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. | | | frb_analyze | maxShift = 0.000 pixels | nSamples = 513 | | Input candidate: | Candidate index = 29 | Segment [0] from curve 44 | 1530 samples [2574..4103] | 0.308 of the curve [0.519__0.827] | Segment [1] from curve 53 (reversed) | 659 samples [4530.. 0] | 0.127 of the curve [0.873__0.000] | Candidate after realignment and trimming: | Candidate index = 29 | Segment [0] from curve 44 | 513 samples [3082..3594] | 0.103 of the curve [0.621__0.724] | Segment [1] from curve 53 (reversed) | 513 samples [4603..5115] | 0.099 of the curve [0.887__0.986] | | | side = "a" | | converted to shape function unit = 0.00529167 samples = 513 0 0 0 4 0 0 8 0 0 12 -1 0 16 -1 0 20 -1 0 24 -1 0 28 -1 0 32 -2 0 36 -2 0 40 -2 0 44 -2 0 48 -1 0 52 -1 0 56 -1 0 60 -1 0 64 -1 0 68 -1 0 72 -1 0 76 -1 0 80 -1 0 84 -1 0 88 -2 0 92 -2 0 96 -3 0 100 -4 0 104 -4 0 108 -5 0 112 -6 0 116 -6 0 120 -7 0 123 -7 0 127 -7 0 131 -8 0 135 -8 0 139 -8 0 143 -9 0 147 -9 0 151 -9 0 155 -10 0 159 -10 0 163 -10 0 167 -11 0 171 -11 0 175 -11 0 179 -12 0 183 -12 0 187 -12 0 191 -13 0 195 -13 0 199 -14 0 203 -15 0 207 -15 0 211 -17 0 215 -18 0 218 -19 0 222 -20 0 226 -22 0 230 -23 0 234 -24 0 238 -25 0 241 -26 0 245 -26 0 249 -27 0 253 -27 0 257 -27 0 261 -28 0 265 -28 0 269 -28 0 273 -28 0 277 -28 0 281 -28 0 285 -28 0 289 -28 0 293 -28 0 297 -28 0 301 -29 0 305 -29 0 309 -29 0 313 -29 0 317 -30 0 321 -30 0 325 -30 0 329 -31 0 333 -31 0 337 -32 0 341 -32 0 345 -33 0 349 -34 0 353 -35 0 356 -37 0 360 -38 0 364 -40 0 367 -42 0 371 -43 0 375 -45 0 378 -47 0 382 -48 0 386 -49 0 390 -50 0 394 -51 0 398 -52 0 402 -53 0 405 -53 0 409 -54 0 413 -54 0 417 -54 0 421 -55 0 425 -55 0 429 -56 0 433 -57 0 437 -57 0 441 -58 0 445 -59 0 449 -60 0 453 -61 0 456 -63 0 460 -64 0 464 -65 0 468 -67 0 472 -68 0 475 -69 0 479 -71 0 483 -72 0 487 -73 0 490 -74 0 494 -75 0 498 -76 0 502 -77 0 506 -77 0 510 -78 0 514 -78 0 518 -78 0 522 -78 0 526 -78 0 530 -78 0 534 -78 0 538 -78 0 542 -78 0 546 -78 0 550 -78 0 554 -78 0 558 -78 0 562 -78 0 566 -78 0 570 -78 0 574 -78 0 578 -79 0 582 -79 0 586 -80 0 590 -81 0 594 -82 0 598 -83 0 601 -84 0 605 -86 0 609 -88 0 612 -90 0 615 -92 0 618 -95 0 621 -98 0 624 -100 0 627 -103 0 629 -106 0 632 -109 0 635 -112 0 637 -115 0 640 -118 0 643 -121 0 647 -123 0 650 -125 0 654 -127 0 657 -128 0 661 -129 0 665 -131 0 669 -132 0 673 -133 0 677 -133 0 681 -134 0 684 -135 0 688 -136 0 692 -138 0 696 -139 0 700 -140 0 703 -141 0 707 -143 0 711 -144 0 715 -146 0 718 -147 0 722 -149 0 726 -150 0 730 -151 0 734 -152 0 738 -153 0 741 -154 0 745 -154 0 749 -155 0 753 -155 0 757 -156 0 761 -156 0 765 -157 0 769 -157 0 773 -157 0 777 -158 0 781 -158 0 785 -159 0 789 -160 0 793 -161 0 797 -161 0 801 -162 0 805 -162 0 809 -162 0 813 -162 0 817 -161 0 821 -160 0 824 -159 0 828 -157 0 832 -155 0 835 -153 0 839 -152 0 842 -150 0 846 -148 0 849 -146 0 853 -144 0 856 -142 0 860 -140 0 863 -139 0 867 -137 0 871 -135 0 