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 = 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]
| 
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 600
0 0 0
3 2 0
6 5 0
9 8 0
11 11 0
14 14 0
16 17 0
19 21 0
21 24 0
24 27 0
26 30 0
29 33 0
32 36 0
35 39 0
38 41 0
40 44 0
44 47 0
47 49 0
50 52 0
53 54 0
56 57 0
59 59 0
62 62 0
65 65 0
68 67 0
71 69 0
75 72 0
78 74 0
82 76 0
85 77 0
89 79 0
93 80 0
97 81 0
101 81 0
105 82 0
109 82 0
113 82 0
117 83 0
121 83 0
125 84 0
128 85 0
132 86 0
136 87 0
140 89 0
143 90 0
147 92 0
151 93 0
155 94 0
159 94 0
163 94 0
167 94 0
171 93 0
175 92 0
179 91 0
182 90 0
186 89 0
190 88 0
194 87 0
198 86 0
202 85 0
206 85 0
210 84 0
214 84 0
218 84 0
222 84 0
226 85 0
230 85 0
234 86 0
238 86 0
242 86 0
246 86 0
250 86 0
254 85 0
257 85 0
261 84 0
265 84 0
269 83 0
273 82 0
277 82 0
281 82 0
285 82 0
289 82 0
293 82 0
297 83 0
301 83 0
305 84 0
309 85 0
313 86 0
317 86 0
321 87 0
325 87 0
329 87 0
333 87 0
337 87 0
341 87 0
345 86 0
349 86 0
353 85 0
357 84 0
361 84 0
365 83 0
369 83 0
373 82 0
377 82 0
381 82 0
385 82 0
389 82 0
393 82 0
397 83 0
401 83 0
405 83 0
409 83 0
413 83 0
417 83 0
421 82 0
424 82 0
428 81 0
432 80 0
436 80 0
440 79 0
444 78 0
448 77 0
452 76 0
456 75 0
460 75 0
464 74 0
468 73 0
472 73 0
476 73 0
480 73 0
484 72 0
488 72 0
492 72 0
496 72 0
500 72 0
504 71 0
508 71 0
512 71 0
516 71 0
520 71 0
524 71 0
528 71 0
532 71 0
536 71 0
540 71 0
544 70 0
548 70 0
551 69 0
555 68 0
559 68 0
563 66 0
567 65 0
571 64 0
574 63 0
578 61 0
582 60 0
586 59 0
590 57 0
593 56 0
597 55 0
601 54 0
605 54 0
609 53 0
613 53 0
617 53 0
621 53 0
625 53 0
629 54 0
633 55 0
637 56 0
641 57 0
644 59 0
648 60 0
652 62 0
655 64 0
659 66 0
662 68 0
665 70 0
669 72 0
672 74 0
675 76 0
679 79 0
682 81 0
686 83 0
689 85 0
693 87 0
696 89 0
700 90 0
704 92 0
707 93 0
711 95 0
715 96 0
719 97 0
722 98 0
726 99 0
730 101 0
734 102 0
738 103 0
742 104 0
746 105 0
749 106 0
753 107 0
757 108 0
761 109 0
765 111 0
768 112 0
772 114 0
776 115 0
779 117 0
783 119 0
787 120 0
790 122 0
794 124 0
797 126 0
801 128 0
804 130 0
808 132 0
811 133 0
815 135 0
818 137 0
822 139 0
826 141 0
829 142 0
833 144 0
837 145 0
841 146 0
845 147 0
849 147 0
852 148 0
856 148 0
860 148 0
864 148 0
868 148 0
872 148 0
876 148 0
880 148 0
884 148 0
888 148 0
892 148 0
896 148 0
900 148 0
904 149 0
908 149 0
912 149 0
916 150 0
920 150 0
924 151 0
928 151 0
932 151 0
936 151 0
940 152 0
944 152 0
948 152 0
952 152 0
956 151 0
960 151 0
964 151 0
968 150 0
972 150 0
976 149 0
980 148 0
984 147 0
988 146 0
992 145 0
996 145 0
1000 144 0
1003 143 0
1007 142 0
1011 141 0
1015 140 0
1019 140 0
1023 140 0
1027 139 0
1031 139 0
1035 139 0
1039 139 0
1043 140 0
1047 140 0
1051 140 0
1055 140 0
1059 140 0
1063 141 0
1067 141 0
1071 141 0
1075 141 0
1079 141 0
1083 141 0
1087 141 0
1091 141 0
1095 141 0
1099 140 0
1103 140 0
1107 139 0
1111 138 0
1115 138 0
1119 137 0
1123 136 0
1127 135 0
1130 134 0
1134 133 0
1138 133 0
1142 132 0
1146 132 0
1150 132 0
1154 132 0
1158 132 0
1162 133 0
1166 133 0
1170 134 0
