begin frb_curve_t (format of 2004-04-30)
| Input candidate set:
| Last edited on 2005-01-01 23:36:33 by stolfi
| 
| True and recognizable candidates
| Essentially entered by hand
| Some of them refined with PZRefineCands
| 
| 
| frb_analyze
|   maxShift =    0.847 pixels
|   nSamples = 513
| 
| Input candidate:
|   Candidate index = 26
|   Segment [0] from curve    8
|      934 samples [5212..6145]
|     0.138 of the curve [0.769__0.907]
|   Segment [1] from curve   19 (reversed)
|      930 samples [3181..4110]
|     0.179 of the curve [0.611__0.789]
| Candidate after realignment and trimming:
|   Candidate index = 26
|   Segment [0] from curve    8
|      513 samples [5291..5803]
|     0.076 of the curve [0.781__0.856]
|   Segment [1] from curve   19 (reversed)
|      513 samples [3520..4032]
|     0.099 of the curve [0.676__0.774]
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 0 0
8 0 0
12 1 0
16 1 0
20 1 0
24 1 0
28 2 0
32 2 0
36 3 0
40 4 0
43 5 0
47 7 0
51 8 0
55 10 0
58 12 0
62 13 0
65 15 0
69 17 0
72 19 0
76 21 0
79 23 0
83 25 0
86 27 0
90 29 0
94 30 0
97 31 0
101 32 0
105 32 0
109 32 0
113 32 0
117 31 0
121 30 0
125 29 0
129 28 0
133 27 0
136 26 0
140 24 0
144 23 0
148 22 0
152 21 0
156 20 0
160 20 0
164 19 0
167 18 0
171 17 0
175 17 0
179 16 0
183 15 0
187 15 0
191 15 0
195 14 0
199 14 0
203 14 0
207 15 0
211 15 0
215 16 0
219 16 0
223 17 0
227 18 0
231 19 0
235 20 0
239 21 0
242 22 0
246 23 0
250 24 0
254 26 0
258 27 0
261 28 0
265 30 0
269 31 0
273 33 0
276 34 0
280 35 0
284 37 0
288 38 0
292 39 0
295 40 0
299 40 0
303 41 0
307 41 0
311 41 0
315 41 0
319 40 0
323 40 0
327 39 0
331 38 0
335 36 0
339 35 0
342 34 0
346 32 0
350 31 0
353 29 0
357 28 0
361 26 0
365 25 0
369 24 0
373 23 0
376 23 0
380 23 0
384 23 0
388 23 0
392 24 0
396 24 0
400 25 0
404 26 0
408 27 0
412 28 0
416 29 0
420 30 0
423 31 0
427 32 0
431 33 0
435 34 0
439 34 0
443 34 0
447 35 0
451 34 0
455 34 0
459 34 0
463 33 0
467 32 0
471 32 0
475 31 0
479 30 0
483 29 0
487 28 0
491 28 0
495 27 0
499 27 0
503 26 0
506 26 0
510 26 0
514 26 0
518 26 0
522 27 0
526 27 0
530 27 0
534 27 0
538 27 0
542 27 0
546 26 0
550 26 0
554 26 0
558 27 0
562 27 0
566 27 0
570 28 0
574 29 0
578 30 0
582 31 0
586 32 0
590 33 0
593 34 0
597 35 0
601 36 0
605 37 0
609 37 0
613 38 0
617 38 0
621 38 0
625 38 0
629 38 0
633 38 0
637 37 0
641 37 0
645 36 0
649 35 0
653 34 0
657 33 0
660 32 0
664 31 0
668 30 0
672 28 0
676 27 0
680 26 0
683 25 0
687 24 0
691 24 0
695 23 0
699 23 0
703 22 0
707 22 0
711 22 0
715 21 0
719 21 0
723 20 0
727 20 0
731 19 0
735 19 0
739 19 0
743 18 0
747 18 0
751 18 0
755 17 0
759 17 0
763 17 0
767 16 0
771 16 0
775 15 0
779 14 0
783 14 0
787 13 0
791 13 0
795 12 0
799 12 0
803 12 0
807 12 0
811 13 0
815 13 0
819 13 0
823 14 0
827 14 0
830 15 0
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838 16 0
842 16 0
846 17 0
850 18 0
854 19 0
858 20 0
862 21 0
866 22 0
870 23 0
873 24 0
877 25 0
881 26 0
885 27 0
889 28 0
893 28 0
897 29 0
901 29 0
