begin frb_curve_t (format of 2004-04-30)
| Input candidate set:
| Last edited on 2005-01-02 00:20:33 by stolfi
| 
| False candidates
| Generated from ../../std/s/raw.can by swapping segments
| between candidates.
| 
| 
| frb_analyze
|   maxShift =    0.000 pixels
|   nSamples = 513
| 
| Input candidate:
|   Candidate index = 28
|   Segment [0] from curve   43
|      600 samples [3173..3772]
|     0.116 of the curve [0.612__0.727]
|   Segment [1] from curve   46 (reversed)
|      600 samples [ 208.. 807]
|     0.097 of the curve [0.034__0.130]
| Candidate after realignment and trimming:
|   Candidate index = 28
|   Segment [0] from curve   43
|      513 samples [3216..3728]
|     0.099 of the curve [0.620__0.719]
|   Segment [1] from curve   46 (reversed)
|      513 samples [ 252.. 764]
|     0.083 of the curve [0.041__0.123]
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 513
0 0 0
3 3 0
5 6 0
8 9 0
10 12 0
13 15 0
15 19 0
17 22 0
20 25 0
22 28 0
24 32 0
27 35 0
29 38 0
32 41 0
34 44 0
37 47 0
40 49 0
43 52 0
47 54 0
50 56 0
54 58 0
57 60 0
61 61 0
65 63 0
68 65 0
72 66 0
75 68 0
79 70 0
83 72 0
86 73 0
90 75 0
94 77 0
97 78 0
101 80 0
104 82 0
108 84 0
111 86 0
115 87 0
119 89 0
122 91 0
126 93 0
129 95 0
133 97 0
136 99 0
140 100 0
144 102 0
147 103 0
151 104 0
155 105 0
159 105 0
163 106 0
167 106 0
171 106 0
175 106 0
179 107 0
183 107 0
187 106 0
191 106 0
195 106 0
199 106 0
203 106 0
207 105 0
211 105 0
215 104 0
219 103 0
223 102 0
227 102 0
231 101 0
235 100 0
238 99 0
242 98 0
246 97 0
250 96 0
254 95 0
258 94 0
262 94 0
266 93 0
270 93 0
274 92 0
278 92 0
282 92 0
286 91 0
290 91 0
294 90 0
298 90 0
302 89 0
306 89 0
309 88 0
313 87 0
317 86 0
321 85 0
325 84 0
329 83 0
333 82 0
336 81 0
340 79 0
344 78 0
348 77 0
352 76 0
356 75 0
360 74 0
363 73 0
367 72 0
371 71 0
375 70 0
379 69 0
383 68 0
387 67 0
391 66 0
394 65 0
398 64 0
402 63 0
406 62 0
410 61 0
414 60 0
418 59 0
422 58 0
426 57 0
429 56 0
433 55 0
437 54 0
441 53 0
445 52 0
449 51 0
452 50 0
456 48 0
460 47 0
464 45 0
467 44 0
471 42 0
474 40 0
478 38 0
482 37 0
485 35 0
489 33 0
492 31 0
496 29 0
499 28 0
503 26 0
507 25 0
511 23 0
514 22 0
518 21 0
522 20 0
526 20 0
530 19 0
534 19 0
538 19 0
542 19 0
546 19 0
550 20 0
554 20 0
558 21 0
562 22 0
566 23 0
570 23 0
574 24 0
578 25 0
582 25 0
586 25 0
590 26 0
594 26 0
598 26 0
602 26 0
606 26 0
610 26 0
614 26 0
618 26 0
622 27 0
626 27 0
630 27 0
634 28 0
638 28 0
642 28 0
646 29 0
649 29 0
653 30 0
657 30 0
661 31 0
665 32 0
669 32 0
673 33 0
677 34 0
681 35 0
685 35 0
689 36 0
693 37 0
697 38 0
701 38 0
705 39 0
709 39 0
713 40 0
717 40 0
720 41 0
724 41 0
728 42 0
732 42 0
736 43 0
740 43 0
744 44 0
748 45 0
752 46 0
756 46 0
760 47 0
764 48 0
768 49 0
772 49 0
776 50 0
780 50 0
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792 50 0
796 50 0
800 49 0
804 49 0
808 49 0
812 48 0
816 48 0
820 47 0
824 47 0
828 47 0
832 47 0
836 47 0
840 47 0
844 47 0
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851 48 0
855 49 0
859 50 0
863 51 0
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871 52 0
875 53 0
879 54 0
883 55 0
