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 = 46
|   Segment [0] from curve   89
|      600 samples [4095..4694]
|     0.089 of the curve [0.605__0.693]
|   Segment [1] from curve  107 (reversed)
|      600 samples [4257..4856]
|     0.066 of the curve [0.468__0.534]
| Candidate after realignment and trimming:
|   Candidate index = 46
|   Segment [0] from curve   89
|      513 samples [4138..4650]
|     0.076 of the curve [0.611__0.686]
|   Segment [1] from curve  107 (reversed)
|      513 samples [4301..4813]
|     0.056 of the curve [0.473__0.530]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 1 0
12 2 0
16 2 0
20 2 0
24 2 0
28 3 0
32 3 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 8 0
83 8 0
87 8 0
91 8 0
95 8 0
99 7 0
103 6 0
107 6 0
111 4 0
115 3 0
118 1 0
122 -1 0
125 -3 0
128 -5 0
131 -8 0
134 -11 0
137 -14 0
140 -16 0
143 -19 0
146 -22 0
149 -24 0
153 -26 0
156 -28 0
160 -29 0
164 -30 0
168 -31 0
172 -31 0
176 -32 0
180 -32 0
184 -33 0
188 -33 0
192 -34 0
196 -35 0
199 -36 0
203 -38 0
207 -39 0
210 -41 0
214 -43 0
217 -45 0
221 -47 0
224 -49 0
228 -51 0
232 -52 0
235 -54 0
239 -56 0
242 -57 0
246 -59 0
250 -61 0
253 -63 0
257 -65 0
260 -66 0
264 -68 0
267 -70 0
271 -72 0
275 -73 0
279 -75 0
282 -76 0
286 -77 0
290 -78 0
294 -79 0
298 -79 0
302 -80 0
306 -80 0
310 -81 0
314 -81 0
318 -82 0
322 -82 0
326 -82 0
330 -83 0
334 -84 0
338 -84 0
341 -85 0
345 -86 0
349 -87 0
353 -89 0
357 -90 0
360 -92 0
364 -94 0
367 -96 0
370 -98 0
374 -100 0
377 -103 0
380 -105 0
384 -107 0
387 -110 0
390 -112 0
393 -114 0
396 -117 0
400 -119 0
403 -122 0
406 -124 0
409 -126 0
413 -128 0
417 -130 0
420 -132 0
424 -133 0
428 -134 0
432 -135 0
436 -135 0
440 -135 0
444 -135 0
448 -135 0
452 -134 0
455 -133 0
459 -132 0
463 -131 0
467 -130 0
471 -128 0
475 -127 0
478 -127 0
482 -126 0
486 -125 0
490 -125 0
494 -125 0
498 -125 0
502 -125 0
506 -125 0
510 -125 0
514 -125 0
518 -125 0
522 -125 0
526 -126 0
530 -126 0
534 -127 0
538 -127 0
542 -127 0
546 -127 0
550 -127 0
554 -127 0
558 -126 0
562 -125 0
566 -123 0
569 -121 0
573 -120 0
576 -118 0
580 -116 0
583 -114 0
587 -112 0
590 -110 0
594 -108 0
598 -107 0
601 -105 0
605 -103 0
609 -102 0
612 -100 0
616 -99 0
620 -97 0
623 -95 0
626 -93 0
630 -90 0
633 -88 0
636 -86 0
639 -83 0
643 -81 0
646 -79 0
650 -78 0
654 -77 0
658 -75 0
662 -75 0
666 -74 0
670 -74 0
674 -74 0
678 -74 0
682 -74 0
686 -75 0
690 -75 0
694 -76 0
697 -76 0
701 -76 0
705 -77 0
709 -77 0
713 -77 0
717 -77 0
721 -77 0
725 -77 0
729 -76 0
733 -75 0
737 -74 0
741 -73 0
745 -72 0
749 -72 0
753 -71 0
757 -70 0
761 -69 0
765 -69 0
769 -68 0
773 -68 0
776 -67 0
780 -67 0
784 -67 0
788 -66 0
792 -66 0
796 -66 0
800 -65 0
804 -65 0
808 -65 0
812 -65 0
816 -65 0
820 -65 0
824 -65 0
828 -65 0
832 -65 0
836 -65 0
840 -64 0
844 -64 0
