# # Minimal weight irreducible polynomials over GF(2) # In addition the coefficients/bits (apart from the # constant and the leading term) are as close to # the low end as possible. # These are _not_ primitive in general. #. # Generated by Joerg Arndt, 2003-January-31 # 2,1,0 3,1,0 4,1,0 5,2,0 6,1,0 7,1,0 8,4,3,1,0 9,1,0 10,3,0 11,2,0 12,3,0 13,4,3,1,0 14,5,0 15,1,0 16,5,3,1,0 17,3,0 18,3,0 19,5,2,1,0 20,3,0 21,2,0 22,1,0 23,5,0 24,4,3,1,0 25,3,0 26,4,3,1,0 27,5,2,1,0 28,1,0 29,2,0 30,1,0 31,3,0 32,7,3,2,0 33,10,0 34,7,0 35,2,0 36,9,0 37,6,4,1,0 38,6,5,1,0 39,4,0 40,5,4,3,0 41,3,0 42,7,0 43,6,4,3,0 44,5,0 45,4,3,1,0 46,1,0 47,5,0 48,5,3,2,0 49,9,0 50,4,3,2,0 51,6,3,1,0 52,3,0 53,6,2,1,0 54,9,0 55,7,0 56,7,4,2,0 57,4,0 58,19,0 59,7,4,2,0 60,1,0 61,5,2,1,0 62,29,0 63,1,0 64,4,3,1,0 65,18,0 66,3,0 67,5,2,1,0 68,9,0 69,6,5,2,0 70,5,3,1,0 71,6,0 72,10,9,3,0 73,25,0 74,35,0 75,6,3,1,0 76,21,0 77,6,5,2,0 78,6,5,3,0 79,9,0 80,9,4,2,0 81,4,0 82,8,3,1,0 83,7,4,2,0 84,5,0 85,8,2,1,0 86,21,0 87,13,0 88,7,6,2,0 89,38,0 90,27,0 91,8,5,1,0 92,21,0 93,2,0 94,21,0 95,11,0 96,10,9,6,0 97,6,0 98,11,0 99,6,3,1,0 100,15,0 101,7,6,1,0 102,29,0 103,9,0 104,4,3,1,0 105,4,0 106,15,0 107,9,7,4,0 108,17,0 109,5,4,2,0 110,33,0 111,10,0 112,5,4,3,0 113,9,0 114,5,3,2,0 115,8,7,5,0 116,4,2,1,0 117,5,2,1,0 118,33,0 119,8,0 120,4,3,1,0 121,18,0 122,6,2,1,0 123,2,0 124,19,0 125,7,6,5,0 126,21,0 127,1,0 128,7,2,1,0 129,5,0 130,3,0 131,8,3,2,0 132,17,0 133,9,8,2,0 134,57,0 135,11,0 136,5,3,2,0 137,21,0 138,8,7,1,0 139,8,5,3,0 140,15,0 141,10,4,1,0 142,21,0 143,5,3,2,0 144,7,4,2,0 145,52,0 146,71,0 147,14,0 148,27,0 149,10,9,7,0 150,53,0 151,3,0 152,6,3,2,0 153,1,0 154,15,0 155,62,0 156,9,0 157,6,5,2,0 158,8,6,5,0 159,31,0 160,5,3,2,0 161,18,0 162,27,0 163,7,6,3,0 164,10,8,7,0 165,9,8,3,0 166,37,0 167,6,0 168,15,3,2,0 169,34,0 170,11,0 171,6,5,2,0 172,1,0 173,8,5,2,0 174,13,0 175,6,0 176,11,3,2,0 177,8,0 178,31,0 179,4,2,1,0 180,3,0 181,7,6,1,0 182,81,0 183,56,0 184,9,8,7,0 185,24,0 186,11,0 187,7,6,5,0 188,6,5,2,0 189,6,5,2,0 190,8,7,6,0 191,9,0 192,7,2,1,0 193,15,0 194,87,0 195,8,3,2,0 196,3,0 197,9,4,2,0 198,9,0 199,34,0 200,5,3,2,0 201,14,0 202,55,0 203,8,7,1,0 204,27,0 205,9,5,2,0 206,10,9,5,0 207,43,0 208,9,3,1,0 209,6,0 210,7,0 211,11,10,8,0 212,105,0 213,6,5,2,0 214,73,0 215,23,0 216,7,3,1,0 217,45,0 218,11,0 219,8,4,1,0 220,7,0 221,8,6,2,0 222,5,4,2,0 223,33,0 224,9,8,3,0 