Remarks on pseudo-vertex-transitive graphs with small diameter
Abstract
Let denote a Q-polynomial distance-regular graph with vertex set X and diameter D. Let A denote the adjacency matrix of . For a vertex x∈ X and for 0 ≤ i ≤ D, let E*i(x) denote the projection matrix to the ith subconstituent space of with respect to x. The Terwilliger algebra T(x) of with respect to x is the semisimple subalgebra of MatX(C) generated by A, E*0(x), E*1(x), …, E*D(x). Let V denote a C-vector space consisting of complex column vectors with rows indexed by X. We say is pseudo-vertex-transitive whenever for any vertices x,y ∈ X, there exists a C-vector space isomorphism :V V such that ( A - A )V=0 and ( E*i(x) - E*i(y))V=0 for all 0≤ i ≤ D. In this paper, we discuss pseudo-vertex transitivity for distance-regular graphs with diameter D∈ \2,3,4\. For D=2, we show that a strongly regular graph is pseudo-vertex-transitive if and only if all its local graphs have the same spectrum. For D = 3, we consider the Taylor graphs and show that they are pseudo-vertex transitive. For D=4, we consider the antipodal tight graphs and show that they are pseudo-vertex transitive.
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