Ricci Curvature Formula: Applications to Bonnet-Myers Sharp Irregular Graphs
Abstract
In this paper, we establish a simple formula for computing the Lin-Lu-Yau Ricci curvature on graphs. For any edge xy in a simple locally finite graph G, the curvature (x,y) can be expressed as a cost function of an optimal bijection between two blow-up sets of the neighbors of x and y. Utilizing this approach, we derive several results including a structural theorem for the Bonnet-Myers sharp irregular graphs of diameter 3 and a theorem on C3-free Bonnet-Myers sharp graphs.
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