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 = 17
|   Segment [0] from curve   20
|      600 samples [4210..  44]
|     0.126 of the curve [0.884__0.009]
|   Segment [1] from curve   36 (reversed)
|      600 samples [4228..4827]
|     0.109 of the curve [0.769__0.878]
| Candidate after realignment and trimming:
|   Candidate index = 17
|   Segment [0] from curve   20
|      513 samples [4253..   0]
|     0.108 of the curve [0.893__0.000]
|   Segment [1] from curve   36 (reversed)
|      513 samples [4272..4784]
|     0.093 of the curve [0.777__0.870]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
3 3 0
6 6 0
9 8 0
12 11 0
15 13 0
19 15 0
22 16 0
26 18 0
30 19 0
34 20 0
38 21 0
42 22 0
46 22 0
50 23 0
54 23 0
58 24 0
62 24 0
66 24 0
70 24 0
74 24 0
78 24 0
82 24 0
85 23 0
89 22 0
93 22 0
97 21 0
101 20 0
105 19 0
109 18 0
113 17 0
117 16 0
121 16 0
125 15 0
129 14 0
133 14 0
137 13 0
140 13 0
144 12 0
148 11 0
152 11 0
156 10 0
160 9 0
164 9 0
168 9 0
172 9 0
176 9 0
180 10 0
184 10 0
188 11 0
192 12 0
196 14 0
200 15 0
203 16 0
207 17 0
211 18 0
215 19 0
219 20 0
223 21 0
227 21 0
231 21 0
235 21 0
239 20 0
243 20 0
247 20 0
251 19 0
255 19 0
259 19 0
263 19 0
267 18 0
271 18 0
275 18 0
279 17 0
283 17 0
286 17 0
290 16 0
294 16 0
298 15 0
302 14 0
306 14 0
310 13 0
314 12 0
318 12 0
322 11 0
326 10 0
330 10 0
334 9 0
338 8 0
342 7 0
346 6 0
349 5 0
353 5 0
357 4 0
361 3 0
365 3 0
369 2 0
373 2 0
377 2 0
381 1 0
385 1 0
389 1 0
393 0 0
397 0 0
401 -1 0
405 -2 0
409 -2 0
413 -3 0
417 -4 0
421 -5 0
424 -6 0
428 -7 0
432 -8 0
436 -9 0
440 -10 0
444 -11 0
448 -11 0
452 -12 0
456 -12 0
460 -13 0
464 -13 0
468 -14 0
472 -15 0
476 -16 0
479 -16 0
483 -17 0
487 -19 0
491 -20 0
495 -21 0
499 -22 0
503 -23 0
506 -24 0
510 -25 0
514 -26 0
518 -26 0
522 -27 0
526 -27 0
530 -28 0
534 -27 0
538 -27 0
542 -26 0
546 -26 0
550 -24 0
554 -23 0
557 -22 0
561 -20 0
565 -19 0
568 -17 0
572 -16 0
576 -14 0
579 -12 0
583 -11 0
587 -9 0
590 -7 0
594 -5 0
597 -3 0
600 -1 0
604 1 0
607 3 0
611 5 0
614 7 0
618 9 0
621 11 0
625 13 0
629 14 0
632 15 0
636 16 0
640 16 0
644 16 0
648 16 0
652 16 0
656 15 0
660 14 0
664 13 0
668 11 0
672 10 0
675 9 0
679 8 0
683 8 0
687 7 0
691 6 0
695 6 0
699 5 0
703 5 0
707 4 0
711 3 0
715 2 0
719 1 0
722 -1 0
726 -2 0
730 -3 0
733 -5 0
737 -7 0
740 -9 0
744 -11 0
747 -13 0
751 -15 0
754 -18 0
757 -20 0
760 -22 0
763 -25 0
767 -27 0
770 -29 0
774 -31 0
777 -33 0
781 -34 0
785 -36 0
788 -37 0
792 -39 0
796 -40 0
800 -42 0
803 -43 0
807 -44 0
811 -46 0
815 -47 0
818 -48 0
822 -50 0
826 -51 0
830 -52 0
834 -52 0
838 -53 0
842 -53 0
846 -53 0
850 -53 0
854 -53 0
858 -53 0
862 -53 0
866 -52 0
870 -52 0
874 -52 0
878 -53 0
882 -53 0
886 -53 0
890 -53 0
894 -54 0
898 -54 0
902 -54 0
906 -54 0
910 -54 0
914 -54 0
918 -54 0
922 -53 0
926 -53 0
930 -53 0
934 -52 0
938 -51 0
