On the minimal degree and base size of finite primitive groups

Abstract

Let G be a finite permutation group acting on . A base for G is a subset B ⊂eq such that the pointwise stabilizer G(B) is the identity. The base size of G, denoted by b(G), is the cardinality of the smallest possible base. The minimal degree of G, denoted by μ(G), is the smallest cardinality of the support of a non trivial element of G. In this paper, we establish a new upper bound for b(G) when G is primitive, and subsequently prove that if G is a primitive group different from the Mathieu group of degree 24, then μ(G)b(G)≤ n n, where n is the degree of G. This bound is best possible, up to a multiplicative constant.

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