On relational complexity and base size of finite primitive groups
Abstract
In this paper we show that if G is a primitive subgroup of Sn that is not large base, then any irredundant base for G has size at most 5 n. This is the first logarithmic bound on the size of an irredundant base for such groups, and is best possible up to a small constant. As a corollary, the relational complexity of G is at most 5 n+1, and the maximal size of a minimal base and the height are both at most 5 n. Furthermore, we deduce that a base for G of size at most 5 n can be computed in polynomial time.
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