On the base size and minimal degree of transitive groups
Abstract
Let G be a permutation group, and denote with μ(G) and b(G) its minimal degree and base size respectively. We show that for every >0, there exists a transitive permutation group G of degree n with \[ μ(G)b(G) ≥ n2-. \] We also identify some classes of transitive and intransitive groups whose base size and minimal degree have a smaller upper bound, shared with primitive groups.
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