An extremal theorem for positive curvature of graphs
Abstract
We prove an extremal theorem for positive Ollivier/Lin--Lu--Yau curvature: every graph of order \(n≥ 8\) with more than \[ T(n)=n2-3n2-n2+2 \] edges has positive Ollivier/Lin--Lu--Yau curvature, and this threshold is optimal. Moreover, for even n≥ 12, there exists a unique graph with T(n) edges that has an edge with non-positive curvature. For n=8,10 and odd n≥ 9, the extremal graphs are not unique. This suggests a new class of extremal graph-theoretic problems arising from discrete curvature notions.
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