887 55 0
891 55 0
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903 55 0
907 54 0
911 54 0
915 53 0
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930 49 0
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942 47 0
946 46 0
950 45 0
954 45 0
958 44 0
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970 44 0
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978 45 0
982 46 0
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989 48 0
993 49 0
997 50 0
1001 51 0
1005 52 0
1009 53 0
1012 55 0
1016 56 0
1020 57 0
1024 59 0
1027 61 0
1031 62 0
1034 64 0
1038 66 0
1041 68 0
1045 70 0
1048 72 0
1052 74 0
1055 77 0
1058 79 0
1062 81 0
1065 83 0
1068 85 0
1072 87 0
1075 89 0
1079 91 0
1082 93 0
1086 95 0
1089 97 0
1093 99 0
1096 101 0
1099 104 0
1102 106 0
1106 108 0
1109 111 0
1112 113 0
1116 115 0
1119 117 0
1123 119 0
1126 120 0
1130 122 0
1134 123 0
1138 125 0
1142 126 0
1145 127 0
1149 127 0
1153 128 0
1157 129 0
1161 129 0
1165 130 0
1169 130 0
1173 131 0
1177 131 0
1181 131 0
1185 131 0
1189 131 0
1193 131 0
1197 131 0
1201 131 0
1205 131 0
1209 130 0
1213 130 0
1217 130 0
1221 129 0
1225 129 0
1229 129 0
1233 129 0
1237 128 0
1241 128 0
1245 128 0
1249 128 0
1253 127 0
1257 127 0
1261 126 0
1265 126 0
1269 126 0
1273 125 0
1277 125 0
1281 124 0
1285 124 0
1289 123 0
1293 123 0
1297 123 0
1301 123 0
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1309 123 0
1313 123 0
1317 124 0
1321 124 0
1325 125 0
1329 125 0
1333 126 0
1336 127 0
1340 127 0
1344 128 0
1348 129 0
1352 129 0
1356 130 0
1360 130 0
1364 130 0
1368 130 0
1372 129 0
1376 129 0
1380 128 0
1384 126 0
1388 125 0
1391 124 0
1395 122 0
1399 121 0
1402 119 0
1406 118 0
1410 117 0
1414 115 0
1418 114 0
1421 113 0
1425 111 0
1429 110 0
1433 109 0
1436 107 0
1440 106 0
1444 105 0
1448 103 0
1451 102 0
1455 101 0
1459 100 0
1463 99 0
1467 98 0
1471 97 0
1475 96 0
1479 95 0
1482 94 0
1486 93 0
1490 92 0
1494 91 0
1498 90 0
1502 90 0
1506 89 0
1510 89 0
1514 88 0
1518 88 0
1522 87 0
1526 87 0
1530 87 0
1534 86 0
1538 86 0
1542 86 0
1546 85 0
1550 85 0
1554 84 0
1558 84 0
1562 83 0
1565 82 0
1569 81 0
1573 79 0
1577 77 0
1580 76 0
1584 74 0
1587 72 0
1591 70 0
1594 68 0
1598 66 0
1601 65 0
1605 63 0
1609 61 0
1613 60 0
1616 59 0
1620 57 0
1624 56 0
1628 55 0
1631 54 0
1635 53 0
1639 52 0
1643 50 0
1647 50 0
1651 49 0
1655 48 0
1659 47 0
1663 46 0
1667 46 0
1671 45 0
1675 45 0
1678 44 0
1682 44 0
1686 44 0
1690 44 0
1694 44 0
1698 43 0
1702 43 0
1706 43 0
1710 43 0
1714 42 0
1718 42 0
1722 42 0
1726 41 0
1730 41 0
1734 41 0
1738 40 0
1742 40 0
1746 40 0
1750 40 0
1754 40 0
1758 40 0
1762 40 0
1766 40 0
1770 40 0
1774 40 0
1778 40 0
1782 40 0
1786 40 0
1790 40 0
1794 40 0
1798 40 0
1802 41 0
1806 41 0
1810 41 0
1814 41 0
1818 42 0
1822 42 0
1826 42 0
1830 42 0
1834 42 0
1838 41 0
1842 40 0
1846 39 0
1850 38 0
1853 36 0
1857 35 0
1861 33 0
1864 31 0
1867 28 0
1871 26 0
1874 24 0
1877 22 0
1881 20 0
1884 18 0
1888 16 0
1891 14 0
1895 12 0
1898 10 0
1902 8 0
1905 6 0
1909 5 0
1913 3 0
1916 2 0
1920 1 0
1924 0 0
1928 -1 0
1932 -1 0
1936 -2 0
1940 -1 0
1944 -1 0
1948 0 0
end frb_curve_t