1174 135 0
1178 136 0
1182 137 0
1186 138 0
1190 139 0
1193 140 0
1197 141 0
1201 141 0
1205 142 0
1209 143 0
1213 143 0
1217 144 0
1221 145 0
1225 145 0
1229 146 0
1233 147 0
1237 147 0
1241 148 0
1245 148 0
1249 149 0
1253 149 0
1257 149 0
1261 149 0
1265 149 0
1269 148 0
1273 148 0
1277 148 0
1281 148 0
1285 148 0
1289 147 0
1293 147 0
1297 147 0
1301 147 0
1305 147 0
1309 147 0
1313 147 0
1317 147 0
1321 146 0
1325 146 0
1329 146 0
1333 145 0
1337 144 0
1340 144 0
1344 143 0
1348 141 0
1352 140 0
1355 138 0
1359 136 0
1363 134 0
1366 132 0
1369 130 0
1373 128 0
1376 126 0
1380 124 0
1383 122 0
1387 120 0
1390 118 0
1394 117 0
1397 115 0
1401 113 0
1405 112 0
1409 110 0
1412 109 0
1416 108 0
1420 107 0
1424 106 0
1428 105 0
1432 105 0
1436 104 0
1440 104 0
1444 104 0
1448 104 0
1452 104 0
1456 103 0
1460 103 0
1464 103 0
1468 104 0
1472 104 0
1476 104 0
1480 104 0
1484 104 0
1488 105 0
1492 105 0
1496 106 0
1500 106 0
1504 107 0
1507 108 0
1511 109 0
1515 110 0
1519 111 0
1523 112 0
1527 113 0
1531 114 0
1535 114 0
1539 115 0
1543 115 0
1547 116 0
1551 116 0
1555 116 0
1559 116 0
1563 116 0
1567 116 0
1571 115 0
1575 114 0
1578 114 0
1582 113 0
1586 112 0
1590 111 0
1594 110 0
1598 110 0
1602 109 0
1606 108 0
1610 108 0
1614 107 0
1618 107 0
1622 107 0
1626 107 0
1630 107 0
1634 107 0
1638 107 0
1642 108 0
1646 108 0
1650 108 0
1654 107 0
1658 107 0
1662 107 0
1666 106 0
1670 105 0
1674 104 0
1677 103 0
1681 102 0
1685 101 0
1689 99 0
1692 97 0
1696 95 0
1699 93 0
1703 91 0
1706 89 0
1709 87 0
1712 84 0
1716 82 0
1719 80 0
1722 77 0
1725 75 0
1729 73 0
1732 71 0
1735 69 0
1739 67 0
1742 65 0
1746 63 0
1749 61 0
1753 59 0
1757 58 0
1760 56 0
1764 55 0
1768 54 0
1772 53 0
1776 52 0
1780 51 0
1784 51 0
1788 51 0
1792 51 0
1796 51 0
1800 50 0
1804 50 0
1808 50 0
1812 50 0
1816 49 0
1820 49 0
1824 49 0
1828 48 0
1832 48 0
1836 47 0
1840 47 0
1844 47 0
1848 47 0
1852 48 0
1856 48 0
1860 49 0
1863 50 0
1867 50 0
1871 51 0
1875 52 0
1879 53 0
1883 53 0
1887 54 0
1891 54 0
1895 54 0
1899 54 0
1903 54 0
1907 54 0
1911 53 0
1915 52 0
1919 52 0
1923 51 0
1927 51 0
1931 50 0
1935 49 0
1939 48 0
1942 47 0
1946 46 0
1950 45 0
1954 44 0
1958 42 0
1961 41 0
1965 39 0
1968 37 0
1972 35 0
1975 33 0
1978 31 0
1982 28 0
1985 26 0
1989 24 0
1992 22 0
1996 20 0
1999 19 0
2003 17 0
2007 16 0
2011 15 0
2015 14 0
2019 14 0
2023 13 0
2026 12 0
2030 11 0
2034 10 0
2038 8 0
2042 7 0
2045 5 0
2049 3 0
2052 1 0
2056 -1 0
2059 -3 0
2062 -5 0
2066 -7 0
2069 -10 0
2072 -12 0
2075 -14 0
2078 -17 0
2082 -19 0
2085 -22 0
2088 -24 0
2091 -27 0
2094 -29 0
2097 -32 0
2101 -34 0
2104 -36 0
2108 -37 0
2112 -39 0
2115 -40 0
2119 -42 0
2123 -43 0
2127 -43 0
2131 -44 0
2135 -44 0
2139 -44 0
2143 -43 0
2147 -42 0
2151 -41 0
2154 -40 0
2158 -38 0
2162 -36 0
2165 -34 0
2168 -32 0
2171 -29 0
2174 -26 0
2177 -24 0
2180 -21 0
2182 -18 0
2185 -14 0
2187 -11 0
2190 -8 0
2193 -5 0
2195 -3 0
2199 0 0
2202 2 0
2206 4 0
2209 5 0
2213 6 0
2217 7 0
2221 7 0
2225 7 0
2229 6 0
2233 6 0
2237 5 0
2241 4 0
2245 3 0
2249 2 0
2253 2 0
2257 1 0
2261 0 0
2264 0 0
end frb_curve_t