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 = 15
|   Segment [0] from curve   99
|      574 samples [2222..2795]
|     0.080 of the curve [0.309__0.388]
|   Segment [1] from curve  104 (reversed)
|      565 samples [2567..3131]
|     0.176 of the curve [0.799__0.975]
| Candidate after realignment and trimming:
|   Candidate index = 15
|   Segment [0] from curve   99
|      513 samples [2303..2815]
|     0.071 of the curve [0.320__0.391]
|   Segment [1] from curve  104 (reversed)
|      513 samples [2549..3061]
|     0.160 of the curve [0.794__0.953]
| 
| 
| side = "a"
| 
| 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 -3 0
24 -3 0
28 -4 0
32 -4 0
36 -3 0
40 -3 0
44 -3 0
48 -2 0
51 -1 0
55 0 0
59 2 0
63 3 0
67 4 0
70 6 0
74 8 0
78 9 0
81 11 0
85 12 0
89 14 0
92 15 0
96 16 0
100 18 0
104 19 0
108 20 0
112 21 0
116 22 0
119 22 0
123 23 0
127 24 0
131 24 0
135 25 0
139 25 0
143 25 0
147 26 0
151 26 0
155 27 0
159 27 0
163 27 0
167 28 0
171 28 0
175 28 0
179 28 0
183 28 0
187 28 0
191 28 0
195 27 0
199 27 0
203 26 0
207 25 0
211 25 0
215 24 0
219 23 0
223 23 0
227 22 0
231 21 0
235 21 0
239 21 0
243 21 0
247 20 0
251 21 0
255 21 0
259 21 0
263 22 0
266 22 0
270 23 0
274 24 0
278 25 0
282 26 0
286 26 0
290 27 0
294 28 0
298 28 0
302 28 0
306 29 0
310 29 0
314 29 0
318 28 0
322 28 0
326 28 0
330 27 0
334 27 0
338 26 0
342 25 0
346 25 0
350 25 0
354 24 0
358 24 0
362 24 0
366 23 0
370 23 0
374 23 0
378 22 0
382 22 0
386 22 0
390 21 0
394 21 0
398 21 0
402 21 0
406 21 0
410 21 0
413 22 0
417 23 0
421 24 0
425 26 0
428 27 0
432 29 0
436 31 0
439 33 0
442 35 0
446 37 0
450 39 0
453 40 0
457 42 0
461 43 0
465 44 0
469 45 0
472 46 0
476 47 0
480 48 0
484 50 0
488 51 0
492 52 0
495 53 0
499 54 0
503 55 0
507 55 0
511 56 0
515 56 0
519 56 0
523 56 0
527 55 0
531 54 0
535 53 0
538 51 0
542 50 0
546 48 0
549 46 0
553 44 0
556 42 0
560 41 0
564 39 0
567 38 0
571 37 0
575 36 0
579 36 0
583 35 0
587 35 0
591 35 0
595 35 0
599 35 0
603 35 0
607 35 0
611 35 0
615 35 0
619 35 0
623 34 0
627 34 0
631 33 0
635 32 0
638 30 0
642 29 0
646 27 0
649 25 0
653 24 0
657 22 0
660 20 0
664 18 0
667 17 0
671 15 0
675 14 0
679 13 0
683 12 0
686 11 0
690 10 0
694 9 0
698 8 0
702 7 0
706 7 0
710 6 0
714 5 0
718 4 0
722 3 0
726 2 0
730 1 0
733 0 0
737 0 0
741 -1 0
745 -2 0
749 -2 0
753 -2 0
757 -2 0
761 -2 0
765 -2 0
769 -2 0
773 -2 0
777 -1 0
781 -1 0
785 0 0
789 1 0
793 1 0
797 2 0
801 3 0
805 3 0
809 4 0
813 4 0
817 5 0
821 6 0
824 6 0
828 7 0
832 7 0
836 8 0
840 9 0
844 9 0
848 10 0
852 11 0
856 12 0
860 13 0
864 14 0
867 16 0
871 17 0
875 19 0
878 20 0
882 22 0
885 24 0
889 26 0
893 28 0
896 29 0
900 31 0
904 33 0
907 34 0
911 35 0
915 37 0
919 38 0
923 38 0
927 39 0