225,32,0 226,10,7,3,0 227,10,9,4,0 228,113,0 229,10,4,1,0 230,8,7,6,0 231,26,0 232,9,4,2,0 233,74,0 234,31,0 235,9,6,1,0 236,5,0 237,7,4,1,0 238,73,0 239,36,0 240,8,5,3,0 241,70,0 242,95,0 243,8,5,1,0 244,111,0 245,6,4,1,0 246,11,2,1,0 247,82,0 248,15,14,10,0 249,35,0 250,103,0 251,7,4,2,0 252,15,0 253,46,0 254,7,2,1,0 255,52,0 256,10,5,2,0 257,12,0 258,71,0 259,10,6,2,0 260,15,0 261,7,6,4,0 262,9,8,4,0 263,93,0 264,9,6,2,0 265,42,0 266,47,0 267,8,6,3,0 268,25,0 269,7,6,1,0 270,53,0 271,58,0 272,9,3,2,0 273,23,0 274,67,0 275,11,10,9,0 276,63,0 277,12,6,3,0 278,5,0 279,5,0 280,9,5,2,0 281,93,0 282,35,0 283,12,7,5,0 284,53,0 285,10,7,5,0 286,69,0 287,71,0 288,11,10,1,0 289,21,0 290,5,3,2,0 291,12,11,5,0 292,37,0 293,11,6,1,0 294,33,0 295,48,0 296,7,3,2,0 297,5,0 298,11,8,4,0 299,11,6,4,0 300,5,0 301,9,5,2,0 302,41,0 303,1,0 304,11,2,1,0 305,102,0 306,7,3,1,0 307,8,4,2,0 308,15,0 309,10,6,4,0 310,93,0 311,7,5,3,0 312,9,7,4,0 313,79,0 314,15,0 315,10,9,1,0 316,63,0 317,7,4,2,0 318,45,0 319,36,0 320,4,3,1,0 321,31,0 322,67,0 323,10,3,1,0 324,51,0 325,10,5,2,0 326,10,3,1,0 327,34,0 328,8,3,1,0 329,50,0 330,99,0 331,10,6,2,0 332,89,0 333,2,0 334,5,2,1,0 335,10,7,2,0 336,7,4,1,0 337,55,0 338,4,3,1,0 339,16,10,7,0 340,45,0 341,10,8,6,0 342,125,0 343,75,0 344,7,2,1,0 345,22,0 346,63,0 347,11,10,3,0 348,103,0 349,6,5,2,0 350,53,0 351,34,0 352,13,11,6,0 353,69,0 354,99,0 355,6,5,1,0 356,10,9,7,0 357,11,10,2,0 358,57,0 359,68,0 360,5,3,2,0 361,7,4,1,0 362,63,0 363,8,5,3,0 364,9,0 365,9,6,5,0 366,29,0 367,21,0 368,7,3,2,0 369,91,0 370,139,0 371,8,3,2,0 372,111,0 373,8,7,2,0 374,8,6,5,0 375,16,0 376,8,7,5,0 377,41,0 378,43,0 379,10,8,5,0 380,47,0 381,5,2,1,0 382,81,0 383,90,0 384,12,3,2,0 385,6,0 386,83,0 387,8,7,1,0 388,159,0 389,10,9,5,0 390,9,0 391,28,0 392,13,10,6,0 393,7,0 394,135,0 395,11,6,5,0 396,25,0 397,12,7,6,0 398,7,6,2,0 399,26,0 400,5,3,2,0 401,152,0 402,171,0 403,9,8,5,0 404,65,0 405,13,8,2,0 406,141,0 407,71,0 408,5,3,2,0 409,87,0 410,10,4,3,0 411,12,10,3,0 412,147,0 413,10,7,6,0 414,13,0 415,102,0 416,9,5,2,0 417,107,0 418,199,0 419,15,5,4,0 420,7,0 421,5,4,2,0 422,149,0 423,25,0 424,9,7,2,0 425,12,0 426,63,0 427,11,6,5,0 428,105,0 429,10,8,7,0 430,14,6,1,0 431,120,0 432,13,4,3,0 433,33,0 434,12,11,5,0 435,12,9,5,0 436,165,0 437,6,2,1,0 438,65,0 439,49,0 440,4,3,1,0 441,7,0 442,7,5,2,0 443,10,6,1,0 444,81,0 445,7,6,4,0 446,105,0 447,73,0