Maximum walk entropy implies walk regularity

Abstract

The notion of walk entropy SV(G,β) for a graph G at the inverse temperature β was put forward recently by Estrada et al. (2014) 6. It was further proved by Benzi 1 that a graph is walk-regular if and only if its walk entropy is maximum for all temperatures β ∈ I, where I is a set of real numbers containing at least an accumulation point. Benzi 1 conjectured that walk regularity can be characterized by the walk entropy if and only if there is a β>0, such that SV(G,β) is maximum. Here we prove that a graph is walk regular if and only if the SV(G,β=1)= n. We also prove that if the graph is regular but not walk-regular SV(G,β)< n for every β >0 and β 0 SV(G,β)= n=β ∞ SV(G,β). If the graph is not regular then SV(G,β) ≤ n-ε for every β>0, for some ε>0.