Primitive permutation IBIS groups

Abstract

Let G be a finite permutation group on . An ordered sequence of elements of , (ω1,…, ωt), is an irredundant base for G if the pointwise stabilizer G(ω1,…, ωt) is trivial and no point is fixed by the stabilizer of its predecessors. If all irredundant bases of G have the same size we say that G is an IBIS group. In this paper we show that if a primitive permutation group is IBIS, then it must be almost simple, of affine-type, or of diagonal type. Moreover we prove that a diagonal-type primitive permutation groups is IBIS if and only if it is isomorphic to PSL(2,2f)× PSL(2,2f) for some f≥ 2, in its diagonal action of degree 2f(22f-1).