On -distance-balancedness of cubic Cayley graphs of dihedral groups

Abstract

A connected graph of diameter diam() is -distance-balanced if |Wxy()|=|Wyx()| for every x,y∈ V() with d(x,y)=, where Wxy() is the set of vertices of that are closer to x than to y. is said to be highly distance-balanced if it is -distance-balanced for every ∈ [ diam()]. It is proved that every cubic Cayley graph whose generating set is one of \a,an-1,bar\ and \ak,an-k,bat\ is highly distance-balanced. This partially solves a problem posed by Miklavic and Sparl.

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