A brief note about p-curvature on graphs

Abstract

In this paper, we consider Wang's CDp(m,K) condition on graphs, which depends on the p-Laplacian p for p>1 and is an extension of the classical Bakry-\'Emery CD(m,K) curvature dimension condition. We calculate several examples including paths, cycles and star graphs, and we show that the p-curvature is non-negative at some vertices in the case p≥ 2, while it approaches to -∞ in the case of 1<p<2. In addition, we observe that a crucial property of 2 on Cartesian products does no longer hold for 2p in the case of p > 2. As a consequence, an analogous proof that non-negative curvature is preserved under taking Cartesian products is not possible for p > 2.