begin frb_curve_t (format of 2004-04-30)
| Input candidate set:
| Last edited on 2005-01-01 23:36:33 by stolfi
| 
| True and recognizable candidates
| Essentially entered by hand
| Some of them refined with PZRefineCands
| 
| Input candidate:
|   Candidate index = 43
|   Segment [0] from curve   11
|      591 samples [2440..3030]
|     0.118 of the curve [0.487__0.605]
|   Segment [1] from curve   15 (reversed)
|      601 samples [ 761..1361]
|     0.124 of the curve [0.157__0.280]
| 
| 
| 
| side = "b"
| 
| converted to shape function
unit = 0.00529167
samples = 601
0 0 0
4 -2 0
7 -3 0
11 -5 0
15 -6 0
19 -8 0
22 -9 0
26 -9 0
30 -10 0
34 -10 0
38 -10 0
42 -10 0
46 -10 0
50 -10 0
54 -10 0
58 -10 0
62 -10 0
66 -10 0
70 -10 0
74 -10 0
78 -10 0
82 -10 0
86 -10 0
90 -10 0
94 -9 0
98 -9 0
102 -8 0
106 -6 0
109 -5 0
113 -4 0
117 -2 0
120 0 0
124 2 0
128 3 0
131 5 0
135 7 0
139 8 0
142 10 0
146 11 0
150 13 0
153 14 0
157 15 0
161 17 0
165 18 0
169 19 0
173 20 0
176 21 0
180 23 0
184 24 0
188 25 0
192 26 0
195 28 0
199 29 0
203 31 0
206 33 0
210 35 0
213 37 0
217 39 0
220 41 0
223 43 0
227 45 0
230 48 0
233 50 0
237 52 0
240 54 0
244 56 0
247 57 0
251 59 0
255 60 0
259 61 0
263 62 0
267 62 0
271 63 0
275 64 0
278 64 0
282 65 0
286 66 0
290 67 0
294 68 0
298 69 0
302 70 0
306 71 0
310 72 0
313 73 0
317 74 0
321 75 0
325 76 0
329 77 0
333 78 0
336 80 0
340 81 0
344 82 0
348 84 0
352 85 0
355 86 0
359 88 0
363 89 0
366 91 0
370 92 0
374 93 0
378 95 0
382 96 0
386 97 0
389 97 0
393 98 0
397 99 0
401 100 0
405 100 0
409 101 0
413 101 0
417 102 0
421 102 0
425 103 0
429 104 0
433 105 0
437 106 0
441 107 0
444 108 0
448 109 0
452 110 0
456 111 0
460 111 0
464 112 0
468 113 0
472 113 0
476 113 0
480 113 0
484 113 0
488 112 0
492 112 0
496 111 0
500 111 0
504 110 0
508 110 0
512 110 0
516 110 0
520 110 0
524 110 0
528 110 0
532 110 0
536 111 0
540 111 0
544 111 0
548 112 0
552 112 0
556 113 0
560 113 0
563 114 0
567 115 0
571 115 0
575 116 0
579 116 0
583 117 0
587 117 0
591 118 0
595 118 0
599 119 0
603 120 0
607 120 0
611 121 0
615 122 0
619 123 0
622 125 0
626 126 0
630 128 0
633 130 0
637 131 0
640 133 0
644 135 0
647 138 0
651 140 0
654 142 0
657 144 0
661 146 0
664 149 0
667 151 0
671 153 0
674 155 0
678 156 0
682 158 0
685 159 0
689 160 0
693 161 0
697 161 0
701 162 0
705 162 0
709 162 0
713 162 0
717 161 0
721 161 0
725 161 0
729 160 0
733 160 0
737 159 0
741 159 0
745 158 0
749 157 0
753 157 0
757 156 0
761 155 0
765 154 0
768 153 0
772 152 0
776 151 0
780 150 0
784 149 0
788 148 0
792 147 0
796 146 0
799 145 0
803 144 0
807 143 0
811 142 0
815 140 0
819 139 0
822 138 0
826 136 0
830 135 0
833 133 0
837 132 0
841 131 0
845 129 0
848 128 0
852 126 0
856 125 0
860 124 0
863 122 0
867 121 0
871 120 0
875 119 0
879 118 0
883 117 0
887 116 0
891 116 0
894 115 0
898 114 0
902 113 0
906 111 0
910 109 0
913 108 0
917 105 0
920 103 0
923 101 0
927 99 0
930 97 0
933 95 0
937 93 0
940 91 0
944 89 0
948 88 0
951 86 0
955 85 0
959 84 0
963 84 0
967 83 0
971 82 0
975 82 0
979 81 0
983 80 0
987 79 0
991 78 0
995 77 0
998 76 0
1002 75 0
1006 74 0
1010 73 0
1014 71 0
1017 70 0
1021 69 0
1025 68 0
1029 67 0
1033 66 0
1037 65 0
1041 64 0
1045 64 0
1049 64 0
1053 64 0
1057 64 0
1061 64 0
1065 65 0
1069 66 0
1072 66 0
