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.
| 
| Input candidate:
|   Candidate index = 3
|   Segment [0] from curve    2
|      600 samples [3348..3947]
|     0.108 of the curve [0.604__0.712]
|   Segment [1] from curve    6 (reversed)
|      600 samples [3213..3812]
|     0.114 of the curve [0.609__0.722]
| 
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 600
0 0 0
4 2 0
7 3 0
11 5 0
15 6 0
18 8 0
22 9 0
26 10 0
30 11 0
34 12 0
38 12 0
42 13 0
46 13 0
50 13 0
54 14 0
58 14 0
62 14 0
66 15 0
70 15 0
74 16 0
78 16 0
82 17 0
86 18 0
89 18 0
93 19 0
97 20 0
101 21 0
105 22 0
109 22 0
113 23 0
117 24 0
121 25 0
125 26 0
128 27 0
132 29 0
136 30 0
140 31 0
144 32 0
147 34 0
151 35 0
155 36 0
159 38 0
163 39 0
166 40 0
170 41 0
174 42 0
178 42 0
182 43 0
186 44 0
190 45 0
194 45 0
198 46 0
202 47 0
206 48 0
209 49 0
213 49 0
217 50 0
221 51 0
225 52 0
229 52 0
233 53 0
237 53 0
241 53 0
245 53 0
249 53 0
253 53 0
257 53 0
261 53 0
265 54 0
269 54 0
273 55 0
277 56 0
281 56 0
285 58 0
289 59 0
292 59 0
296 60 0
300 61 0
304 61 0
308 62 0
312 62 0
316 63 0
320 63 0
324 63 0
328 64 0
332 65 0
336 66 0
340 67 0
344 68 0
347 69 0
351 70 0
355 72 0
359 73 0
363 74 0
366 75 0
370 76 0
374 77 0
378 79 0
382 80 0
386 81 0
389 82 0
393 84 0
397 85 0
400 87 0
404 89 0
407 91 0
411 93 0
414 96 0
417 98 0
420 100 0
424 103 0
427 105 0
430 107 0
433 110 0
437 112 0
440 114 0
443 116 0
447 118 0
450 120 0
454 122 0
458 124 0
461 125 0
465 126 0
469 127 0
473 128 0
477 129 0
481 129 0
485 129 0
489 130 0
493 130 0
497 130 0
501 130 0
505 130 0
509 130 0
513 129 0
517 129 0
521 129 0
525 129 0
529 129 0
533 129 0
537 128 0
541 128 0
545 127 0
549 127 0
553 126 0
557 126 0
561 125 0
565 125 0
569 125 0
573 124 0
577 124 0
581 124 0
585 125 0
589 125 0
593 126 0
596 126 0
600 127 0
604 129 0
608 130 0
612 131 0
616 132 0
619 133 0
623 134 0
627 136 0
631 136 0
635 137 0
639 138 0
643 139 0
647 139 0
651 140 0
655 140 0
659 140 0
663 140 0
667 140 0
671 140 0
675 140 0
679 140 0
683 140 0
687 139 0
691 139 0
695 139 0
699 139 0
703 138 0
707 138 0
711 138 0
715 138 0
719 137 0
723 137 0
727 137 0
731 137 0
735 136 0
738 136 0
742 136 0
746 136 0
750 136 0
754 135 0
758 135 0
762 135 0
766 134 0
770 134 0
774 133 0
778 133 0
782 132 0
786 131 0
790 130 0
794 129 0
798 128 0
802 127 0
805 126 0
809 125 0
813 124 0
817 124 0
821 123 0
825 123 0
829 123 0
833 122 0
837 122 0
841 121 0
845 121 0
849 120 0
853 120 0
857 119 0
861 119 0
865 118 0
869 117 0
873 116 0
877 115 0
881 115 0
885 114 0
889 114 0
893 114 0
897 114 0
901 114 0
904 114 0
908 114 0
912 115 0
916 116 0
920 117 0
924 118 0
928 119 0
932 120 0
936 121 0
939 122 0
943 123 0
947 124 0
951 125 0
955 125 0
959 125 0
963 125 0
967 125 0
971 125 0
975 125 0
979 124 0
983 124 0
987 123 0
991 123 0
995 122 0
999 122 0
1003 121 0
1007 120 0
1011 119 0
1015 118 0
1018 116 0
1022 115 0
1026 114 0
1029 112 0
1033 110 0
1037 109 0
1040 107 0
1044 106 0
1048 104 0
1052 103 0
1055 101 0
1059 100 0
1063 98 0
1066 97 0
1070 96 0
1074 95 0
1078 94 0
1082 93 0
1086 92 0
1090 91 0
1094 91 0
1098 90 0
1102 90 0
1106 89 0
1110 88 0
1114 88 0
1118 88 0
1122 88 0
1126 88 0
1130 88 0
1133 88 0
1137 89 0
1141 90 0
1145 91 0
1149 91 0
1153 92 0
1157 93 0
1161 94 0
1165 95 0
1169 96 0
