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 = 33
|   Segment [0] from curve   56
|      660 samples [1733..2392]
|     0.084 of the curve [0.221__0.304]
|   Segment [1] from curve   57 (reversed)
|      533 samples [1060..1592]
|     0.091 of the curve [0.182__0.273]
| 
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 533
0 0 0
4 -2 0
7 -3 0
11 -5 0
14 -7 0
17 -10 0
21 -12 0
24 -15 0
27 -17 0
29 -20 0
32 -23 0
35 -26 0
38 -29 0
41 -32 0
44 -34 0
47 -37 0
50 -39 0
54 -41 0
58 -42 0
61 -43 0
65 -44 0
69 -44 0
73 -45 0
77 -44 0
81 -44 0
85 -43 0
89 -42 0
93 -40 0
96 -39 0
100 -37 0
104 -36 0
107 -34 0
111 -32 0
115 -31 0
118 -29 0
122 -28 0
126 -27 0
130 -26 0
134 -25 0
138 -24 0
142 -24 0
146 -23 0
150 -23 0
154 -23 0
158 -22 0
162 -22 0
166 -22 0
170 -22 0
174 -22 0
178 -21 0
181 -21 0
185 -20 0
189 -19 0
193 -17 0
196 -15 0
200 -13 0
203 -10 0
206 -8 0
208 -5 0
211 -2 0
214 1 0
216 5 0
219 7 0
222 10 0
224 13 0
227 16 0
231 18 0
234 21 0
237 23 0
241 25 0
244 27 0
248 28 0
252 29 0
255 31 0
259 31 0
263 32 0
267 33 0
271 34 0
275 34 0
279 35 0
283 35 0
287 35 0
291 36 0
295 36 0
299 37 0
303 37 0
307 37 0
311 38 0
315 38 0
319 39 0
323 39 0
327 40 0
331 40 0
335 40 0
339 40 0
343 40 0
347 40 0
351 40 0
355 40 0
359 39 0
363 39 0
367 38 0
371 38 0
375 37 0
379 37 0
383 37 0
387 36 0
391 36 0
395 36 0
399 36 0
403 36 0
407 37 0
411 37 0
414 38 0
418 39 0
422 40 0
426 41 0
430 43 0
433 45 0
437 46 0
441 48 0
444 50 0
448 52 0
451 53 0
455 55 0
459 56 0
463 58 0
466 59 0
470 60 0
474 61 0
478 62 0
482 63 0
486 64 0
490 65 0
494 66 0
497 66 0
501 67 0
505 68 0
509 69 0
513 70 0
517 71 0
521 72 0
525 73 0
528 75 0
532 76 0
536 77 0
540 79 0
543 81 0
547 82 0
550 84 0
554 86 0
558 88 0
561 89 0
565 91 0
569 92 0
572 94 0
576 95 0
580 96 0
584 97 0
588 99 0
591 100 0
595 101 0
599 102 0
603 104 0
607 105 0
610 106 0
614 108 0
618 109 0
622 110 0
626 111 0
629 112 0
633 113 0
637 114 0
641 114 0
645 115 0
649 116 0
653 116 0
657 116 0
661 117 0
665 117 0
669 118 0
673 118 0
677 118 0
681 119 0
685 119 0
689 119 0
693 119 0
697 120 0
701 120 0
705 121 0
709 121 0
713 121 0
717 122 0
721 122 0
725 123 0
729 123 0
733 123 0
737 123 0
741 123 0
745 123 0
749 123 0
753 123 0
757 123 0
761 123 0
765 122 0
769 121 0
772 120 0
776 119 0
780 118 0
784 117 0
788 116 0
792 115 0
795 113 0
799 112 0
803 111 0
807 109 0
811 108 0
814 107 0
818 105 0
822 104 0
826 103 0
829 102 0
833 101 0
837 100 0
841 99 0
845 98 0
849 98 0
853 97 0
857 97 0
861 97 0
865 97 0
869 96 0
873 96 0
877 97 0
881 97 0
885 97 0
889 98 0
893 98 0
897 99 0
901 100 0
905 101 0
908 102 0
912 104 0
916 105 0
920 106 0
924 106 0
928 107 0
932 108 0
936 108 0
940 109 0
944 109 0
948 110 0
952 110 0
956 111 0
959 111 0
963 112 0
967 113 0
971 113 0
975 114 0
979 115 0
