Criteria on forbidden subgraphs in the complements for positive Lin--Lu--Yau curvature

Abstract

We investigate forbidden subgraph conditions in the complement of a graph that guarantee positive Lin--Lu--Yau curvature. In particular, we prove that every graph whose complement contains no 4-cycles has positive Lin--Lu--Yau curvature, with the only exception of the 4-vertex path. We further prove that, for any integer t2, every graph on at least \t2-2t+2, 8t\ vertices whose complement contains no K2,t has positive curvature. In addition, this lower bound on the number of vertices is optimal for t≥ 10. Finally, we construct examples showing that, in general, the forbidden subgraphs in these results cannot be replaced by cycles of length other than 4 or by complete bipartite graphs Ks,t with s> 2 and t> 2.