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 = 44
|   Segment [0] from curve   76
|      857 samples [ 485..1341]
|     0.145 of the curve [0.082__0.227]
|   Segment [1] from curve   91 (reversed)
|      850 samples [4159..5008]
|     0.120 of the curve [0.589__0.709]
| Candidate after realignment and trimming:
|   Candidate index = 44
|   Segment [0] from curve   76
|      513 samples [ 527..1039]
|     0.087 of the curve [0.089__0.176]
|   Segment [1] from curve   91 (reversed)
|      513 samples [4462..4974]
|     0.073 of the curve [0.632__0.705]
| 
| 
| 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 -2 0
24 -2 0
28 -3 0
32 -3 0
36 -3 0
40 -3 0
44 -3 0
48 -2 0
52 -2 0
56 -1 0
60 0 0
63 1 0
67 2 0
71 3 0
75 4 0
79 5 0
83 6 0
87 7 0
90 8 0
94 10 0
98 11 0
102 13 0
105 15 0
109 17 0
112 18 0
116 20 0
119 22 0
123 24 0
126 26 0
130 28 0
133 29 0
137 31 0
141 32 0
145 33 0
149 33 0
153 33 0
157 33 0
161 33 0
165 32 0
169 32 0
173 31 0
177 31 0
181 30 0
185 30 0
189 29 0
193 29 0
197 30 0
201 31 0
205 31 0
208 33 0
212 34 0
216 35 0
220 37 0
223 38 0
227 39 0
231 41 0
235 42 0
239 43 0
243 43 0
247 44 0
251 44 0
255 45 0
259 45 0
263 45 0
267 45 0
271 45 0
275 45 0
279 46 0
283 46 0
287 46 0
291 46 0
295 46 0
298 47 0
302 47 0
306 47 0
310 47 0
314 47 0
318 47 0
322 47 0
326 47 0
330 47 0
334 46 0
338 46 0
342 46 0
346 45 0
350 45 0
354 45 0
358 44 0
362 44 0
366 44 0
370 44 0
374 44 0
378 44 0
382 44 0
386 45 0
390 46 0
394 46 0
398 48 0
402 49 0
405 51 0
409 52 0
413 54 0
416 56 0
419 58 0
423 60 0
426 63 0
430 65 0
433 67 0
437 68 0
440 70 0
444 72 0
447 74 0
451 75 0
455 76 0
459 78 0
462 79 0
466 81 0
470 82 0
474 83 0
478 84 0
482 85 0
486 85 0
490 86 0
494 86 0
498 86 0
502 86 0
506 86 0
509 85 0
513 84 0
517 83 0
521 82 0
525 80 0
528 79 0
532 77 0
536 76 0
540 75 0
544 74 0
548 73 0
552 73 0
556 72 0
560 72 0
564 72 0
568 72 0
572 72 0
576 72 0
580 72 0
584 72 0
588 73 0
592 73 0
595 74 0
599 75 0
603 76 0
607 77 0
611 78 0
615 79 0
619 80 0
623 81 0
627 81 0
631 82 0
635 82 0
638 83 0
642 83 0
646 83 0
650 82 0
654 82 0
658 81 0
662 81 0
666 80 0
670 80 0
674 79 0
678 79 0
682 78 0
686 78 0
690 77 0
694 76 0
698 75 0
702 74 0
706 73 0
709 72 0
713 70 0
717 69 0
721 67 0
724 66 0
728 64 0
732 63 0
736 62 0
739 61 0
743 60 0
747 59 0
751 58 0
755 57 0
759 56 0
763 55 0
767 54 0
771 53 0
774 53 0
778 52 0
782 52 0
786 51 0
790 51 0
794 51 0
798 51 0
802 51 0
806 50 0
810 50 0
814 50 0
818 49 0
822 49 0
826 48 0
830 48 0
834 47 0
838 46 0
842 46 0
846 45 0
850 45 0
854 44 0
858 44 0
862 43 0
866 42 0
870 42 0
874 41 0
878 40 0
881 39 0
885 38 0
889 36 0
893 35 0
896 33 0
900 32 0
904 30 0
907 29 0
911 27 0
915 26 0
919 24 0
