Integral Ricci Curvature for Graphs
Abstract
We introduce the notion of integral Ricci curvature I_0 for graphs, which measures the amount of Ricci curvature below a given threshold 0. We focus our attention on the Lin-Lu-Yau Ricci curvature. As applications, we prove a Bonnet-Myers-type diameter estimate, a Moore-type estimate on the number of vertices of a graph in terms of the maximum degree dM and diameter D, and a Lichnerowicz-type estimate for the first eigenvalue λ1 of the Graph Laplacian, generalizing the results obtained by Lin, Lu, and Yau. All estimates are uniform, depending only on geometric parameters like 0, I_0, dM, or D, and do not require the graphs to be positively curved.
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