Edge-regular graphs with non-negative curvature have polynomial growth

Abstract

A long-standing conjecture in the emerging discrete Bakry-Émery theory asserts that bounded-degree graphs satisfying CD(0,∞) have polynomial growth. In the present paper, we prove this conjecture for all edge-regular graphs, and even obtain a volume doubling estimate with a constant that depends only on the degree. This is made possible thanks to the discovery of a surprising self-improvement phenomenon, which seems of independent interest: any edge-regular graph satisfying CD(κ,∞) for some κ∈ R must in fact satisfy CD(κ,n) for some explicit, universal and optimal dimension parameter n.