923 23 0
926 22 0
930 21 0
934 21 0
938 20 0
942 20 0
946 19 0
950 19 0
954 19 0
958 18 0
962 18 0
966 18 0
970 18 0
974 18 0
978 18 0
982 18 0
986 18 0
990 18 0
994 18 0
998 18 0
1002 18 0
1006 19 0
1010 19 0
1014 19 0
1018 20 0
1022 21 0
1026 22 0
1030 23 0
1034 24 0
1037 25 0
1041 26 0
1045 27 0
1049 28 0
1053 29 0
1057 29 0
1061 30 0
1065 31 0
1069 31 0
1073 32 0
1077 32 0
1081 32 0
1085 33 0
1089 33 0
1093 33 0
1097 33 0
1101 33 0
1105 33 0
1109 33 0
1113 33 0
1117 33 0
1121 32 0
1125 32 0
1129 31 0
1132 31 0
1136 30 0
1140 29 0
1144 29 0
1148 28 0
1152 28 0
1156 27 0
1160 26 0
1164 26 0
1168 25 0
1172 24 0
1176 23 0
1180 22 0
1184 21 0
1187 20 0
1191 19 0
1195 18 0
1199 17 0
1203 16 0
1207 15 0
1211 14 0
1215 14 0
1219 14 0
1223 14 0
1227 15 0
1230 16 0
1234 17 0
1238 19 0
1242 20 0
1245 22 0
1249 23 0
1253 25 0
1257 26 0
1261 26 0
1265 26 0
1269 26 0
1273 25 0
1276 23 0
1280 22 0
1283 20 0
1287 17 0
1290 15 0
1293 13 0
1297 11 0
1300 9 0
1304 8 0
1308 7 0
1312 7 0
1316 7 0
1320 7 0
1324 8 0
1328 8 0
1332 9 0
1336 10 0
1340 11 0
1344 12 0
1347 12 0
1351 13 0
1355 13 0
1359 13 0
1363 13 0
1367 13 0
1371 13 0
1375 13 0
1379 13 0
1383 13 0
1387 13 0
1391 13 0
1395 13 0
1399 13 0
1403 13 0
1407 13 0
1411 13 0
1415 12 0
1419 12 0
1423 11 0
1427 10 0
1431 10 0
1435 9 0
1439 9 0
1443 8 0
1447 8 0
1451 9 0
1455 9 0
1459 9 0
1463 10 0
1467 11 0
1471 12 0
1475 13 0
1478 14 0
1482 15 0
1486 16 0
1490 17 0
1494 19 0
1498 20 0
1501 21 0
1505 22 0
1509 24 0
1513 25 0
1516 27 0
1520 29 0
1524 30 0
1527 32 0
1531 34 0
1534 36 0
1538 37 0
1541 39 0
1545 41 0
1549 43 0
1552 44 0
1556 46 0
1560 48 0
1563 49 0
1567 51 0
1570 53 0
1574 55 0
1577 57 0
1581 58 0
1585 60 0
1589 61 0
1592 62 0
1596 63 0
1600 63 0
1604 63 0
1608 63 0
1612 62 0
1616 61 0
1620 60 0
1624 59 0
1628 58 0
1632 57 0
1635 56 0
1639 54 0
1643 53 0
1647 52 0
1651 51 0
1655 50 0
1658 49 0
1662 48 0
1666 48 0
1670 47 0
1674 47 0
1678 46 0
1682 46 0
1686 45 0
1690 45 0
1694 45 0
1698 44 0
1702 44 0
1706 44 0
1710 43 0
1714 43 0
1718 42 0
1722 41 0
1726 40 0
1730 40 0
1734 39 0
1737 38 0
1741 37 0
1745 36 0
1749 35 0
1753 34 0
1757 33 0
1761 32 0
1765 31 0
1769 30 0
1772 29 0
1776 28 0
1780 27 0
1784 26 0
1788 25 0
1792 24 0
1796 23 0
1799 22 0
1803 21 0
1807 20 0
1811 19 0
1815 18 0
1819 17 0
1823 16 0
1827 15 0
1830 14 0
1834 13 0
1838 12 0
1842 11 0
1846 10 0
1850 10 0
1854 9 0
1858 8 0
1862 7 0
1866 7 0
1870 6 0
1874 5 0
1878 4 0
1881 4 0
1885 3 0
1889 2 0
1893 2 0
1897 1 0
1901 1 0
1905 0 0
1909 0 0
1913 0 0
1917 0 0
1921 0 0
1925 0 0
1929 0 0
1933 0 0
1937 0 0
1941 0 0
1945 0 0
1949 0 0
1953 0 0
1957 0 0
1961 -1 0
1965 -1 0
1969 -1 0
1973 -1 0
1977 -1 0
1981 -1 0
1985 0 0
1989 0 0
end frb_curve_t