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 = 2
|   Segment [0] from curve    1
|      600 samples [3804..4403]
|     0.102 of the curve [0.645__0.747]
|   Segment [1] from curve   15 (reversed)
|      600 samples [ 805..1404]
|     0.123 of the curve [0.166__0.289]
| 
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 600
0 0 0
3 -2 0
7 -4 0
10 -7 0
12 -10 0
15 -13 0
17 -16 0
19 -19 0
22 -23 0
24 -26 0
27 -29 0
30 -32 0
33 -34 0
36 -37 0
39 -39 0
43 -40 0
47 -41 0
51 -41 0
55 -40 0
59 -39 0
62 -37 0
66 -35 0
68 -32 0
71 -29 0
73 -25 0
74 -21 0
76 -18 0
77 -14 0
79 -10 0
80 -7 0
82 -3 0
84 0 0
87 3 0
90 6 0
93 9 0
96 11 0
100 13 0
104 14 0
108 15 0
111 15 0
115 14 0
119 14 0
123 12 0
127 11 0
131 9 0
134 8 0
138 6 0
142 5 0
145 3 0
149 2 0
153 1 0
157 1 0
161 0 0
165 0 0
169 0 0
173 0 0
177 0 0
181 0 0
185 1 0
189 0 0
193 0 0
197 0 0
201 0 0
205 0 0
209 -1 0
213 0 0
217 0 0
221 0 0
225 1 0
229 2 0
233 3 0
236 4 0
240 6 0
244 7 0
247 9 0
251 11 0
255 12 0
258 14 0
262 16 0
266 17 0
269 19 0
273 20 0
277 21 0
281 23 0
284 24 0
288 25 0
292 26 0
296 27 0
300 29 0
304 30 0
307 31 0
311 32 0
315 33 0
319 34 0
323 36 0
326 37 0
330 39 0
334 41 0
337 42 0
341 44 0
344 46 0
348 49 0
351 51 0
354 53 0
358 55 0
361 57 0
364 59 0
368 61 0
372 63 0
375 64 0
379 66 0
383 67 0
387 68 0
391 69 0
395 69 0
398 70 0
402 71 0
406 71 0
410 72 0
414 72 0
418 73 0
422 74 0
426 75 0
430 76 0
434 77 0
438 78 0
441 79 0
445 80 0
449 81 0
453 82 0
457 83 0
461 84 0
465 85 0
468 87 0
472 88 0
476 89 0
480 91 0
484 92 0
487 93 0
491 95 0
495 96 0
499 97 0
502 99 0
506 100 0
510 101 0
514 102 0
518 102 0
522 103 0
526 104 0
530 104 0
534 105 0
538 105 0
542 106 0
546 106 0
550 107 0
554 108 0
557 108 0
561 109 0
565 110 0
569 111 0
573 112 0
577 113 0
581 114 0
585 115 0
589 115 0
593 116 0
597 116 0
601 117 0
605 117 0
609 117 0
613 116 0
616 116 0
620 115 0
624 115 0
628 114 0
632 114 0
636 113 0
640 113 0
644 113 0
648 113 0
652 113 0
656 113 0
660 113 0
664 113 0
668 114 0
672 114 0
676 114 0
680 115 0
684 115 0
688 116 0
692 116 0
696 117 0
700 117 0
704 118 0
708 118 0
712 119 0
716 119 0
720 120 0
724 120 0
728 121 0
732 121 0
736 122 0
740 123 0
744 124 0
747 125 0
751 126 0
755 128 0
759 129 0
762 131 0
766 133 0
769 134 0
773 136 0
776 139 0
780 141 0
783 143 0
786 145 0
790 147 0
793 149 0
797 151 0
800 153 0
804 155 0
807 157 0
811 158 0
815 159 0
819 160 0
823 161 0
827 161 0
831 162 0
835 162 0
839 162 0
843 161 0
847 161 0
851 161 0
855 160 0
858 160 0
862 159 0
866 159 0
870 158 0
874 158 0
878 157 0
882 156 0
886 155 0
890 154 0
894 153 0
898 152 0
902 151 0
905 150 0
909 149 0
913 148 0
917 147 0
921 146 0
925 145 0
929 144 0
932 143 0
936 142 0
940 140 0
944 139 0
948 138 0
951 136 0
955 135 0
959 133 0
962 132 0
966 130 0
970 129 0
973 127 0
977 126 0
981 124 0
985 123 0
988 121 0
992 120 0
996 119 0
1000 118 0
1004 116 0
1008 115 0
1011 115 0
1015 114 0
1019 113 0
1023 112 0
1027 111 0
1031 110 0
1035 108 0
1038 106 0
1042 104 0
1045 102 0
1048 100 0
1052 98 0
1055 96 0
1058 93 0
1062 91 0
1065 89 0
1069 87 0
1072 86 0
1076 84 0
1080 83 0