942 -50 0
945 -50 0
949 -48 0
953 -47 0
957 -46 0
961 -45 0
965 -44 0
968 -43 0
972 -42 0
976 -42 0
980 -42 0
984 -42 0
988 -42 0
992 -43 0
996 -44 0
1000 -45 0
1004 -46 0
1008 -47 0
1012 -49 0
1015 -50 0
1019 -51 0
1023 -52 0
1027 -53 0
1031 -54 0
1035 -54 0
1039 -55 0
1043 -56 0
1047 -57 0
1051 -57 0
1054 -58 0
1058 -58 0
1062 -58 0
1066 -58 0
1070 -57 0
1074 -57 0
1078 -56 0
1082 -55 0
1086 -54 0
1090 -53 0
1094 -51 0
1097 -50 0
1101 -48 0
1105 -47 0
1108 -45 0
1112 -43 0
1116 -42 0
1119 -40 0
1123 -39 0
1127 -37 0
1130 -36 0
1134 -34 0
1138 -33 0
1142 -31 0
1145 -30 0
1149 -28 0
1153 -26 0
1156 -25 0
1160 -23 0
1163 -21 0
1167 -19 0
1170 -17 0
1173 -15 0
1176 -12 0
1179 -9 0
1182 -6 0
1185 -3 0
1188 0 0
1190 3 0
1193 6 0
1195 9 0
1198 11 0
1201 14 0
1204 17 0
1208 19 0
1211 21 0
1215 22 0
1219 24 0
1222 25 0
1226 26 0
1230 27 0
1234 27 0
1238 27 0
1242 27 0
1246 26 0
1250 26 0
1254 25 0
1258 23 0
1261 22 0
1265 21 0
1269 20 0
1273 19 0
1277 18 0
1281 18 0
1285 18 0
1289 18 0
1293 18 0
1297 19 0
1301 19 0
1305 20 0
1309 21 0
1312 22 0
1316 23 0
1320 24 0
1324 24 0
1328 25 0
1332 24 0
1336 24 0
1340 23 0
1344 22 0
1348 20 0
1351 19 0
1355 17 0
1358 15 0
1362 13 0
1365 11 0
1369 9 0
1372 7 0
1376 5 0
1380 4 0
1383 2 0
1387 1 0
1391 0 0
1395 -1 0
1399 -1 0
1403 -2 0
1407 -2 0
1411 -3 0
1415 -4 0
1419 -4 0
1422 -5 0
1426 -7 0
1430 -8 0
1434 -10 0
1437 -11 0
1441 -13 0
1444 -15 0
1448 -17 0
1451 -19 0
1455 -20 0
1459 -22 0
1462 -24 0
1466 -25 0
1470 -27 0
1474 -28 0
1477 -29 0
1481 -30 0
1485 -31 0
1489 -32 0
1493 -33 0
1497 -34 0
1501 -34 0
1505 -35 0
1509 -35 0
1513 -35 0
1517 -36 0
1521 -36 0
1525 -36 0
1529 -36 0
1533 -37 0
1537 -37 0
1541 -37 0
1545 -37 0
1549 -37 0
1553 -37 0
1557 -36 0
1561 -36 0
1565 -36 0
1569 -36 0
1573 -35 0
1577 -35 0
1581 -35 0
1585 -34 0
1589 -34 0
1593 -34 0
1597 -33 0
1601 -32 0
1604 -32 0
1608 -31 0
1612 -29 0
1616 -28 0
1620 -27 0
1623 -25 0
1627 -24 0
1631 -22 0
1634 -20 0
1638 -18 0
1641 -17 0
1645 -15 0
1649 -14 0
1653 -12 0
1656 -11 0
1660 -11 0
1664 -10 0
1668 -10 0
1672 -10 0
1676 -10 0
1680 -10 0
1684 -11 0
1688 -11 0
1692 -12 0
1696 -13 0
1700 -14 0
1704 -14 0
1708 -15 0
1712 -16 0
1716 -16 0
1720 -17 0
1724 -18 0
1728 -18 0
1732 -19 0
1736 -19 0
1740 -20 0
1743 -20 0
1747 -21 0
1751 -21 0
1755 -21 0
1759 -22 0
1763 -22 0
1767 -23 0
1771 -23 0
1775 -23 0
1779 -24 0
1783 -24 0
1787 -24 0
1791 -24 0
1795 -23 0
1799 -23 0
1803 -22 0
1807 -22 0
1811 -21 0
1815 -20 0
1819 -19 0
1823 -18 0
1827 -17 0
1831 -16 0
1834 -15 0
1838 -14 0
1842 -13 0
1846 -12 0
1850 -10 0
1853 -9 0
1857 -8 0
1861 -6 0
1865 -5 0
1869 -4 0
1872 -3 0
1876 -2 0
1880 -1 0
1884 0 0
1888 0 0
1892 1 0
1896 1 0
1900 1 0
1904 0 0
1908 0 0
1912 -1 0
1916 -1 0
1920 -2 0
1924 -3 0
1928 -3 0
1932 -4 0
1936 -4 0
1940 -4 0
1944 -4 0
1948 -3 0
1952 -3 0
1956 -2 0
1959 0 0
end frb_curve_t