983 116 0
987 117 0
991 118 0
995 119 0
999 120 0
1002 120 0
1006 121 0
1010 121 0
1014 122 0
1018 122 0
1022 122 0
1026 122 0
1030 122 0
1034 122 0
1038 121 0
1042 121 0
1046 120 0
1050 119 0
1054 118 0
1058 117 0
1062 115 0
1065 114 0
1069 112 0
1072 110 0
1076 109 0
1080 107 0
1083 105 0
1087 104 0
1091 103 0
1095 102 0
1099 101 0
1103 101 0
1107 101 0
1111 101 0
1115 101 0
1119 101 0
1123 101 0
1127 101 0
1131 100 0
1135 100 0
1138 98 0
1142 97 0
1146 95 0
1149 93 0
1152 91 0
1156 88 0
1158 85 0
1161 82 0
1164 79 0
1166 76 0
1168 73 0
1170 69 0
1172 66 0
1174 63 0
1177 59 0
1179 56 0
1182 53 0
1185 50 0
1188 48 0
1191 46 0
1195 44 0
1198 42 0
1202 41 0
1206 40 0
1210 40 0
1214 39 0
1218 39 0
1222 39 0
1226 39 0
1230 38 0
1234 38 0
1238 37 0
1242 36 0
1246 35 0
1250 34 0
1253 33 0
1257 32 0
1261 30 0
1265 29 0
1269 28 0
1272 26 0
1276 25 0
1280 23 0
1283 22 0
1287 20 0
1291 19 0
1295 18 0
1298 16 0
1302 15 0
1306 14 0
1310 13 0
1314 12 0
1318 11 0
1322 10 0
1326 10 0
1330 10 0
1334 10 0
1338 10 0
1342 10 0
1345 11 0
1349 11 0
1353 12 0
1357 12 0
1361 13 0
1365 14 0
1369 14 0
1373 15 0
1377 15 0
1381 16 0
1385 16 0
1389 17 0
1393 17 0
1397 17 0
1401 18 0
1405 18 0
1409 19 0
1413 19 0
1417 20 0
1421 21 0
1424 23 0
1428 25 0
1432 27 0
1435 29 0
1438 31 0
1441 34 0
1444 37 0
1446 40 0
1449 43 0
1452 46 0
1455 49 0
1458 51 0
1461 54 0
1464 56 0
1467 58 0
1471 60 0
1474 62 0
1478 64 0
1482 65 0
1485 66 0
1489 68 0
1493 69 0
1497 70 0
1501 70 0
1505 71 0
1509 71 0
1513 72 0
1517 72 0
1521 72 0
1525 72 0
1529 72 0
1533 72 0
1537 72 0
1541 72 0
1545 72 0
1549 71 0
1553 71 0
1557 70 0
1561 70 0
1565 69 0
1569 69 0
1573 68 0
1577 68 0
1581 67 0
1585 67 0
1589 66 0
1593 66 0
1597 66 0
1600 65 0
1604 65 0
1608 64 0
1612 64 0
1616 63 0
1620 63 0
1624 63 0
1628 63 0
1632 63 0
1636 63 0
1640 64 0
1644 64 0
1648 64 0
1652 63 0
1656 63 0
1660 62 0
1664 61 0
1668 60 0
1671 58 0
1675 56 0
1679 54 0
1682 53 0
1686 51 0
1690 50 0
1693 48 0
1697 47 0
1701 46 0
1705 45 0
1709 44 0
1713 44 0
1717 43 0
1721 42 0
1725 42 0
1729 41 0
1733 41 0
1737 40 0
1741 40 0
1745 40 0
1749 41 0
1753 41 0
1757 41 0
1761 42 0
1764 42 0
1768 43 0
1772 44 0
1776 44 0
1780 44 0
1784 45 0
1788 45 0
1792 45 0
1796 44 0
1800 44 0
1804 44 0
1808 43 0
1812 43 0
1816 43 0
1820 43 0
1824 43 0
1828 43 0
1832 44 0
1836 45 0
1840 46 0
1844 47 0
1848 48 0
1851 50 0
1855 51 0
1859 52 0
1863 53 0
1867 53 0
1871 54 0
1875 53 0
1879 53 0
1883 51 0
1886 50 0
1890 48 0
1893 46 0
1897 44 0
1900 42 0
1903 39 0
1906 37 0
1910 35 0
1913 33 0
1917 31 0
1920 29 0
1923 26 0
1927 24 0
1930 22 0
1934 20 0
1937 18 0
1940 15 0
1943 13 0
1946 10 0
1949 8 0
1952 5 0
1956 3 0
1959 1 0
1963 -1 0
1966 -2 0
1970 -4 0
1974 -4 0
1978 -5 0
1982 -4 0
1986 -4 0
1990 -3 0
1994 -2 0
1997 0 0
end frb_curve_t