generated by substitutions:: A001030 , A007001 , A006697 , A006977 , A006978
Genocchi medians: A005439
Genocchi numbers , sequences related to (start):
Genocchi numbers: A001469 *, A036968
Genocchi numbers: see also A002317
genus, of modular group, A001617 , A001767
genus-1:: A006387 , A006386 , A006295 , A006297 , A006296
genus:: A003639 , A003638 , A000933 , A003636 , A003637 , A003171 , A003644 , A005527 , A000934 , A005431 , A005525 , A005526 , A006298 , A006299 , A006301
geometrical configurations: see configurations
geometries : A002773 *, A004069 , A031501
geometries, linear: A001200 *, A001548 * (connected), A005426
geometries: see also matroids
Germain primes: see primes, Germain
German: A007208 , A037199 , A037200 , A001061
GF(2)[X]-polynomials , sequences containing or operating on (start): (These sequences assume that the GF(2)[X]-polynomial is encoded in binary expansion of n like this: n=11, 1011 in binary, stands for polynomial x^3+x+1, n=25, 11001 in binary, stands for polynomial x^4+x^3+1)
GF(2)[X]-polynomials, addition table, i.e. XOR(x,y), A003987
GF(2)[X]-polynomials, bijections from/to natural numbers, preserving multiplicative structures, A091202 -A091203 , A091204 -A091205
GF(2)[X]-polynomials, GCD(x,y), table of, A091255
GF(2)[X]-polynomials, irreducible and also prime in N, A091206
GF(2)[X]-polynomials, irreducible and non-primitive, A091252
GF(2)[X]-polynomials, irreducible and primitive, A091250 *, A058947 , A011260
GF(2)[X]-polynomials, irreducible but composite in N, A091214
GF(2)[X]-polynomials, irreducible, A014580 *, A058943 , A001037
GF(2)[X]-polynomials, irreducible, characteristic function, A091225
GF(2)[X]-polynomials, irreducible, order of each, A059478
GF(2)[X]-polynomials, LCM(x,y), table of, A091256
GF(2)[X]-polynomials, Matula-Goebel-tree analogues, A091238 , A091239 , A091240
GF(2)[X]-polynomials, Moebius-analogue, A091219
GF(2)[X]-polynomials, multiples of x+1, A048724
GF(2)[X]-polynomials, multiples of x+1, shifted once right, A003188
GF(2)[X]-polynomials, multiples of x^2+1, A048725
GF(2)[X]-polynomials, multiples of x^2+x+1, A048727
GF(2)[X]-polynomials, multiples of x^2+x, A048726
GF(2)[X]-polynomials, multiplication table, A048720 , A091257
GF(2)[X]-polynomials, number of distinct irreducible divisors, A091221
GF(2)[X]-polynomials, number of divisors, A091220
GF(2)[X]-polynomials, number of irreducible divisors, A091222
GF(2)[X]-polynomials, of the form x^n+1, A000051
GF(2)[X]-polynomials, of the form x^n+1, number of distinct irreducible divisors, A000374
GF(2)[X]-polynomials, of the form x^n+1, number of irreducible divisors, A091248
GF(2)[X]-polynomials, powers of x+1, A001317
GF(2)[X]-polynomials, powers of x^2+1, A038183
GF(2)[X]-polynomials, powers of x^2+x+1, A038184
GF(2)[X]-polynomials, powers, table of, A048723
GF(2)[X]-polynomials, quasi-factorial analogue, A048631
GF(2)[X]-polynomials, reducible and also composite in N, A091212
GF(2)[X]-polynomials, reducible but prime in N, A091209
GF(2)[X]-polynomials, reducible, A091242 , A091254
GF(2)[X]-polynomials, smallest m >= n, such that polynomial with code m is irreducible, A091228
GF(2)[X]-polynomials, squares, A000695
GF(2)[X]-polynomials: see also Trinomials over GF(2)
Gijswijt's sequence: A090822
Gijswijt's sequence: generalizations: A091975 , A091976 , A092331 -A092335
Gijswijt's sequence: generalizations: A094321 (greedy version of second-order sequence)
Gijswijt's sequence: generalizations: A094781 (two-dim. version)
Gijswijt's sequence: see also under curling number transform
Gilbreath's conjecture: A036262 *, A036261
girth: see graphs, girth of
Giuga numbers: A007850 *
Glaisher numbers, sequences related to (start):
Glaisher's chi numbers: A002171 *, A002172
Glaisher's G numbers: A002111 *
Glaisher's H numbers: A002112 *
Glaisher's H' numbers: A002114 *
Glaisher's I numbers: A047788 */A047789 *
Glaisher's J numbers: A002325 *
Glaisher's T numbers: A002439 *, A002811
Gleason's theorem: A008621 , A008620
gluons: A005415
glycols: A000634