931 40 0
935 40 0
939 40 0
943 40 0
947 40 0
951 40 0
954 39 0
958 39 0
962 39 0
966 39 0
970 38 0
974 38 0
978 39 0
982 39 0
986 39 0
990 39 0
994 40 0
998 40 0
1002 40 0
1006 40 0
1010 41 0
1014 41 0
1018 41 0
1022 41 0
1026 42 0
1030 42 0
1034 42 0
1038 43 0
1042 43 0
1046 44 0
1050 44 0
1054 45 0
1058 45 0
1062 45 0
1066 46 0
1070 46 0
1074 46 0
1078 46 0
1082 46 0
1086 46 0
1090 46 0
1094 45 0
1098 45 0
1102 44 0
1106 43 0
1110 42 0
1114 41 0
1117 39 0
1121 38 0
1125 36 0
1128 35 0
1132 33 0
1136 31 0
1139 29 0
1143 27 0
1146 25 0
1149 23 0
1153 21 0
1156 19 0
1160 17 0
1163 15 0
1167 13 0
1170 11 0
1174 10 0
1178 8 0
1181 7 0
1185 6 0
1189 5 0
1193 4 0
1197 3 0
1201 2 0
1205 2 0
1209 2 0
1213 1 0
1217 1 0
1221 2 0
1225 2 0
1229 2 0
1233 3 0
1237 3 0
1241 4 0
1245 5 0
1248 6 0
1252 7 0
1256 8 0
1260 9 0
1264 10 0
1268 12 0
1271 13 0
1275 14 0
1279 16 0
1283 17 0
1286 18 0
1290 19 0
1294 21 0
1298 22 0
1302 22 0
1306 23 0
1310 24 0
1314 24 0
1318 25 0
1322 25 0
1326 26 0
1330 26 0
1334 26 0
1338 27 0
1342 27 0
1346 27 0
1350 27 0
1354 27 0
1358 27 0
1362 27 0
1366 27 0
1370 27 0
1374 27 0
1378 28 0
1382 29 0
1385 29 0
1389 30 0
1393 32 0
1397 33 0
1401 34 0
1404 36 0
1408 37 0
1412 38 0
1416 39 0
1420 40 0
1424 41 0
1428 42 0
1432 42 0
1436 43 0
1440 43 0
1444 43 0
1447 44 0
1451 44 0
1455 44 0
1459 45 0
1463 45 0
1467 45 0
1471 45 0
1475 45 0
1479 45 0
1483 44 0
1487 44 0
1491 43 0
1495 41 0
1499 40 0
1502 38 0
1506 36 0
1509 34 0
1513 32 0
1516 30 0
1520 28 0
1523 26 0
1527 25 0
1531 23 0
1534 22 0
1538 21 0
1542 20 0
1546 19 0
1550 18 0
1554 18 0
1558 17 0
1562 17 0
1566 17 0
1570 18 0
1574 18 0
1578 18 0
1582 19 0
1586 19 0
1590 20 0
1593 21 0
1597 22 0
1601 23 0
1605 24 0
1609 25 0
1613 26 0
1617 27 0
1621 28 0
1625 29 0
1628 29 0
1632 30 0
1636 31 0
1640 32 0
1644 33 0
1648 34 0
1652 35 0
1656 36 0
1660 37 0
1664 37 0
1668 38 0
1671 38 0
1675 39 0
1679 39 0
1683 39 0
1687 40 0
1691 40 0
1695 40 0
1699 40 0
1703 40 0
1707 40 0
1711 40 0
1715 40 0
1719 40 0
1723 40 0
1727 39 0
1731 39 0
1735 39 0
1739 38 0
1743 37 0
1747 36 0
1751 35 0
1755 34 0
1759 32 0
1762 31 0
1766 29 0
1770 28 0
1773 26 0
1777 25 0
1781 23 0
1784 21 0
1788 20 0
1792 18 0
1795 16 0
1799 15 0
1803 14 0
1806 12 0
1810 11 0
1814 10 0
1818 9 0
1822 7 0
1826 6 0
1829 5 0
1833 4 0
1837 3 0
1841 1 0
1845 0 0
1848 -1 0
1852 -2 0
1856 -3 0
1860 -4 0
1864 -5 0
1868 -5 0
1872 -6 0
1876 -6 0
1880 -6 0
1884 -6 0
1888 -6 0
1892 -5 0
1896 -5 0
1900 -4 0
1904 -4 0
1908 -3 0
1912 -3 0
1916 -2 0
1920 -2 0
1924 -2 0
1928 -2 0
1932 -1 0
1936 -1 0
1940 -1 0
1944 -1 0
1948 -2 0
1952 -2 0
1956 -2 0
1960 -2 0
1964 -2 0
1968 -2 0
1972 -2 0
1976 -2 0
1980 -2 0
1984 -1 0
1987 0 0
end frb_curve_t