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 = 9
|   Segment [0] from curve    8
|     1396 samples [ 164..1559]
|     0.206 of the curve [0.024__0.230]
|   Segment [1] from curve   18 (reversed)
|      671 samples [  44.. 714]
|     0.109 of the curve [0.007__0.116]
| Candidate after realignment and trimming:
|   Candidate index = 9
|   Segment [0] from curve    8
|      513 samples [ 605..1117]
|     0.076 of the curve [0.089__0.165]
|   Segment [1] from curve   18 (reversed)
|      513 samples [ 123.. 635]
|     0.083 of the curve [0.020__0.103]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 1 0
12 1 0
16 1 0
20 1 0
24 0 0
28 0 0
32 0 0
36 -1 0
40 -1 0
44 -1 0
48 -1 0
52 -1 0
56 0 0
60 0 0
64 0 0
68 1 0
72 1 0
76 2 0
80 2 0
84 3 0
88 4 0
91 5 0
95 6 0
99 7 0
103 8 0
107 10 0
110 11 0
114 12 0
118 14 0
122 16 0
125 17 0
129 19 0
132 21 0
136 22 0
140 24 0
143 26 0
146 28 0
150 30 0
153 33 0
157 35 0
160 37 0
163 39 0
167 41 0
170 43 0
174 44 0
178 46 0
182 47 0
186 48 0
189 49 0
193 50 0
197 51 0
201 52 0
205 53 0
209 54 0
213 55 0
216 57 0
220 58 0
224 60 0
227 62 0
231 64 0
234 66 0
237 68 0
241 70 0
244 72 0
248 74 0
251 76 0
255 78 0
258 80 0
262 82 0
265 84 0
268 86 0
272 88 0
275 91 0
279 93 0
282 95 0
286 96 0
289 98 0
293 100 0
296 102 0
300 104 0
304 105 0
307 107 0
311 108 0
315 110 0
318 111 0
322 113 0
326 114 0
330 116 0
333 118 0
337 119 0
340 121 0
344 123 0
347 125 0
351 127 0
354 129 0
358 131 0
361 133 0
365 135 0
369 136 0
372 138 0
376 139 0
380 140 0
384 140 0
388 141 0
392 141 0
396 142 0
400 142 0
404 142 0
408 143 0
412 143 0
416 144 0
420 144 0
424 145 0
428 145 0
432 146 0
436 147 0
439 148 0
443 149 0
447 150 0
451 151 0
455 152 0
459 153 0
463 154 0
467 155 0
470 155 0
474 156 0
478 157 0
482 157 0
486 158 0
490 158 0
494 158 0
498 158 0
502 157 0
506 157 0
510 157 0
514 156 0
518 155 0
522 154 0
526 152 0
529 151 0
533 149 0
537 147 0
540 145 0
543 144 0
547 141 0
550 139 0
554 137 0
557 135 0
561 133 0
564 131 0
567 129 0
571 126 0
574 124 0
577 122 0
581 120 0
584 118 0
587 116 0
591 114 0
594 112 0
598 110 0
602 109 0
606 108 0
610 107 0
613 106 0
617 106 0
621 106 0
625 106 0
629 107 0
633 107 0
637 108 0
641 108 0
645 109 0
649 109 0
653 109 0
657 110 0
661 110 0
665 111 0
669 111 0
673 112 0
677 112 0
681 113 0
685 113 0
689 113 0
693 113 0
697 113 0
701 113 0
705 113 0
709 113 0
713 112 0
717 112 0
721 111 0
725 111 0
729 110 0
733 109 0
736 107 0
740 106 0
744 105 0
748 103 0
751 102 0
755 100 0
759 98 0
762 97 0
766 95 0
770 93 0
773 92 0
777 90 0
781 89 0
784 87 0
788 86 0
792 85 0
796 84 0
800 83 0
804 82 0
808 81 0
812 80 0
815 80 0
819 79 0
823 79 0
827 79 0
831 79 0
835 79 0
839 79 0
843 80 0
847 81 0
851 82 0
855 83 0
859 85 0
862 86 0
866 88 0
870 89 0
873 91 0
877 93 0