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909 30 0
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921 30 0
925 31 0
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937 32 0
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949 32 0
953 32 0
957 31 0
961 31 0
965 30 0
969 29 0
973 29 0
976 28 0
980 27 0
984 26 0
988 25 0
992 25 0
996 24 0
1000 24 0
1004 23 0
1008 23 0
1012 23 0
1016 22 0
1020 22 0
1024 22 0
1028 21 0
1032 21 0
1036 20 0
1040 20 0
1044 19 0
1048 18 0
1052 17 0
1056 16 0
1059 16 0
1063 15 0
1067 15 0
1071 14 0
1075 14 0
1079 14 0
1083 14 0
1087 13 0
1091 13 0
1095 13 0
1099 13 0
1103 13 0
1107 13 0
1111 13 0
1115 13 0
1119 12 0
1123 12 0
1127 11 0
1131 11 0
1135 10 0
1139 9 0
1143 8 0
1147 7 0
1150 5 0
1154 4 0
1158 2 0
1161 0 0
1165 -1 0
1169 -3 0
1172 -5 0
1176 -7 0
1179 -9 0
1183 -10 0
1186 -12 0
1190 -14 0
1194 -15 0
1198 -17 0
1201 -18 0
1205 -19 0
1209 -20 0
1213 -21 0
1217 -21 0
1221 -22 0
1225 -23 0
1229 -24 0
1233 -25 0
1237 -26 0
1240 -26 0
1244 -27 0
1248 -28 0
1252 -29 0
1256 -29 0
1260 -30 0
1264 -30 0
1268 -30 0
1272 -30 0
1276 -30 0
1280 -30 0
1284 -29 0
1288 -28 0
1292 -26 0
1295 -25 0
1299 -23 0
1302 -20 0
1305 -18 0
1308 -15 0
1311 -13 0
1314 -10 0
1317 -7 0
1320 -4 0
1323 -1 0
1326 1 0
1329 3 0
1332 6 0
1336 7 0
1339 9 0
1343 10 0
1347 11 0
1351 12 0
1355 13 0
1359 13 0
1363 14 0
1367 15 0
1371 16 0
1375 16 0
1379 17 0
1382 19 0
1386 20 0
1390 21 0
1394 22 0
1398 24 0
1401 25 0
1405 26 0
1409 27 0
1413 29 0
1417 29 0
1421 30 0
1425 31 0
1429 31 0
1433 31 0
1437 31 0
1441 30 0
1445 30 0
1448 29 0
1452 29 0
1456 28 0
1460 27 0
1464 27 0
1468 26 0
1472 26 0
1476 25 0
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1484 25 0
1488 24 0
1492 24 0
1496 24 0
1500 24 0
1504 24 0
1508 24 0
1512 24 0
1516 23 0
1520 23 0
1524 22 0
1528 22 0
1532 21 0
1536 21 0
1540 21 0
1544 20 0
1548 20 0
1552 20 0
1556 20 0
1560 20 0
1564 20 0
1568 20 0
1572 20 0
1576 20 0
1580 20 0
1584 20 0
1588 21 0
1592 21 0
1596 22 0
1600 23 0
1603 24 0
1607 25 0
1611 27 0
1615 28 0
1619 29 0
1623 30 0
1627 31 0
1630 31 0
1634 32 0
1638 32 0
1642 33 0
1646 33 0
1650 34 0
1654 34 0
1658 34 0
1662 35 0
1666 35 0
1670 35 0
1674 35 0
1678 35 0
1682 35 0
1686 34 0
1690 34 0
1694 33 0
1698 32 0
1702 32 0
1706 31 0
1710 30 0
1714 29 0
1717 27 0
1721 26 0
1725 25 0
1729 23 0
1732 22 0
1736 20 0
1740 19 0
1743 17 0
1747 16 0
1751 14 0
1755 13 0
1759 13 0
1763 12 0
1767 12 0
1771 11 0
1775 12 0
1779 12 0
1783 12 0
1787 12 0
1791 13 0
1795 13 0
1799 14 0
1803 14 0
1807 14 0
1811 15 0
1815 15 0
1819 15 0
1823 16 0
1826 16 0
1830 16 0
1834 16 0
1838 16 0
1842 16 0
1846 16 0
1850 16 0
1854 15 0
1858 14 0
1862 14 0
1866 13 0
1870 12 0
1874 11 0
1878 10 0
1882 10 0
1886 9 0
1890 8 0
1894 8 0
1898 7 0
1902 6 0
1906 6 0
1910 5 0
1913 4 0
1917 3 0
1921 2 0
1925 1 0
1929 0 0
1933 -1 0
1937 -2 0
1941 -2 0
1945 -3 0
1949 -4 0
1952 -4 0
1956 -4 0
1960 -4 0
1964 -4 0
1968 -4 0
1972 -4 0
1976 -3 0
1980 -2 0
1984 -2 0
1988 -1 0
1992 0 0
end frb_curve_t