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 = 21
|   Segment [0] from curve   45
|     1037 samples [4296..5332]
|     0.185 of the curve [0.766__0.950]
|   Segment [1] from curve   46 (reversed)
|     1014 samples [2979..3992]
|     0.164 of the curve [0.481__0.645]
| Candidate after realignment and trimming:
|   Candidate index = 21
|   Segment [0] from curve   45
|      513 samples [4740..5252]
|     0.091 of the curve [0.845__0.936]
|   Segment [1] from curve   46 (reversed)
|      513 samples [3044..3556]
|     0.083 of the curve [0.492__0.575]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 0 0
8 1 0
12 1 0
16 2 0
20 3 0
24 4 0
28 4 0
32 5 0
36 5 0
40 5 0
44 6 0
48 6 0
52 6 0
56 6 0
60 6 0
64 7 0
67 8 0
71 9 0
75 11 0
79 12 0
82 14 0
85 16 0
89 19 0
92 21 0
95 24 0
98 26 0
101 29 0
104 31 0
108 33 0
111 36 0
114 38 0
118 40 0
121 42 0
125 43 0
128 45 0
132 47 0
136 49 0
139 51 0
143 52 0
147 54 0
150 55 0
154 56 0
158 57 0
162 58 0
166 59 0
170 59 0
174 59 0
178 59 0
182 59 0
186 58 0
190 58 0
194 57 0
198 56 0
202 55 0
205 54 0
209 53 0
213 52 0
217 51 0
221 50 0
225 48 0
228 47 0
232 46 0
236 45 0
240 43 0
244 42 0
247 41 0
251 39 0
255 38 0
259 37 0
262 35 0
266 34 0
270 33 0
274 31 0
277 30 0
281 28 0
284 26 0
288 24 0
291 21 0
294 19 0
297 16 0
300 14 0
303 11 0
306 9 0
310 6 0
313 4 0
316 1 0
319 -1 0
322 -3 0
326 -5 0
329 -8 0
333 -10 0
336 -12 0
340 -13 0
343 -15 0
347 -17 0
350 -19 0
354 -20 0
358 -22 0
361 -24 0
365 -25 0
369 -27 0
373 -28 0
376 -29 0
380 -30 0
384 -31 0
388 -32 0
392 -33 0
396 -34 0
400 -34 0
404 -35 0
408 -35 0
412 -35 0
416 -35 0
420 -35 0
424 -35 0
428 -35 0
432 -35 0
436 -34 0
440 -34 0
444 -33 0
448 -32 0
451 -32 0
455 -31 0
459 -30 0
463 -30 0
467 -29 0
471 -29 0
475 -28 0
479 -28 0
483 -28 0
487 -28 0
491 -28 0
495 -28 0
499 -28 0
503 -29 0
507 -29 0
511 -29 0
515 -29 0
519 -29 0
523 -29 0
527 -29 0
531 -28 0
535 -28 0
539 -28 0
543 -27 0
547 -27 0
551 -26 0
555 -26 0
559 -25 0
563 -25 0
567 -24 0
571 -24 0
575 -23 0
579 -23 0
583 -22 0
587 -21 0
591 -20 0
594 -19 0
598 -18 0
602 -16 0
606 -15 0
609 -13 0
613 -11 0
616 -10 0
620 -8 0
624 -6 0
627 -5 0
631 -3 0
635 -1 0
638 0 0
642 1 0
646 3 0
650 4 0
653 6 0
657 7 0
661 9 0
664 11 0
668 13 0
671 15 0
675 17 0
678 18 0
682 20 0
686 22 0
689 23 0
693 24 0
697 25 0
701 25 0
705 25 0
709 25 0
713 25 0
717 24 0
721 23 0
725 22 0
729 21 0
733 20 0
736 19 0
740 17 0
744 16 0
748 15 0
751 13 0
755 11 0
759 10 0
762 8 0
766 6 0
769 4 0
773 2 0
776 1 0
780 -1 0
783 -3 0
787 -5 0
791 -7 0
794 -8 0
798 -9 0
802 -10 0
806 -11 0
810 -12 0
814 -12 0
818 -12 0
822 -11 0
826 -11 0
830 -10 0
834 -9 0
838 -8 0
841 -7 0
845 -6 0
849 -4 0
853 -3 0
856 -1 0
860 0 0
864 1 0
868 1 0
872 1 0
876 1 0
880 0 0
