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 = 0
|   Segment [0] from curve    1
|      600 samples [ 233.. 832]
|     0.102 of the curve [0.040__0.141]
|   Segment [1] from curve   11 (reversed)
|      600 samples [ 879..1478]
|     0.120 of the curve [0.176__0.295]
| 
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 600
0 0 0
4 0 0
8 1 0
12 1 0
16 2 0
20 3 0
23 5 0
27 6 0
31 8 0
34 10 0
38 12 0
41 14 0
44 17 0
47 20 0
50 22 0
52 25 0
55 28 0
58 31 0
60 34 0
63 37 0
65 40 0
68 44 0
71 47 0
73 49 0
76 52 0
79 55 0
82 58 0
85 60 0
89 63 0
92 65 0
95 67 0
99 69 0
102 71 0
106 73 0
109 74 0
113 76 0
117 78 0
120 79 0
124 80 0
128 81 0
132 82 0
136 83 0
140 84 0
144 85 0
148 86 0
152 86 0
156 87 0
159 88 0
163 88 0
167 89 0
171 90 0
175 91 0
179 92 0
183 94 0
186 95 0
190 96 0
194 97 0
198 99 0
202 100 0
206 101 0
209 102 0
213 102 0
217 103 0
221 103 0
225 103 0
229 103 0
233 103 0
237 103 0
241 103 0
245 102 0
249 102 0
253 102 0
257 101 0
261 101 0
265 101 0
269 101 0
273 100 0
277 100 0
281 100 0
285 100 0
289 101 0
293 101 0
297 101 0
301 101 0
305 102 0
309 102 0
313 103 0
317 103 0
321 104 0
325 104 0
329 105 0
333 105 0
337 106 0
341 106 0
345 107 0
349 107 0
353 108 0
357 108 0
361 109 0
365 110 0
369 110 0
373 111 0
376 112 0
380 113 0
384 114 0
388 115 0
392 116 0
396 117 0
400 118 0
404 119 0
408 119 0
412 120 0
416 120 0
420 120 0
424 120 0
427 120 0
431 119 0
435 119 0
439 118 0
443 117 0
447 116 0
451 115 0
455 114 0
459 113 0
462 112 0
466 110 0
470 109 0
474 108 0
478 107 0
482 106 0
485 104 0
489 103 0
493 102 0
497 101 0
501 101 0
505 100 0
509 100 0
513 99 0
517 99 0
521 99 0
525 100 0
529 100 0
533 101 0
537 102 0
540 103 0
544 104 0
548 106 0
552 107 0
556 108 0
559 109 0
563 111 0
567 111 0
571 112 0
575 113 0
579 113 0
583 113 0
587 113 0
591 112 0
595 111 0
599 110 0
603 109 0
606 108 0
610 107 0
614 106 0
618 105 0
622 104 0
626 103 0
630 102 0
634 101 0
637 100 0
641 100 0
645 99 0
649 99 0
653 98 0
657 98 0
661 98 0
665 98 0
669 98 0
673 98 0
677 98 0
681 99 0
685 99 0
689 99 0
693 100 0
697 100 0
701 100 0
705 100 0
709 100 0
713 100 0
717 100 0
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725 100 0
729 100 0
733 100 0
737 99 0
741 99 0
745 99 0
749 99 0
753 98 0
757 98 0
761 98 0
765 97 0
769 97 0
773 97 0
777 97 0
781 98 0
785 98 0
789 98 0
793 99 0
797 100 0
801 101 0
805 101 0
809 102 0
813 103 0
816 104 0
820 105 0
824 106 0
828 107 0
832 108 0
836 109 0
840 109 0
844 110 0
848 110 0
852 111 0
856 111 0
860 111 0
864 111 0
868 111 0
872 112 0
876 112 0
880 112 0
884 112 0
888 113 0
892 113 0
896 113 0
900 114 0
904 114 0
908 115 0
911 116 0
915 117 0
919 119 0
923 120 0
926 122 0
930 124 0
933 126 0
937 128 0
940 130 0
944 132 0
947 134 0
950 136 0
954 138 0
957 140 0
961 142 0
964 144 0
968 146 0
971 148 0
975 150 0
978 152 0
982 154 0
985 155 0
989 157 0
993 159 0
997 160 0
1000 161 0
1004 162 0
1008 163 0
1012 163 0
1016 164 0
1020 164 0
1024 164 0
1028 164 0
1032 163 0
1036 163 0
1040 162 0
1044 162 0
1048 161 0
1052 160 0
1056 159 0
1060 158 0
1063 157 0
1067 156 0
1071 155 0
1075 154 0
1079 153 0
1083 153 0
1087 153 0
1091 153 0
1095 153 0
1099 154 0
1103 155 0
1107 156 0
1110 158 0
1114 160 0
1117 161 0
