Transitive sets of derangements in primitive actions of PSL2(q)
Abstract
Problem 8.75 of the Kourovka Notebook [10], attributed to John G. Thompson, asks the following: Suppose G is a finite primitive permutation group on , and α, β are distinct points of . Does there exist an element g∈ G such that αg=β and g fixes no point of ? A recent negative example is given in [12], where G is the Steinberg triality group 3D4(2) acting primitively on 4,064,256 points. At present this is the only negative example known. In this note we show that almost simple primitive permutation groups with socle isomorphic to PSL2(q) do not give negative examples.
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