On the generalised Saxl graphs of permutation groups
Abstract
A base for a finite permutation group G Sym() is a subset of with trivial pointwise stabiliser in G, and the base size of G is the smallest size of a base for G. Motivated by the interest in groups of base size two, Burness and Giudici introduced the notion of the Saxl graph. This graph has vertex set , with edges between elements if they form a base for G. We define a generalisation of this graph that encodes useful information about G whenever b(G) 2: here, the edges are the pairs of elements of that can be extended to bases of size b(G). In particular, for primitive groups, we investigate the completeness and arc-transitivity of the generalised graph, and the generalisation of Burness and Giudici's Common Neighbour Conjecture on the original Saxl graph.
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