1173 96 0
1177 97 0
1181 97 0
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1192 99 0
1196 100 0
1200 101 0
1204 102 0
1208 103 0
1212 104 0
1216 104 0
1220 105 0
1224 104 0
1228 104 0
1232 103 0
1236 102 0
1239 101 0
1243 100 0
1247 99 0
1251 99 0
1255 98 0
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1263 98 0
1267 98 0
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1275 98 0
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1287 99 0
1291 99 0
1295 100 0
1299 101 0
1303 101 0
1307 102 0
1311 103 0
1315 104 0
1318 105 0
1322 106 0
1326 107 0
1330 108 0
1334 109 0
1338 110 0
1342 110 0
1346 111 0
1350 111 0
1354 112 0
1358 112 0
1362 112 0
1366 112 0
1370 111 0
1374 111 0
1378 111 0
1382 110 0
1386 110 0
1390 110 0
1394 109 0
1398 109 0
1402 109 0
1406 109 0
1410 110 0
1414 110 0
1418 110 0
1422 110 0
1426 111 0
1430 111 0
1434 111 0
1438 111 0
1442 111 0
1446 110 0
1450 110 0
1454 109 0
1457 109 0
1461 108 0
1465 107 0
1469 105 0
1473 104 0
1477 103 0
1480 101 0
1484 100 0
1488 98 0
1491 97 0
1495 95 0
1499 93 0
1502 92 0
1506 90 0
1510 88 0
1513 87 0
1517 86 0
1521 85 0
1525 83 0
1529 82 0
1532 81 0
1536 80 0
1540 80 0
1544 79 0
1548 78 0
1552 78 0
1556 78 0
1560 78 0
1564 78 0
1568 79 0
1572 80 0
1576 81 0
1579 83 0
1583 84 0
1586 86 0
1590 88 0
1594 90 0
1597 92 0
1601 93 0
1605 95 0
1608 96 0
1612 97 0
1616 97 0
1620 97 0
1624 97 0
1628 96 0
1632 95 0
1636 94 0
1640 93 0
1644 92 0
1647 91 0
1651 89 0
1655 88 0
1659 86 0
1662 85 0
1666 83 0
1670 82 0
1673 80 0
1677 79 0
1681 78 0
1685 76 0
1689 75 0
1692 74 0
1696 72 0
1700 71 0
1704 70 0
1708 69 0
1711 68 0
1715 66 0
1719 65 0
1723 64 0
1727 63 0
1730 61 0
1734 60 0
1738 60 0
1742 59 0
1746 58 0
1750 58 0
1754 58 0
1758 57 0
1762 57 0
1766 56 0
1770 55 0
1774 54 0
1777 53 0
1781 51 0
1785 50 0
1788 48 0
1792 47 0
1796 45 0
1800 44 0
1803 42 0
1807 41 0
1811 39 0
1814 38 0
1818 36 0
1821 34 0
1825 32 0
1828 29 0
1831 27 0
1834 24 0
1837 21 0
1840 19 0
1842 16 0
1845 12 0
1847 9 0
1850 6 0
1852 3 0
1855 0 0
1858 -3 0
1860 -6 0
1863 -9 0
1866 -11 0
1870 -14 0
1873 -16 0
1877 -17 0
1880 -19 0
1884 -21 0
1888 -22 0
1891 -24 0
1895 -25 0
1899 -26 0
1903 -28 0
1906 -29 0
1910 -31 0
1914 -32 0
1917 -34 0
1921 -36 0
1925 -37 0
1928 -39 0
1932 -41 0
1936 -42 0
1939 -44 0
1943 -45 0
1947 -46 0
1951 -47 0
1955 -48 0
1959 -49 0
1962 -50 0
1966 -50 0
1970 -50 0
1974 -50 0
1978 -50 0
1982 -50 0
1986 -50 0
1990 -49 0
1994 -48 0
1998 -47 0
2002 -46 0
2006 -45 0
2010 -43 0
2013 -42 0
2017 -40 0
2021 -39 0
2024 -37 0
2028 -36 0
2032 -35 0
2036 -34 0
2040 -33 0
2044 -32 0
2048 -32 0
2052 -31 0
2056 -31 0
2060 -31 0
2064 -31 0
2068 -31 0
2072 -30 0
2076 -30 0
2080 -30 0
2083 -29 0
2087 -29 0
2091 -28 0
2095 -28 0
2099 -28 0
2103 -28 0
2107 -28 0
2111 -28 0
2115 -28 0
2119 -29 0
2123 -29 0
2127 -30 0
2131 -30 0
2135 -30 0
2139 -30 0
2143 -29 0
2147 -29 0
2151 -28 0
2155 -26 0
2159 -25 0
2162 -23 0
2166 -21 0
2169 -19 0
2172 -17 0
2176 -14 0
2179 -12 0
2182 -10 0
2185 -8 0
2189 -5 0
2192 -4 0
2196 -2 0
2200 0 0
2203 1 0
2207 3 0
2211 4 0
2215 5 0
2219 6 0
2223 7 0
2227 7 0
2231 8 0
2235 8 0
2239 8 0
2243 8 0
2247 8 0
2251 7 0
2255 7 0
2258 7 0
2262 6 0
2266 6 0
2270 5 0
2274 5 0
2278 4 0
2282 3 0
2286 3 0
2290 2 0
2294 1 0
2298 0 0
end frb_curve_t