19 0
205 20 0
209 22 0
213 23 0
216 24 0
220 26 0
224 27 0
227 29 0
231 30 0
235 31 0
239 33 0
243 34 0
247 35 0
250 36 0
254 37 0
258 38 0
262 40 0
265 41 0
269 43 0
273 44 0
277 46 0
280 47 0
284 49 0
288 51 0
291 52 0
295 53 0
299 55 0
303 56 0
307 57 0
310 57 0
314 58 0
318 59 0
322 59 0
326 60 0
330 60 0
334 61 0
338 61 0
342 62 0
346 62 0
350 63 0
354 63 0
358 63 0
362 63 0
366 64 0
370 64 0
374 64 0
378 64 0
382 64 0
386 64 0
390 63 0
394 63 0
398 64 0
402 64 0
406 64 0
410 65 0
414 65 0
418 66 0
422 67 0
426 68 0
430 69 0
433 70 0
437 71 0
441 71 0
445 72 0
449 72 0
453 72 0
457 72 0
461 71 0
465 71 0
469 70 0
473 70 0
477 69 0
481 69 0
485 68 0
489 68 0
493 68 0
497 67 0
501 67 0
505 67 0
509 67 0
513 67 0
517 67 0
521 68 0
525 68 0
529 69 0
533 69 0
537 70 0
541 71 0
545 71 0
549 72 0
553 72 0
557 73 0
561 73 0
565 74 0
569 74 0
573 75 0
576 75 0
580 76 0
584 77 0
588 78 0
592 79 0
596 80 0
600 81 0
604 82 0
607 84 0
611 85 0
615 86 0
619 87 0
623 88 0
627 88 0
631 89 0
635 89 0
639 89 0
643 89 0
647 88 0
651 88 0
655 87 0
658 86 0
662 84 0
666 82 0
669 81 0
673 79 0
676 77 0
680 75 0
683 73 0
687 71 0
690 69 0
694 68 0
698 66 0
702 65 0
705 64 0
709 62 0
713 61 0
717 60 0
720 58 0
724 56 0
728 55 0
731 53 0
735 51 0
738 49 0
742 47 0
745 45 0
748 43 0
752 40 0
755 38 0
758 36 0
762 34 0
765 32 0
769 29 0
772 27 0
775 25 0
779 23 0
782 21 0
785 19 0
789 17 0
792 15 0
796 13 0
800 12 0
803 10 0
807 8 0
811 7 0
814 5 0
818 4 0
822 3 0
826 2 0
830 1 0
834 0 0
838 -1 0
841 -2 0
845 -2 0
849 -3 0
853 -4 0
857 -4 0
861 -5 0
865 -5 0
869 -5 0
873 -6 0
877 -6 0
881 -6 0
885 -6 0
889 -6 0
893 -6 0
897 -5 0
901 -5 0
905 -4 0
909 -4 0
913 -3 0
917 -3 0
921 -2 0
925 -2 0
929 -1 0
933 -1 0
937 0 0
941 0 0
945 1 0
949 1 0
953 2 0
956 3 0
960 4 0
964 5 0
968 6 0
972 7 0
976 8 0
980 8 0
984 9 0
988 10 0
992 10 0
996 11 0
1000 12 0
1003 13 0
1007 14 0
1011 16 0
1015 17 0
1018 19 0
1022 21 0
1025 23 0
1029 25 0
1032 28 0
1035 30 0
1038 32 0
1042 34 0
1045 37 0
1048 39 0
1052 41 0
1056 42 0
1059 44 0
1063 45 0
1067 46 0
1071 46 0
1075 46 0
1079 46 0
1083 46 0
1087 45 0
1091 44 0
1095 43 0
1099 42 0
1103 42 0
1107 41 0
1111 41 0
1115 41 0
1119 41 0
1122 41 0
1126 42 0
1130 43 0
1134 43 0
1138 44 0
1142 44 0
1146 45 0
1150 45 0
1154 45 0
1158 44 0
1162 43 0
1166 42 0
1169 40 0
1173 38 0
1176 35 0
1179 32 0
1182 30 0
1185 27 0
1188 24 0
1191 22 0
1194 20 0
1197 17 0
1201 15 0
1205 14 0
1208 12 0
1212 11 0
1216 10 0
1220 9 0
1224 9 0
1228 8 0
1232 8 0
1236 8 0
1240 7 0
1244 8 0
1248 8 0
1252 8 0
1256 9 0
1259 10 0
1263 11 0
1267 13 0
1271 15 0
1274 16 0
1278 18 0
1281 20 0
1285 22 0
1289 23 0
1292 25 0
1296 26 0
1300 28 0
1303 29 0
1307 31 0
1311 32 0
1315 34 0
1318 35 0
1322 37 0
1326 38 0
1329 40 0
1333 41 0
1337 43 0
1341 44 0
1344 45 0
1348 47 0
1352 48 0
1356 49 0
1360 50 0
1364 51 0
1367 52 0
1371 53 0
1375 54 0
1379 55 0
1383 56 0
1387 57 0
1391 57 0
1395 58 0
1399 59 0
1403 60 0
1407 60 0
1410 61 0
1414 62 0
1418 63 0
1422 64 0
1426 64 0
1430 65 0
1434 65 0
1438 65 0
1442 65 0
1446 64 0
1450 63 0
1454 62 0
1458 61 0
1461 59 0
1465 57 0
1468 55 0
1472 53 0
1475 52 0
1479 50 0
1483 49 0
1486 47 0
1490 46 0
1494 46 0
1498 46 0
1502 46 0
1506 46 0
1510 47 0
1514 48 0
1518 49 0
1522 51 0
1525 53 0
1529 55 0
1532 57 0
1535 59 0
1539 61 0
1542 64 0
1545 66 0
1548 68 0
1551 71 0
1555 73 0
1558 76 0
1561 78 0
1564 81 0
1567 83 0
1570 86 0
1573 89 0
1575 92 0
1578 95 0
1581 98 0
1583 101 0
1586 104 0
1589 107 0
1592 109 0
1595 112 0
1598 114 0
1602 116 0
1606 117 0
1610 118 0
1613 119 0
1617 119 0
1621 119 0
1625 119 0
1629 117 0
1633 116 0
1636 114 0
1640 112 0
1643 109 0
1646 107 0
1649 104 0
1652 102 0
1655 99 0
1658 96 0
1661 94 0
1665 92 0
1668 90 0
1672 88 0
1676 87 0
1679 86 0
1683 85 0
1687 84 0
1691 83 0
1695 82 0
1699 81 0
1703 80 0
1706 78 0
1710 77 0
1714 75 0
1717 73 0
1720 71 0
1723 68 0
1727 66 0
1730 63 0
1732 60 0
1735 57 0
1738 55 0
1741 52 0
1744 49 0
1747 47 0
1750 44 0
1753 41 0
1756 39 0
1759 36 0
1763 34 0
1766 32 0
1769 30 0
1773 27 0
1776 26 0
1780 24 0
1783 22 0
1787 21 0
1791 20 0
1795 19 0
1799 18 0
1803 18 0
1807 18 0
1811 18 0
1815 18 0
1819 19 0
1823 19 0
1827 20 0
1831 20 0
1835 21 0
1839 21 0
1843 21 0
1847 21 0
1851 20 0
1855 19 0
1858 18 0
1862 17 0
1866 15 0
1869 13 0
1872 10 0
1876 8 0
1879 6 0
1883 5 0
1887 3 0
1890 2 0
1894 1 0
1898 1 0
1902 0 0
1906 0 0
1910 0 0
1914 0 0
1918 0 0
end frb_curve_t