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 = 15
|   Segment [0] from curve   20
|      600 samples [ 383.. 982]
|     0.126 of the curve [0.080__0.206]
|   Segment [1] from curve   31 (reversed)
|      600 samples [ 305.. 904]
|     0.108 of the curve [0.055__0.163]
| Candidate after realignment and trimming:
|   Candidate index = 15
|   Segment [0] from curve   20
|      513 samples [ 426.. 938]
|     0.108 of the curve [0.089__0.197]
|   Segment [1] from curve   31 (reversed)
|      513 samples [ 349.. 861]
|     0.092 of the curve [0.063__0.155]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 -1 0
8 -2 0
11 -4 0
15 -5 0
19 -6 0
23 -7 0
27 -7 0
31 -8 0
35 -8 0
39 -8 0
43 -7 0
47 -7 0
51 -6 0
55 -5 0
59 -5 0
63 -4 0
67 -3 0
70 -2 0
74 -1 0
78 -1 0
82 0 0
86 0 0
90 1 0
94 1 0
98 1 0
102 1 0
106 1 0
110 1 0
114 1 0
118 1 0
122 1 0
126 1 0
130 1 0
134 2 0
138 2 0
142 3 0
146 3 0
150 4 0
154 5 0
158 5 0
162 6 0
166 7 0
170 8 0
174 8 0
178 9 0
182 10 0
185 11 0
189 12 0
193 13 0
197 13 0
201 14 0
205 15 0
209 15 0
213 16 0
217 16 0
221 17 0
225 17 0
229 17 0
233 18 0
237 18 0
241 18 0
245 18 0
249 18 0
253 18 0
257 19 0
261 19 0
265 19 0
269 19 0
273 19 0
277 19 0
281 20 0
285 20 0
289 20 0
293 20 0
297 20 0
301 20 0
305 21 0
309 21 0
313 21 0
317 21 0
321 21 0
325 21 0
329 22 0
333 22 0
337 23 0
341 23 0
345 24 0
348 25 0
352 26 0
356 27 0
360 28 0
364 29 0
368 30 0
372 31 0
375 32 0
379 33 0
383 35 0
387 36 0
391 37 0
395 38 0
398 39 0
402 40 0
406 41 0
410 42 0
414 42 0
418 43 0
422 43 0
426 44 0
430 44 0
434 45 0
438 45 0
442 45 0
446 46 0
450 46 0
454 46 0
458 45 0
462 45 0
466 44 0
470 43 0
473 41 0
477 40 0
481 39 0
485 37 0
489 36 0
492 35 0
496 35 0
500 34 0
504 34 0
508 34 0
512 34 0
516 34 0
520 34 0
524 34 0
528 34 0
532 34 0
536 34 0
540 34 0
544 34 0
548 34 0
552 35 0
556 35 0
560 36 0
564 36 0
568 37 0
572 39 0
576 40 0
579 41 0
583 43 0
587 45 0
590 46 0
594 48 0
597 50 0
601 52 0
605 54 0
608 56 0
612 57 0
615 59 0
619 61 0
623 62 0
626 64 0
630 65 0
634 66 0
638 67 0
642 68 0
646 69 0
650 69 0
654 70 0
658 70 0
662 70 0
666 71 0
670 71 0
673 71 0
677 72 0
681 72 0
685 73 0
689 74 0
693 75 0
697 76 0
701 77 0
705 78 0
709 79 0
712 80 0
716 81 0
720 82 0
724 84 0
728 85 0
732 86 0
736 87 0
739 88 0
743 89 0
747 90 0
751 91 0
755 92 0
758 94 0
762 95 0
766 97 0
769 98 0
773 100 0
777 102 0
780 104 0
784 105 0
788 107 0
791 109 0
795 110 0
798 112 0
802 114 0
805 116 0
809 118 0
812 120 0
816 122 0
819 124 0
823 126 0
826 128 0
830 130 0
833 132 0
837 134 0
840 136 0
844 138 0
847 140 0
850 142 0
854 144 0
857 147 0
860 149 0
863 152 0
866 155 0
868 158 0
871 161 0
873 164 0
875 168 0
878 171 0
880 174 0
882 177 0
885 180 0
887 183 0
890 186 0
893 189 0
896 191 0
900 194 0
903 196 0
906 198 0
910 200 0
913 202 0
917 204 0
921 205 0
924 207 0
928 208 0
