Base sizes of primitive groups: bounds with explicit constants
Abstract
We show that the minimal base size b(G) of a finite primitive permutation group G of degree n is at most 2 ( |G|/ n) + 24. This bound is asymptotically best possible since there exists a sequence of primitive permutation groups G of degrees n such that b(G) = 2 ( |G|/ n) - 2 and b(G) is unbounded. As a corollary we show that a primitive permutation group of degree n that does not contain the alternating group Alt(n) has a base of size at most \n , \ 25\.
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