884 -1 0
888 -2 0
891 -4 0
895 -6 0
898 -8 0
901 -10 0
905 -12 0
908 -14 0
912 -16 0
915 -18 0
919 -20 0
923 -21 0
927 -22 0
930 -23 0
934 -23 0
938 -24 0
942 -24 0
946 -23 0
950 -23 0
954 -22 0
958 -21 0
962 -20 0
966 -19 0
970 -17 0
973 -16 0
977 -14 0
980 -12 0
984 -10 0
987 -7 0
990 -5 0
994 -3 0
997 -1 0
1001 1 0
1004 2 0
1008 4 0
1012 5 0
1015 7 0
1019 9 0
1023 10 0
1026 12 0
1030 14 0
1034 15 0
1037 17 0
1041 18 0
1045 19 0
1049 21 0
1053 22 0
1056 23 0
1060 23 0
1064 24 0
1068 25 0
1072 27 0
1076 28 0
1080 29 0
1083 30 0
1087 31 0
1091 32 0
1095 33 0
1099 34 0
1103 35 0
1107 36 0
1111 37 0
1114 37 0
1118 38 0
1122 39 0
1126 40 0
1130 41 0
1134 42 0
1138 43 0
1142 45 0
1145 46 0
1149 47 0
1153 48 0
1157 48 0
1161 49 0
1165 49 0
1169 49 0
1173 48 0
1177 48 0
1181 47 0
1185 46 0
1189 45 0
1193 44 0
1197 44 0
1200 43 0
1204 43 0
1208 43 0
1212 43 0
1216 43 0
1220 44 0
1224 45 0
1228 46 0
1232 47 0
1236 49 0
1240 50 0
1243 51 0
1247 52 0
1251 53 0
1255 54 0
1259 54 0
1263 54 0
1267 54 0
1271 54 0
1275 53 0
1279 53 0
1283 52 0
1287 51 0
1291 51 0
1295 50 0
1299 50 0
1303 50 0
1307 50 0
1311 50 0
1315 51 0
1319 52 0
1323 52 0
1326 53 0
1330 54 0
1334 54 0
1338 54 0
1342 54 0
1346 54 0
1350 53 0
1354 52 0
1358 51 0
1362 50 0
1366 49 0
1370 48 0
1374 47 0
1377 46 0
1381 45 0
1385 44 0
1389 44 0
1393 43 0
1397 43 0
1401 42 0
1405 42 0
1409 42 0
1413 41 0
1417 41 0
1421 41 0
1425 40 0
1429 39 0
1433 38 0
1437 37 0
1441 36 0
1444 35 0
1448 35 0
1452 34 0
1456 34 0
1460 33 0
1464 33 0
1468 33 0
1472 33 0
1476 34 0
1480 34 0
1484 35 0
1488 36 0
1492 37 0
1496 37 0
1500 38 0
1504 38 0
1508 39 0
1512 39 0
1516 38 0
1520 38 0
1524 38 0
1528 38 0
1532 37 0
1536 37 0
1540 37 0
1544 37 0
1548 37 0
1552 37 0
1556 37 0
1560 38 0
1564 38 0
1568 39 0
1572 40 0
1576 40 0
1579 41 0
1583 42 0
1587 42 0
1591 43 0
1595 43 0
1599 43 0
1603 43 0
1607 42 0
1611 41 0
1615 40 0
1619 39 0
1622 37 0
1626 35 0
1630 33 0
1633 32 0
1637 30 0
1640 28 0
1644 27 0
1648 25 0
1652 24 0
1655 23 0
1659 21 0
1663 20 0
1667 19 0
1671 18 0
1675 18 0
1679 17 0
1683 17 0
1687 16 0
1691 16 0
1695 16 0
1699 16 0
1703 16 0
1707 16 0
1711 16 0
1715 15 0
1718 15 0
1722 13 0
1726 12 0
1730 11 0
1733 9 0
1737 7 0
1741 6 0
1744 4 0
1748 3 0
1752 2 0
1756 1 0
1760 0 0
1764 0 0
1768 -1 0
1772 -1 0
1776 -2 0
1780 -2 0
1784 -2 0
1788 -2 0
1792 -1 0
1796 -1 0
1800 0 0
1804 1 0
1808 1 0
1811 2 0
1815 4 0
1819 5 0
1823 6 0
1827 7 0
1831 8 0
1835 8 0
1839 9 0
1843 10 0
1847 10 0
1851 10 0
1855 10 0
1859 10 0
1863 10 0
1867 9 0
1871 9 0
1874 8 0
1878 8 0
1882 7 0
1886 6 0
1890 5 0
1894 4 0
1898 3 0
1902 2 0
1906 1 0
1910 1 0
1914 0 0
1917 -1 0
1921 -1 0
1925 -1 0
1929 -2 0
1933 -1 0
1937 -1 0
1941 -1 0
1945 -1 0
1949 0 0
1953 0 0
1957 0 0
end frb_curve_t