On d-Walk Regular Graphs

Abstract

Let G be a graph with set of vertices 1,...,n and adjacency matrix A of size nxn. Let d(i,j)=d, we say that fd:N->N is a d-function on G if for every pair of vertices i,j and k>=d, we have aij(k)=fd(k). If this function fd exists on G we say that G is d-walk regular. We prove that G is d-walk regular if and only if for every pair of vertices i,j at distance <=d and for d<=k<=n+d-1, we have that aij(k) is independent of the pair i,j. Equivalently, the single condition exp(A)*Ad=cAd holds for some constant c, where Ad is the adjacency matrix of the d-distance graph and * denotes the Schur product.