1121 163 0
1125 165 0
1128 167 0
1132 168 0
1136 170 0
1139 171 0
1143 172 0
1147 173 0
1151 173 0
1155 173 0
1159 174 0
1163 174 0
1167 173 0
1171 173 0
1175 172 0
1179 171 0
1183 170 0
1187 169 0
1190 168 0
1194 166 0
1198 165 0
1202 164 0
1206 162 0
1209 161 0
1213 160 0
1217 159 0
1221 158 0
1225 157 0
1229 156 0
1233 155 0
1237 155 0
1241 154 0
1245 154 0
1249 153 0
1252 153 0
1256 152 0
1260 152 0
1264 151 0
1268 150 0
1272 149 0
1276 148 0
1280 147 0
1284 146 0
1288 145 0
1291 144 0
1295 142 0
1299 141 0
1303 141 0
1307 140 0
1311 139 0
1315 139 0
1319 139 0
1323 139 0
1327 139 0
1331 140 0
1335 140 0
1339 141 0
1343 142 0
1347 143 0
1350 144 0
1354 144 0
1358 145 0
1362 146 0
1366 146 0
1370 146 0
1374 146 0
1378 146 0
1382 145 0
1386 145 0
1390 144 0
1394 143 0
1398 141 0
1401 140 0
1405 138 0
1408 136 0
1412 134 0
1415 132 0
1419 130 0
1422 128 0
1426 126 0
1429 124 0
1433 123 0
1437 121 0
1440 120 0
1444 118 0
1448 117 0
1452 115 0
1455 113 0
1459 112 0
1462 109 0
1465 107 0
1469 105 0
1472 102 0
1475 99 0
1477 96 0
1480 93 0
1482 90 0
1484 87 0
1487 84 0
1489 80 0
1491 77 0
1493 74 0
1496 70 0
1498 67 0
1501 65 0
1504 62 0
1507 59 0
1510 57 0
1514 55 0
1517 53 0
1521 51 0
1525 50 0
1528 48 0
1532 47 0
1536 46 0
1540 45 0
1544 44 0
1548 43 0
1552 43 0
1556 42 0
1559 41 0
1563 40 0
1567 39 0
1571 38 0
1575 37 0
1579 36 0
1583 36 0
1587 36 0
1591 36 0
1595 36 0
1599 36 0
1603 36 0
1607 37 0
1611 37 0
1615 38 0
1619 39 0
1623 39 0
1627 40 0
1631 40 0
1635 40 0
1639 41 0
1643 41 0
1647 41 0
1651 41 0
1655 41 0
1659 42 0
1663 42 0
1667 42 0
1671 43 0
1675 43 0
1679 44 0
1682 45 0
1686 45 0
1690 46 0
1694 48 0
1698 49 0
1702 50 0
1706 51 0
1709 52 0
1713 54 0
1717 55 0
1721 57 0
1724 58 0
1728 60 0
1732 61 0
1735 63 0
1739 65 0
1742 67 0
1746 69 0
1749 71 0
1753 73 0
1756 75 0
1760 77 0
1763 79 0
1767 81 0
1770 83 0
1774 85 0
1777 86 0
1781 88 0
1784 90 0
1788 92 0
1792 93 0
1795 95 0
1799 97 0
1803 98 0
1806 100 0
1810 101 0
1814 102 0
1818 103 0
1822 104 0
1825 105 0
1829 106 0
1833 107 0
1837 107 0
1841 108 0
1845 108 0
1849 108 0
1853 108 0
1857 108 0
1861 108 0
1865 108 0
1869 108 0
1873 107 0
1877 107 0
1881 106 0
1885 106 0
1889 105 0
1893 105 0
1897 104 0
1901 103 0
1905 103 0
1909 102 0
1913 101 0
1917 101 0
1921 100 0
1925 99 0
1929 99 0
1933 99 0
1937 99 0
1941 99 0
1945 99 0
1949 99 0
1953 100 0
1956 101 0
1960 102 0
1964 103 0
1968 105 0
1971 106 0
1975 108 0
1979 110 0
1982 111 0
1986 113 0
1990 115 0
1993 116 0
1997 117 0
2001 117 0
2005 118 0
2009 117 0
2013 117 0
2017 116 0
2021 115 0
2025 113 0
2028 111 0
2031 109 0
2035 106 0
2038 104 0
2041 101 0
2044 99 0
2047 97 0
2050 94 0
2054 92 0
2057 90 0
2061 88 0
2064 86 0
2068 84 0
2072 83 0
2075 81 0
2079 79 0
2082 77 0
2086 75 0
2089 73 0
2092 71 0
2096 69 0
2099 66 0
2102 64 0
2106 62 0
2109 60 0
2112 58 0
2116 56 0
2119 54 0
2123 52 0
2127 51 0
2130 49 0
2134 48 0
2138 46 0
2142 45 0
2145 43 0
2149 41 0
2153 40 0
2156 38 0
2160 36 0
2163 34 0
2167 33 0
2170 31 0
2174 29 0
2178 27 0
2181 26 0
2185 24 0
2189 22 0
2192 21 0
2196 19 0
2199 17 0
2203 15 0
2206 14 0
2210 12 0
2214 10 0
2217 8 0
2221 7 0
2225 6 0
2229 4 0
2232 3 0
2236 2 0
2240 1 0
2244 1 0
2248 0 0
2252 0 0
end frb_curve_t