932 210 0
936 211 0
940 212 0
943 212 0
947 213 0
951 213 0
955 214 0
959 214 0
963 215 0
967 215 0
971 216 0
975 216 0
979 216 0
983 217 0
987 217 0
991 217 0
995 217 0
999 216 0
1003 216 0
1007 215 0
1011 214 0
1015 213 0
1019 212 0
1023 211 0
1027 210 0
1030 209 0
1034 208 0
1038 207 0
1042 207 0
1046 206 0
1050 206 0
1054 206 0
1058 207 0
1062 207 0
1066 208 0
1070 209 0
1074 210 0
1078 211 0
1082 212 0
1085 213 0
1089 213 0
1093 214 0
1097 214 0
1101 214 0
1105 214 0
1109 214 0
1113 213 0
1117 213 0
1121 212 0
1125 212 0
1129 211 0
1133 211 0
1137 210 0
1141 209 0
1145 208 0
1149 208 0
1153 207 0
1157 206 0
1160 204 0
1164 203 0
1168 202 0
1172 201 0
1176 200 0
1179 198 0
1183 197 0
1187 196 0
1191 194 0
1195 193 0
1198 191 0
1202 190 0
1206 188 0
1209 187 0
1213 185 0
1217 184 0
1220 182 0
1224 181 0
1228 180 0
1232 179 0
1236 179 0
1240 179 0
1244 179 0
1248 179 0
1252 180 0
1256 180 0
1260 181 0
1264 181 0
1268 182 0
1272 182 0
1276 182 0
1280 182 0
1284 183 0
1288 183 0
1292 183 0
1296 183 0
1300 183 0
1304 183 0
1308 184 0
1312 184 0
1316 185 0
1320 186 0
1324 186 0
1327 187 0
1331 187 0
1335 188 0
1339 188 0
1343 188 0
1347 188 0
1351 188 0
1355 187 0
1359 186 0
1363 185 0
1367 184 0
1371 183 0
1375 182 0
1379 181 0
1383 180 0
1386 180 0
1390 179 0
1394 179 0
1398 178 0
1402 178 0
1406 178 0
1410 178 0
1414 178 0
1418 178 0
1422 178 0
1426 178 0
1430 178 0
1434 177 0
1438 177 0
1442 176 0
1446 176 0
1450 175 0
1454 174 0
1458 174 0
1462 173 0
1466 173 0
1470 172 0
1474 172 0
1478 172 0
1482 171 0
1486 171 0
1490 170 0
1494 170 0
1498 169 0
1501 167 0
1505 166 0
1508 164 0
1512 161 0
1515 159 0
1518 156 0
1521 153 0
1523 150 0
1526 147 0
1528 144 0
1531 141 0
1533 138 0
1535 134 0
1538 131 0
1540 128 0
1542 124 0
1544 121 0
1547 118 0
1549 115 0
1552 111 0
1554 109 0
1557 106 0
1560 103 0
1564 101 0
1567 99 0
1570 97 0
1574 95 0
1578 94 0
1581 92 0
1585 91 0
1589 89 0
1593 88 0
1597 87 0
1600 85 0
1604 84 0
1608 83 0
1612 81 0
1615 80 0
1619 79 0
1623 77 0
1627 76 0
1630 74 0
1634 72 0
1637 71 0
1641 69 0
1645 67 0
1648 65 0
1652 63 0
1655 61 0
1659 59 0
1662 57 0
1666 55 0
1669 54 0
1673 52 0
1676 50 0
1680 49 0
1684 48 0
1688 48 0
1692 48 0
1696 48 0
1700 48 0
1704 49 0
1708 50 0
1712 51 0
1716 52 0
1719 53 0
1723 54 0
1727 55 0
1731 56 0
1735 57 0
1739 58 0
1743 58 0
1747 58 0
1751 58 0
1755 58 0
1759 58 0
1763 58 0
1767 58 0
1771 57 0
1775 57 0
1779 57 0
1783 56 0
1787 56 0
1791 56 0
1795 55 0
1799 55 0
1803 54 0
1807 54 0
1811 53 0
1814 52 0
1818 50 0
1822 49 0
1826 47 0
1829 46 0
1833 44 0
1836 42 0
1840 40 0
1844 39 0
1847 37 0
1851 36 0
1855 35 0
1859 34 0
1863 33 0
1867 32 0
1871 31 0
1874 31 0
1878 30 0
1882 29 0
1886 28 0
1890 27 0
1894 25 0
1897 23 0
1901 21 0
1904 19 0
1907 16 0
1910 14 0
1913 11 0
1916 8 0
1918 5 0
1921 3 0
1924 0 0
end frb_curve_t