Vertex stabilizers of locally s-arc transitive graphs of pushing up type

Abstract

Suppose that a thick, locally finite and locally s-arc transitive G-graph with s 4. For a vertex z in , let Gz be the stabilizer of z and Gz[1] be the kernel of the action of Gz on the neighbours of z. We say is of pushing up type provided there exists a prime p and a 1-arc (x,y) such that CGz(Op(Gz[1])) Op(Gz[1]) for z ∈ \x,y\ and Op(Gx[1]) Op(Gy[1]). We show that if is of pushing up type, then Op(Gx[1]) is elementary abelian and Gx/Gx[1] X with PSL2(pa) X P L2(pa).

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