Certain graphs with exactly one irreducible T-module with endpoint 1, which is thin: the pseudo-distance-regularized case

Abstract

Let denote a finite, simple and connected graph. Fix a vertex x of which is not a leaf and let T=T(x) denote the Terwilliger algebra of with respect to x. Assume that the unique irreducible T-module with endpoint 0 is thin, or equivalently that is pseudo-distance-regular around x. We consider the property that has, up to isomorphism, a unique irreducible T-module with endpoint 1, and that this T-module is thin. The main result of the paper is a combinatorial characterization of this property.