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 = 30
|   Segment [0] from curve   26
|      854 samples [  17.. 870]
|     0.139 of the curve [0.003__0.141]
|   Segment [1] from curve   46 (reversed)
|      818 samples [  56.. 873]
|     0.132 of the curve [0.009__0.141]
| Candidate after realignment and trimming:
|   Candidate index = 30
|   Segment [0] from curve   26
|      513 samples [ 183.. 695]
|     0.083 of the curve [0.030__0.113]
|   Segment [1] from curve   46 (reversed)
|      513 samples [ 206.. 718]
|     0.083 of the curve [0.033__0.116]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
4 1 0
8 1 0
12 2 0
16 3 0
20 4 0
23 5 0
27 6 0
31 8 0
35 9 0
39 10 0
42 11 0
46 12 0
50 13 0
54 14 0
58 14 0
62 13 0
66 13 0
70 12 0
74 10 0
77 9 0
81 7 0
84 5 0
88 3 0
91 0 0
94 -2 0
97 -4 0
101 -7 0
104 -9 0
107 -12 0
110 -14 0
114 -16 0
117 -18 0
121 -20 0
124 -21 0
128 -23 0
132 -24 0
136 -25 0
140 -26 0
144 -26 0
148 -27 0
152 -27 0
156 -27 0
160 -27 0
164 -27 0
168 -27 0
172 -26 0
176 -26 0
179 -25 0
183 -25 0
187 -24 0
191 -23 0
195 -23 0
199 -23 0
203 -22 0
207 -22 0
211 -22 0
215 -22 0
219 -22 0
223 -22 0
227 -22 0
231 -22 0
235 -23 0
239 -23 0
243 -23 0
247 -23 0
251 -24 0
255 -24 0
259 -25 0
263 -26 0
267 -26 0
271 -27 0
275 -28 0
279 -29 0
282 -30 0
286 -31 0
290 -32 0
294 -33 0
298 -33 0
302 -33 0
306 -33 0
310 -32 0
314 -31 0
318 -30 0
322 -29 0
325 -27 0
329 -26 0
333 -24 0
336 -22 0
340 -20 0
343 -18 0
346 -15 0
349 -13 0
353 -11 0
356 -8 0
359 -6 0
362 -3 0
365 -1 0
368 2 0
371 4 0
374 7 0
378 9 0
381 12 0
384 14 0
387 17 0
390 19 0
393 22 0
396 24 0
400 27 0
403 29 0
406 32 0
409 34 0
412 37 0
416 39 0
419 41 0
422 43 0
426 45 0
430 46 0
433 48 0
437 50 0
441 51 0
444 53 0
448 54 0
452 55 0
456 57 0
459 58 0
463 59 0
467 60 0
471 62 0
475 63 0
478 64 0
482 66 0
486 67 0
490 69 0
493 70 0
497 71 0
501 73 0
505 74 0
509 75 0
513 75 0
517 76 0
521 77 0
524 77 0
528 77 0
532 77 0
536 77 0
540 77 0
544 77 0
548 77 0
552 77 0
556 77 0
560 77 0
564 77 0
568 78 0
572 78 0
576 78 0
580 78 0
584 79 0
588 79 0
592 80 0
596 81 0
600 81 0
604 82 0
608 83 0
612 83 0
616 84 0
620 84 0
624 84 0
628 84 0
632 83 0
636 83 0
640 82 0
644 82 0
648 81 0
652 80 0
656 80 0
660 79 0
664 79 0
668 78 0
672 78 0
676 77 0
680 77 0
684 77 0
688 77 0
692 77 0
696 78 0
700 78 0
703 79 0
707 80 0
711 81 0
715 82 0
719 83 0
723 84 0
727 84 0
731 85 0
735 85 0
739 86 0
743 86 0
747 86 0
751 86 0
755 86 0
759 85 0
763 85 0
767 85 0
771 85 0
775 84 0
779 84 0
783 84 0
787 83 0
791 83 0
795 82 0
799 82 0
803 82 0
807 81 0
811 81 0
815 81 0
819 81 0
823 81 0
827 81 0
830 82 0
834 82 0
838 83 0
842 84 0
846 84 0
850 85 0
854 87 0
858 88 0
862 89 0
865 90 0
869 91 0
873 92 0
877 93 0
881 94 0
885 96 0
888 97 0
892 98 0
896 98 0