880 95 0
884 97 0
887 98 0
891 100 0
895 102 0
899 103 0
902 104 0
906 105 0
910 106 0
914 106 0
918 106 0
922 106 0
926 105 0
930 104 0
934 103 0
937 101 0
941 100 0
945 98 0
949 97 0
952 95 0
956 94 0
960 93 0
964 92 0
968 92 0
972 91 0
976 90 0
980 89 0
984 89 0
988 88 0
991 87 0
995 86 0
999 86 0
1003 85 0
1007 84 0
1011 83 0
1015 82 0
1019 81 0
1023 80 0
1027 79 0
1030 78 0
1034 77 0
1038 75 0
1042 74 0
1045 72 0
1049 70 0
1052 68 0
1056 66 0
1059 64 0
1062 62 0
1066 59 0
1069 57 0
1072 55 0
1075 53 0
1079 50 0
1082 48 0
1086 47 0
1089 45 0
1093 43 0
1097 41 0
1100 40 0
1104 38 0
1108 36 0
1111 35 0
1115 33 0
1119 32 0
1122 31 0
1126 30 0
1130 29 0
1134 29 0
1138 29 0
1142 29 0
1146 29 0
1150 29 0
1154 29 0
1158 29 0
1162 28 0
1166 28 0
1170 27 0
1174 26 0
1178 25 0
1182 24 0
1186 23 0
1190 22 0
1193 21 0
1197 20 0
1201 19 0
1205 18 0
1209 17 0
1213 17 0
1217 16 0
1221 16 0
1225 16 0
1229 16 0
1233 17 0
1237 17 0
1241 18 0
1245 19 0
1249 20 0
1252 21 0
1256 22 0
1260 24 0
1264 25 0
1267 26 0
1271 28 0
1275 29 0
1279 30 0
1283 31 0
1287 32 0
1291 32 0
1295 32 0
1299 32 0
1303 32 0
1307 32 0
1311 32 0
1315 31 0
1319 31 0
1323 30 0
1326 29 0
1330 28 0
1334 27 0
1338 26 0
1342 25 0
1346 23 0
1349 22 0
1353 20 0
1356 18 0
1360 17 0
1364 15 0
1367 13 0
1371 11 0
1375 10 0
1378 8 0
1382 7 0
1386 5 0
1389 4 0
1393 3 0
1397 1 0
1401 0 0
1405 -1 0
1409 -1 0
1413 -2 0
1417 -3 0
1421 -3 0
1425 -3 0
1429 -3 0
1433 -3 0
1437 -3 0
1441 -2 0
1445 -2 0
1448 -1 0
1452 0 0
1456 1 0
1460 1 0
1464 2 0
1468 3 0
1472 4 0
1476 5 0
1480 5 0
1484 6 0
1488 6 0
1492 6 0
1496 7 0
1500 7 0
1504 8 0
1508 9 0
1511 10 0
1515 11 0
1519 12 0
1523 14 0
1526 16 0
1530 18 0
1533 19 0
1537 21 0
1541 22 0
1545 24 0
1548 25 0
1552 25 0
1556 26 0
1560 26 0
1564 25 0
1568 24 0
1572 23 0
1576 22 0
1579 20 0
1583 18 0
1586 16 0
1589 13 0
1592 10 0
1594 7 0
1597 4 0
1600 1 0
1602 -2 0
1605 -5 0
1608 -7 0
1611 -10 0
1614 -12 0
1618 -15 0
1621 -17 0
1624 -19 0
1628 -21 0
1631 -23 0
1635 -25 0
1638 -27 0
1642 -29 0
1645 -31 0
1649 -33 0
1653 -34 0
1656 -35 0
1660 -36 0
1664 -37 0
1668 -38 0
1672 -38 0
1676 -38 0
1680 -38 0
1684 -37 0
1688 -36 0
1692 -35 0
1696 -34 0
1699 -33 0
1703 -31 0
1706 -29 0
1710 -27 0
1713 -24 0
1716 -22 0
1719 -19 0
1722 -17 0
1726 -14 0
1729 -12 0
1732 -10 0
1735 -7 0
1739 -5 0
1742 -3 0
1746 -2 0
1750 -1 0
1754 1 0
1757 2 0
1761 3 0
1765 3 0
1769 4 0
1773 5 0
1777 6 0
1781 7 0
1785 9 0
1788 10 0
1792 11 0
1796 12 0
1800 13 0
1804 14 0
1808 15 0
1812 16 0
1816 16 0
1820 17 0
1823 18 0
1827 18 0
1831 19 0
1835 19 0
1839 19 0
1843 20 0
1847 20 0
1851 20 0
1855 20 0
1859 20 0
1863 20 0
1867 19 0
1871 18 0
1875 18 0
1879 17 0
1883 15 0
1887 14 0
1890 13 0
1894 11 0
1898 10 0
1901 8 0
1905 6 0
1909 5 0
1912 3 0
1916 2 0
1920 1 0
1924 0 0
end frb_curve_t