848 -63 0
852 -62 0
856 -60 0
859 -58 0
863 -57 0
866 -55 0
870 -53 0
874 -51 0
877 -50 0
881 -48 0
885 -46 0
888 -45 0
892 -43 0
896 -42 0
899 -40 0
902 -37 0
905 -35 0
908 -32 0
911 -29 0
913 -25 0
915 -22 0
917 -19 0
919 -15 0
921 -12 0
923 -8 0
926 -5 0
928 -2 0
931 1 0
934 4 0
937 6 0
940 9 0
944 11 0
947 13 0
951 14 0
955 16 0
958 17 0
962 18 0
966 19 0
970 19 0
974 20 0
978 21 0
982 21 0
986 21 0
990 22 0
994 22 0
998 21 0
1002 21 0
1006 21 0
1010 20 0
1014 19 0
1018 18 0
1021 17 0
1025 16 0
1029 15 0
1033 13 0
1037 12 0
1041 11 0
1045 11 0
1048 10 0
1052 9 0
1056 9 0
1060 9 0
1064 9 0
1068 9 0
1072 9 0
1076 10 0
1080 11 0
1084 12 0
1088 13 0
1092 13 0
1096 14 0
1100 15 0
1104 15 0
1108 16 0
1112 16 0
1116 16 0
1120 16 0
1124 16 0
1128 16 0
1132 16 0
1136 15 0
1140 15 0
1144 14 0
1148 13 0
1151 12 0
1155 11 0
1159 10 0
1163 9 0
1167 8 0
1170 6 0
1174 5 0
1178 3 0
1181 1 0
1185 0 0
1189 -2 0
1192 -3 0
1196 -5 0
1200 -5 0
1204 -6 0
1208 -6 0
1212 -6 0
1216 -6 0
1220 -5 0
1224 -5 0
1228 -5 0
1232 -5 0
1236 -5 0
1240 -5 0
1244 -6 0
1248 -6 0
1252 -7 0
1256 -7 0
1260 -8 0
1264 -8 0
1268 -8 0
1272 -8 0
1276 -8 0
1280 -8 0
1284 -8 0
1288 -8 0
1292 -8 0
1296 -7 0
1300 -7 0
1304 -6 0
1308 -5 0
1312 -4 0
1315 -3 0
1319 -2 0
1323 -2 0
1327 -1 0
1331 0 0
1335 0 0
1339 0 0
1343 1 0
1347 1 0
1351 2 0
1355 3 0
1359 3 0
1363 4 0
1367 5 0
1371 6 0
1374 7 0
1378 8 0
1382 10 0
1386 11 0
1389 13 0
1393 14 0
1397 16 0
1400 18 0
1404 19 0
1408 20 0
1412 21 0
1416 22 0
1420 23 0
1424 23 0
1428 23 0
1432 23 0
1436 23 0
1440 23 0
1444 23 0
1448 23 0
1452 23 0
1456 22 0
1460 22 0
1463 22 0
1467 21 0
1471 20 0
1475 19 0
1479 18 0
1483 17 0
1487 15 0
1490 14 0
1494 13 0
1498 11 0
1502 10 0
1505 8 0
1509 7 0
1513 6 0
1517 4 0
1521 3 0
1524 3 0
1528 2 0
1532 1 0
1536 1 0
1540 0 0
1544 0 0
1548 0 0
1552 0 0
1556 -1 0
1560 -1 0
1564 -1 0
1568 -2 0
1572 -2 0
1576 -3 0
1580 -3 0
1584 -4 0
1588 -4 0
1592 -5 0
1596 -5 0
1600 -6 0
1604 -7 0
1608 -7 0
1612 -8 0
1616 -8 0
1620 -9 0
1624 -9 0
1628 -9 0
1632 -9 0
1636 -9 0
1640 -9 0
1644 -9 0
1648 -8 0
1652 -8 0
1656 -7 0
1660 -6 0
1663 -6 0
1667 -5 0
1671 -4 0
1675 -3 0
1679 -3 0
1683 -2 0
1687 -1 0
1691 -1 0
1695 0 0
1699 0 0
1703 0 0
1707 0 0
1711 -1 0
1715 -1 0
1719 -2 0
1723 -3 0
1727 -4 0
1731 -5 0
1734 -6 0
1738 -7 0
1742 -7 0
1746 -8 0
1750 -9 0
1754 -10 0
1758 -10 0
1762 -10 0
1766 -10 0
1770 -10 0
1774 -10 0
1778 -9 0
1782 -8 0
1786 -7 0
1789 -6 0
1793 -5 0
1797 -4 0
1801 -3 0
1805 -2 0
1809 -1 0
1813 0 0
1817 1 0
1821 1 0
1825 2 0
1829 2 0
1833 3 0
1836 3 0
1840 4 0
1844 4 0
1848 5 0
1852 5 0
1856 6 0
1860 6 0
1864 6 0
1868 7 0
1872 6 0
1876 6 0
1880 6 0
1884 5 0
1888 4 0
1892 4 0
1896 3 0
1900 2 0
1904 1 0
1908 1 0
1912 0 0
1916 -1 0
1920 -1 0
1924 -1 0
1928 -1 0
1932 -1 0
1936 -1 0
1940 -1 0
1944 0 0
1948 0 0
end frb_curve_t