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 = 21
|   Segment [0] from curve   26
|      600 samples [ 188.. 787]
|     0.098 of the curve [0.031__0.128]
|   Segment [1] from curve   40 (reversed)
|      600 samples [1003..1602]
|     0.125 of the curve [0.208__0.333]
| 
| 
| 
| side = "a"
| 
| converted to shape function
unit = 0.00529167
samples = 600
0 0 0
4 1 0
8 2 0
11 4 0
15 5 0
19 7 0
23 8 0
27 9 0
30 10 0
34 10 0
38 11 0
42 10 0
46 10 0
50 9 0
54 8 0
58 6 0
61 5 0
65 3 0
68 0 0
71 -2 0
75 -4 0
78 -6 0
81 -9 0
85 -11 0
88 -13 0
91 -16 0
95 -18 0
98 -20 0
102 -21 0
105 -23 0
109 -24 0
113 -25 0
117 -26 0
121 -27 0
125 -27 0
129 -28 0
133 -28 0
137 -28 0
141 -28 0
145 -27 0
149 -27 0
153 -26 0
157 -26 0
161 -25 0
165 -24 0
169 -24 0
172 -23 0
176 -23 0
180 -22 0
184 -22 0
188 -21 0
192 -21 0
196 -21 0
200 -21 0
204 -21 0
208 -21 0
212 -21 0
216 -21 0
220 -21 0
224 -21 0
228 -21 0
232 -22 0
236 -22 0
240 -23 0
244 -23 0
248 -24 0
252 -25 0
256 -26 0
260 -27 0
264 -28 0
268 -29 0
272 -29 0
276 -30 0
280 -30 0
284 -30 0
288 -29 0
291 -29 0
295 -28 0
299 -26 0
303 -25 0
307 -23 0
310 -22 0
314 -20 0
317 -18 0
320 -15 0
324 -13 0
327 -11 0
330 -8 0
333 -6 0
336 -3 0
340 -1 0
343 2 0
346 4 0
349 7 0
352 9 0
355 12 0
358 15 0
361 17 0
364 20 0
367 22 0
370 25 0
373 27 0
376 30 0
379 33 0
382 35 0
385 38 0
388 40 0
392 43 0
395 45 0
398 47 0
402 49 0
405 51 0
409 53 0
412 55 0
416 56 0
420 58 0
423 60 0
427 61 0
431 62 0
435 64 0
438 65 0
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446 68 0
450 69 0
453 71 0
457 72 0
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465 75 0
468 77 0
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487 83 0
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495 85 0
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507 86 0
511 87 0
515 87 0
519 87 0
523 87 0
527 87 0
531 87 0
535 87 0
539 87 0
543 87 0
547 88 0
551 88 0
555 88 0
559 89 0
563 89 0
567 90 0
571 91 0
575 91 0
578 92 0
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586 94 0
590 94 0
594 95 0
598 95 0
602 95 0
606 95 0
610 95 0
614 95 0
618 94 0
622 94 0
626 93 0
630 92 0
634 92 0
638 91 0
642 91 0
646 91 0
650 90 0
654 90 0
658 90 0
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666 90 0
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674 91 0
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693 96 0
697 97 0
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709 99 0
713 100 0
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725 100 0
729 100 0
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737 100 0
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745 100 0
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785 97 0
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797 97 0
801 97 0
805 98 0
809 98 0
813 99 0
816 100 0
820 101 0
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832 104 0
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840 106 0
843 108 0
847 109 0
851 110 0
855 111 0
859 113 0
862 114 0
866 115 0
870 116 0
874 117 0
878 118 0
882 119 0
886 120 0
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893 122 0
897 122 0
901 123 0
905 123 0
909 124 0
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925 125 0
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937 125 0
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953 123 0
957 123 0
961 122 0
965 121 0
969 120 0
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977 118 0
980 117 0
984 116 0
988 115 0
992 114 0
996 113 0
1000 112 0
1004 111 0
1008 110 0
1011 109 0
1015 108 0
1019 108 0
1023 107 0
1027 106 0
1031 106 0
1035 105 0
1039 104 0
1043 104 0
1047 103 0
1051 102 0
1055 101 0