1076 67 0
1080 67 0
1084 68 0
1088 69 0
1092 69 0
1096 70 0
1100 71 0
1104 71 0
1108 72 0
1112 73 0
1116 74 0
1120 75 0
1123 76 0
1127 77 0
1131 78 0
1135 80 0
1139 81 0
1142 83 0
1146 84 0
1150 86 0
1153 87 0
1157 88 0
1161 89 0
1165 90 0
1169 91 0
1173 91 0
1177 92 0
1181 91 0
1185 91 0
1189 90 0
1193 89 0
1196 88 0
1200 87 0
1204 86 0
1208 84 0
1211 82 0
1215 81 0
1219 79 0
1222 77 0
1226 75 0
1229 73 0
1233 71 0
1236 69 0
1240 67 0
1243 65 0
1246 63 0
1250 61 0
1253 59 0
1256 56 0
1260 54 0
1263 52 0
1267 50 0
1270 48 0
1274 47 0
1277 45 0
1281 44 0
1285 43 0
1289 42 0
1293 42 0
1297 42 0
1301 42 0
1305 42 0
1309 43 0
1313 43 0
1317 44 0
1321 44 0
1325 45 0
1329 45 0
1333 45 0
1337 45 0
1341 45 0
1345 44 0
1349 44 0
1353 43 0
1357 43 0
1361 42 0
1365 42 0
1369 42 0
1373 42 0
1377 42 0
1381 42 0
1385 42 0
1389 43 0
1393 43 0
1396 44 0
1400 44 0
1404 44 0
1408 45 0
1412 45 0
1416 46 0
1420 46 0
1424 47 0
1428 48 0
1432 49 0
1436 49 0
1440 51 0
1444 52 0
1447 53 0
1451 55 0
1454 57 0
1458 59 0
1461 62 0
1464 65 0
1466 68 0
1469 71 0
1472 73 0
1474 77 0
1477 80 0
1480 83 0
1483 85 0
1485 88 0
1488 91 0
1491 94 0
1494 96 0
1497 99 0
1500 102 0
1503 104 0
1507 106 0
1510 108 0
1514 110 0
1517 112 0
1521 113 0
1525 115 0
1529 116 0
1533 116 0
1537 117 0
1541 117 0
1545 117 0
1549 117 0
1553 117 0
1557 117 0
1561 117 0
1564 117 0
1569 117 0
1572 117 0
1577 117 0
1581 117 0
1585 117 0
1589 118 0
1593 118 0
1597 118 0
1601 117 0
1605 117 0
1608 117 0
1612 117 0
1617 117 0
1621 117 0
1625 117 0
1629 117 0
1633 117 0
1637 116 0
1641 116 0
1644 116 0
1648 116 0
1652 115 0
1656 115 0
1660 114 0
1664 114 0
1668 114 0
1672 113 0
1676 113 0
1680 113 0
1684 113 0
1688 112 0
1692 112 0
1696 112 0
1700 112 0
1704 112 0
1708 111 0
1712 111 0
1716 110 0
1720 110 0
1724 109 0
1728 108 0
1732 107 0
1736 106 0
1740 105 0
1743 104 0
1747 102 0
1751 101 0
1755 99 0
1758 98 0
1762 97 0
1766 95 0
1770 94 0
1773 93 0
1777 91 0
1781 90 0
1785 89 0
1788 87 0
1792 86 0
1796 85 0
1800 83 0
1804 82 0
1807 80 0
1811 79 0
1814 77 0
1818 75 0
1821 73 0
1825 71 0
1828 69 0
1832 67 0
1836 66 0
1839 64 0
1843 63 0
1847 62 0
1851 61 0
1855 60 0
1859 60 0
1863 60 0
1867 60 0
1871 59 0
1875 59 0
1879 59 0
1883 59 0
1887 59 0
1891 59 0
1895 59 0
1899 59 0
1903 58 0
1907 58 0
1911 57 0
1915 56 0
1919 55 0
1922 55 0
1926 54 0
1930 53 0
1934 52 0
1938 51 0
1942 49 0
1946 48 0
1949 47 0
1953 45 0
1957 44 0
1960 42 0
1964 40 0
1967 38 0
1971 36 0
1975 35 0
1978 33 0
1982 31 0
1985 29 0
1989 27 0
1992 26 0
1996 24 0
2000 23 0
2004 21 0
2007 20 0
2011 19 0
2015 19 0
2019 18 0
2023 18 0
2027 19 0
2031 19 0
2035 19 0
2039 19 0
2043 20 0
2047 20 0
2051 19 0
2055 19 0
2059 19 0
2063 19 0
2067 18 0
2071 18 0
2075 18 0
2079 19 0
2083 19 0
2087 19 0
2091 20 0
2095 21 0
2099 21 0
2103 22 0
2107 22 0
2111 22 0
2115 22 0
2119 21 0
2123 21 0
2127 20 0
2131 19 0
2135 18 0
2138 17 0
2142 16 0
2146 14 0
2150 13 0
2154 12 0
2157 11 0
2161 9 0
2165 8 0
2169 7 0
2173 6 0
2177 6 0
2181 5 0
2185 4 0
2189 4 0
2192 3 0
2196 2 0
2200 1 0
2204 0 0
2208 -1 0
2212 -2 0
2216 -3 0
2220 -4 0
2224 -4 0
2228 -5 0
2232 -5 0
2236 -5 0
2240 -5 0
2244 -5 0
2248 -5 0
2252 -4 0
2256 -3 0
2259 -3 0
2263 -2 0
2267 -1 0
2271 -1 0
2275 0 0
2279 0 0
2283 0 0
2287 0 0
end frb_curve_t