An infinite family of locally X graphs based on incidence geometries
Abstract
A graph G is locally X if the graphs induced on the neighbours of every vertex of G are isomorphic to the graph X. We prove that the infinite family of incidence graphs of the r-rank incidence geometries, (KG(n,k),r), constructed using the Kneser graphs KG(n,k), are locally X with X being the incidence graphs of the rank r-1 residues of (KG(n,k),r).
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