900 99 0
904 100 0
908 101 0
912 102 0
916 103 0
920 103 0
924 104 0
928 104 0
932 104 0
936 105 0
940 105 0
944 105 0
948 105 0
952 105 0
956 105 0
960 104 0
964 104 0
968 104 0
972 103 0
976 103 0
980 102 0
983 101 0
987 100 0
991 99 0
995 98 0
999 97 0
1003 96 0
1006 95 0
1010 94 0
1014 92 0
1018 91 0
1022 90 0
1026 89 0
1030 88 0
1033 87 0
1037 86 0
1041 85 0
1045 85 0
1049 84 0
1053 83 0
1057 82 0
1061 82 0
1065 81 0
1069 80 0
1073 79 0
1076 78 0
1080 77 0
1084 75 0
1088 74 0
1092 73 0
1095 71 0
1099 70 0
1103 69 0
1107 68 0
1111 67 0
1115 67 0
1119 66 0
1123 66 0
1127 66 0
1131 66 0
1135 66 0
1139 67 0
1143 67 0
1147 68 0
1151 69 0
1154 69 0
1158 70 0
1162 71 0
1166 72 0
1170 72 0
1174 73 0
1178 74 0
1182 75 0
1186 75 0
1190 76 0
1194 77 0
1198 78 0
1202 79 0
1205 80 0
1209 80 0
1213 81 0
1217 81 0
1221 82 0
1225 82 0
1229 81 0
1233 81 0
1237 80 0
1241 80 0
1245 79 0
1249 78 0
1253 78 0
1257 78 0
1261 78 0
1265 78 0
1269 78 0
1273 79 0
1277 80 0
1281 81 0
1285 82 0
1289 83 0
1292 84 0
1296 85 0
1300 86 0
1304 86 0
1308 87 0
1312 88 0
1316 89 0
1320 89 0
1324 89 0
1328 89 0
1332 89 0
1336 88 0
1340 87 0
1343 86 0
1347 85 0
1351 83 0
1354 81 0
1357 78 0
1361 76 0
1364 73 0
1367 70 0
1369 68 0
1372 65 0
1376 63 0
1379 60 0
1382 58 0
1386 56 0
1389 54 0
1393 53 0
1397 52 0
1401 51 0
1405 50 0
1409 49 0
1412 48 0
1416 48 0
1420 47 0
1424 46 0
1428 45 0
1432 44 0
1436 43 0
1439 41 0
1443 40 0
1447 38 0
1450 36 0
1454 35 0
1458 33 0
1462 32 0
1465 31 0
1469 30 0
1473 28 0
1477 27 0
1481 27 0
1485 26 0
1489 25 0
1493 24 0
1497 24 0
1501 24 0
1505 24 0
1509 24 0
1513 24 0
1517 25 0
1520 26 0
1524 27 0
1528 28 0
1532 29 0
1536 30 0
1540 31 0
1544 32 0
1547 33 0
1551 34 0
1555 35 0
1559 36 0
1563 37 0
1567 37 0
1571 38 0
1575 38 0
1579 38 0
1583 38 0
1587 38 0
1591 38 0
1595 37 0
1599 36 0
1603 36 0
1607 34 0
1610 33 0
1614 32 0
1618 30 0
1621 28 0
1625 27 0
1629 25 0
1632 23 0
1636 21 0
1639 19 0
1643 18 0
1646 16 0
1650 14 0
1654 13 0
1658 12 0
1662 11 0
1666 11 0
1670 10 0
1674 10 0
1678 10 0
1682 11 0
1686 11 0
1690 12 0
1693 13 0
1697 14 0
1701 15 0
1705 16 0
1709 17 0
1713 19 0
1716 20 0
1720 21 0
1724 22 0
1728 24 0
1732 25 0
1735 26 0
1739 28 0
1743 29 0
1747 30 0
1750 32 0
1754 33 0
1758 35 0
1761 36 0
1765 38 0
1769 39 0
1773 41 0
1776 42 0
1780 44 0
1784 45 0
1788 47 0
1791 48 0
1795 49 0
1799 51 0
1803 52 0
1807 52 0
1811 53 0
1815 53 0
1819 54 0
1823 54 0
1827 54 0
1831 53 0
1834 53 0
1838 52 0
1842 52 0
1846 51 0
1850 50 0
1854 49 0
1858 48 0
1862 46 0
1866 45 0
1869 44 0
1873 42 0
1876 40 0
1880 38 0
1883 35 0
1886 33 0
1889 30 0
1892 28 0
1895 25 0
1898 23 0
1901 20 0
1905 18 0
1908 15 0
1911 13 0
1915 11 0
1918 10 0
1922 8 0
1926 7 0
1930 5 0
1933 4 0
1937 3 0
1941 2 0
1945 1 0
1949 0 0
end frb_curve_t