1084 82 0
1087 81 0
1091 80 0
1095 79 0
1099 78 0
1103 77 0
1107 77 0
1111 76 0
1115 75 0
1119 74 0
1123 73 0
1126 72 0
1130 71 0
1134 69 0
1138 68 0
1141 67 0
1145 65 0
1149 64 0
1153 63 0
1157 62 0
1161 61 0
1165 60 0
1168 59 0
1172 59 0
1176 59 0
1180 59 0
1184 59 0
1188 59 0
1192 60 0
1196 60 0
1200 61 0
1204 61 0
1208 62 0
1212 62 0
1216 63 0
1220 64 0
1224 64 0
1228 65 0
1232 65 0
1236 66 0
1240 67 0
1244 67 0
1248 68 0
1251 69 0
1255 71 0
1259 72 0
1263 73 0
1267 75 0
1270 76 0
1274 78 0
1278 79 0
1282 80 0
1285 82 0
1289 83 0
1293 83 0
1297 84 0
1301 84 0
1305 84 0
1309 84 0
1313 84 0
1317 83 0
1321 82 0
1325 81 0
1328 79 0
1332 78 0
1336 76 0
1340 75 0
1343 73 0
1347 71 0
1350 69 0
1354 67 0
1357 65 0
1361 63 0
1364 61 0
1367 59 0
1371 57 0
1374 55 0
1377 53 0
1381 50 0
1384 48 0
1387 46 0
1391 44 0
1394 42 0
1398 40 0
1401 38 0
1405 36 0
1409 35 0
1413 34 0
1417 33 0
1421 33 0
1425 33 0
1429 33 0
1433 33 0
1436 33 0
1440 34 0
1444 34 0
1448 35 0
1452 35 0
1456 36 0
1460 36 0
1464 35 0
1468 35 0
1472 35 0
1476 34 0
1480 33 0
1484 33 0
1488 32 0
1492 32 0
1496 32 0
1500 32 0
1504 32 0
1508 32 0
1512 32 0
1516 32 0
1520 33 0
1524 33 0
1528 33 0
1532 34 0
1536 34 0
1540 34 0
1544 35 0
1548 35 0
1552 36 0
1556 37 0
1560 37 0
1564 38 0
1567 39 0
1571 41 0
1575 42 0
1579 44 0
1582 46 0
1585 48 0
1589 50 0
1592 53 0
1594 56 0
1597 59 0
1600 62 0
1602 65 0
1605 68 0
1608 71 0
1611 74 0
1614 76 0
1616 79 0
1619 82 0
1622 84 0
1625 87 0
1629 89 0
1632 92 0
1635 94 0
1639 96 0
1642 98 0
1646 100 0
1649 101 0
1653 102 0
1657 103 0
1661 104 0
1665 104 0
1669 104 0
1673 104 0
1677 104 0
1681 104 0
1685 104 0
1689 104 0
1693 104 0
1697 104 0
1701 104 0
1705 104 0
1709 104 0
1713 104 0
1717 104 0
1721 104 0
1725 104 0
1729 104 0
1733 103 0
1737 103 0
1741 103 0
1745 103 0
1749 103 0
1753 103 0
1757 102 0
1761 102 0
1765 102 0
1769 102 0
1773 102 0
1777 101 0
1781 101 0
1785 100 0
1789 100 0
1793 99 0
1797 99 0
1801 98 0
1805 98 0
1809 98 0
1813 98 0
1817 97 0
1821 97 0
1825 97 0
1829 97 0
1833 96 0
1837 96 0
1841 95 0
1845 95 0
1849 94 0
1853 93 0
1857 93 0
1860 92 0
1864 90 0
1868 89 0
1872 88 0
1875 86 0
1879 85 0
1883 83 0
1887 82 0
1890 80 0
1894 79 0
1898 77 0
1902 76 0
1905 75 0
1909 73 0
1913 72 0
1917 71 0
1920 69 0
1924 68 0
1928 66 0
1932 65 0
1935 63 0
1939 62 0
1942 60 0
1946 58 0
1949 56 0
1953 54 0
1956 52 0
1960 50 0
1963 48 0
1967 47 0
1971 45 0
1975 44 0
1979 43 0
1983 43 0
1987 42 0
1990 42 0
1994 42 0
1998 42 0
2002 41 0
2006 41 0
2010 41 0
2015 41 0
2018 41 0
2022 41 0
2026 40 0
2030 40 0
2034 39 0
2038 38 0
2042 38 0
2046 37 0
2050 36 0
2054 35 0
2058 34 0
2062 33 0
2065 32 0
2069 30 0
2073 29 0
2077 28 0
2080 26 0
2084 24 0
2088 23 0
2091 21 0
2095 19 0
2098 17 0
2102 15 0
2105 13 0
2109 11 0
2112 10 0
2116 8 0
2120 6 0
2123 4 0
2127 3 0
2131 1 0
2134 0 0
2138 -1 0
2142 -1 0
2146 -2 0
2150 -2 0
2154 -2 0
2158 -2 0
2162 -1 0
2166 -1 0
2170 -1 0
2174 -1 0
2178 -1 0
2182 -1 0
2186 -2 0
2190 -2 0
2194 -2 0
2198 -3 0
2202 -3 0
2206 -3 0
2210 -2 0
2214 -2 0
2218 -1 0
2222 -1 0
2226 0 0
2230 0 0
2234 0 0
2238 0 0
2242 0 0
end frb_curve_t