1058 100 0
1062 99 0
1066 97 0
1070 96 0
1074 95 0
1078 94 0
1081 93 0
1085 92 0
1089 91 0
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1097 90 0
1101 90 0
1105 90 0
1109 91 0
1113 91 0
1117 91 0
1121 92 0
1125 93 0
1129 94 0
1133 95 0
1137 95 0
1141 96 0
1145 97 0
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1152 99 0
1156 100 0
1160 100 0
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1172 103 0
1176 104 0
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1191 108 0
1195 108 0
1199 109 0
1203 109 0
1207 108 0
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1215 108 0
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1223 106 0
1227 106 0
1231 106 0
1235 106 0
1239 106 0
1243 106 0
1247 107 0
1251 107 0
1255 108 0
1259 109 0
1263 110 0
1267 111 0
1270 112 0
1274 113 0
1278 114 0
1282 115 0
1286 116 0
1290 117 0
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1302 119 0
1306 119 0
1310 118 0
1314 118 0
1318 117 0
1321 116 0
1325 115 0
1329 113 0
1332 111 0
1335 109 0
1339 106 0
1342 104 0
1345 101 0
1348 99 0
1351 96 0
1354 94 0
1357 91 0
1361 89 0
1364 87 0
1368 86 0
1372 84 0
1376 83 0
1379 82 0
1383 82 0
1387 81 0
1391 80 0
1395 80 0
1399 79 0
1403 78 0
1407 77 0
1411 76 0
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1422 72 0
1426 71 0
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1456 61 0
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1496 60 0
1500 60 0
1504 61 0
1508 62 0
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1527 68 0
1530 70 0
1534 71 0
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1566 74 0
1570 74 0
1574 74 0
1578 73 0
1582 72 0
1586 71 0
1590 70 0
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1601 66 0
1604 64 0
1608 62 0
1612 60 0
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1622 55 0
1626 54 0
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1634 51 0
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1677 53 0
1681 54 0
1685 56 0
1688 57 0
1692 58 0
1696 59 0
1700 61 0
1703 62 0
1707 63 0
1711 65 0
1715 66 0
1718 68 0
1722 69 0
1726 71 0
1729 72 0
1733 74 0
1737 76 0
1740 77 0
1744 79 0
1748 80 0
1752 82 0
1755 84 0
1759 85 0
1763 87 0
1766 88 0
1770 90 0
1774 91 0
1778 92 0
1781 93 0
1785 94 0
1789 95 0
1793 96 0
1797 96 0
1801 96 0
1805 96 0
1809 96 0
1813 96 0
1817 95 0
1821 94 0
1825 94 0
1829 93 0
1833 92 0
1837 91 0
1841 90 0
1844 89 0
1848 87 0
1852 86 0
1855 84 0
1859 82 0
1862 79 0
1865 77 0
1868 75 0
1871 72 0
1875 69 0
1878 67 0
1881 65 0
1884 62 0
1887 60 0
1891 58 0
1894 56 0
1898 55 0
1902 53 0
1906 52 0
1909 50 0
1913 49 0
1917 48 0
1921 47 0
1925 47 0
1929 46 0
1933 45 0
1937 44 0
1941 44 0
1945 43 0
1949 42 0
1952 42 0
1956 41 0
1960 41 0
1964 41 0
1968 40 0
1972 39 0
1976 39 0
1980 38 0
1984 37 0
1988 36 0
1992 35 0
1996 35 0
2000 34 0
2004 33 0
2008 33 0
2012 32 0
2016 32 0
2020 31 0
2024 31 0
2028 31 0
2032 31 0
2036 30 0
2039 30 0
2043 29 0
2047 28 0
2051 27 0
2055 26 0
2059 25 0
2063 23 0
2066 22 0
2070 20 0
2074 18 0
2077 17 0
2081 15 0
2085 14 0
2088 13 0
2092 11 0
2096 11 0
2100 10 0
2104 9 0
2108 9 0
2112 9 0
2116 8 0
2120 8 0
2124 8 0
2128 8 0
2132 8 0
2136 7 0
2140 7 0
2144 7 0
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2156 7 0
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2164 7 0
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2172 6 0
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2192 5 0
2196 5 0
2200 5 0
2204 5 0
2208 6 0
2212 6 0
2216 6 0
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2224 7 0
2228 7 0
2232 7 0
2236 7 0
2240 8 0
2244 8 0
2248 8 0
2252 8 0
2256 8 0
2260 7 0
2264 7 0
2268 6 0
2272 5 0
2276 4 0
2279 3 0
2283 2 0
2287 1 0
2291 0 0
end frb_curve_t