874 -133 0 878 -132 0 882 -131 0 886 -129 0 889 -128 0 893 -127 0 897 -127 0 901 -126 0 905 -126 0 909 -126 0 913 -126 0 917 -125 0 921 -125 0 925 -125 0 929 -125 0 933 -125 0 937 -125 0 941 -125 0 945 -125 0 949 -125 0 953 -125 0 957 -125 0 961 -124 0 965 -125 0 969 -125 0 973 -125 0 977 -125 0 981 -125 0 985 -125 0 989 -125 0 993 -126 0 997 -126 0 1001 -127 0 1005 -127 0 1009 -127 0 1013 -128 0 1017 -128 0 1021 -128 0 1025 -128 0 1029 -128 0 1033 -128 0 1037 -127 0 1041 -127 0 1045 -126 0 1049 -125 0 1053 -124 0 1057 -123 0 1060 -122 0 1064 -120 0 1068 -119 0 1072 -117 0 1075 -116 0 1079 -114 0 1082 -112 0 1086 -111 0 1090 -109 0 1093 -107 0 1097 -106 0 1101 -104 0 1104 -102 0 1108 -101 0 1111 -99 0 1115 -97 0 1119 -96 0 1122 -94 0 1126 -92 0 1130 -90 0 1133 -89 0 1137 -87 0 1141 -86 0 1144 -84 0 1148 -83 0 1152 -83 0 1156 -82 0 1160 -82 0 1164 -82 0 1168 -82 0 1172 -83 0 1176 -84 0 1180 -84 0 1184 -85 0 1188 -85 0 1192 -85 0 1196 -85 0 1200 -84 0 1204 -84 0 1208 -83 0 1212 -82 0 1215 -81 0 1219 -79 0 1223 -78 0 1227 -77 0 1230 -75 0 1234 -73 0 1238 -72 0 1241 -70 0 1245 -68 0 1249 -67 0 1252 -65 0 1256 -63 0 1259 -61 0 1262 -59 0 1266 -56 0 1269 -54 0 1272 -52 0 1275 -49 0 1278 -47 0 1281 -44 0 1285 -42 0 1288 -39 0 1291 -37 0 1294 -35 0 1298 -33 0 1301 -31 0 1305 -29 0 1309 -28 0 1313 -27 0 1316 -26 0 1320 -25 0 1324 -24 0 1328 -23 0 1332 -22 0 1336 -21 0 1340 -20 0 1344 -19 0 1348 -18 0 1351 -17 0 1355 -16 0 1359 -15 0 1363 -14 0 1367 -13 0 1371 -12 0 1375 -11 0 1379 -10 0 1383 -10 0 1386 -9 0 1390 -8 0 1394 -8 0 1398 -7 0 1402 -6 0 1406 -4 0 1410 -3 0 1413 -1 0 1417 0 0 1421 2 0 1424 3 0 1428 4 0 1432 5 0 1436 6 0 1440 6 0 1444 6 0 1448 6 0 1452 6 0 1456 5 0 1460 5 0 1464 4 0 1468 4 0 1472 4 0 1476 3 0 1480 3 0 1484 3 0 1488 3 0 1492 3 0 1496 2 0 1500 2 0 1504 2 0 1508 2 0 1512 2 0 1516 2 0 1520 3 0 1524 4 0 1527 5 0 1531 7 0 1535 9 0 1538 11 0 1541 13 0 1545 15 0 1548 18 0 1551 20 0 1554 22 0 1558 24 0 1561 26 0 1565 28 0 1568 30 0 1572 31 0 1576 32 0 1580 33 0 1584 34 0 1588 34 0 1592 34 0 1596 34 0 1600 34 0 1604 34 0 1608 34 0 1612 34 0 1616 34 0 1620 34 0 1624 34 0 1628 35 0 1632 35 0 1636 36 0 1640 37 0 1643 39 0 1647 40 0 1650 42 0 1654 44 0 1657 46 0 1661 48 0 1664 50 0 1668 52 0 1672 53 0 1675 55 0 1679 56 0 1683 57 0 1687 57 0 1691 57 0 1695 57 0 1699 57 0 1703 57 0 1707 57 0 1711 56 0 1715 55 0 1719 55 0 1723 54 0 1727 53 0 1731 52 0 1734 51 0 1738 50 0 1742 48 0 1746 47 0 1750 46 0 1754 45 0 1757 44 0 1761 43 0 1765 42 0 1769 41 0 1773 41 0 1777 40 0 1781 40 0 1785 39 0 1789 38 0 1793 38 0 1797 37 0 1801 37 0 1805 36 0 1809 35 0 1812 34 0 1816 32 0 1820 31 0 1824 30 0 1827 28 0 1831 27 0 1835 25 0 1839 24 0 1842 22 0 1846 20 0 1849 18 0 1853 16 0 1856 14 0 1859 12 0 1863 9 0 1866 7 0 1870 5 0 1873 4 0 1877 2 0 1881 1 0 1885 1 0 1889 0 0 1893 0 0 1897 1 0 1901 1 0 1905 1 0 1909 1 0 1913 2 0 1917 2 0 1921 2 0 1925 2 0 1929 2 0 1933 2 0 1937 2 0 1941 2 0 1945 2 0 1949 1 0 1953 1 0 1956 0 0 end frb_curve_t