Repelling curvature via ε-repelling Laplacian on positive connected signed graphs

Abstract

The paper defines a positive semidefinite operator called ε-repelling Laplacian on a positive connected signed graph where ε is an arbitrary positive number less than a constant ε0 related to the graph's consensus problem. Then we investigate the upper bound of the second smallest eigenvalue of ε-repelling Laplacian. Besides, we use the pseudoinverse of ε-repelling Laplacian to construct a simplex as well as ε-repelling cost whose square root turns out to be a distance among the vertices of the simplex. We also extend the node and edge resistance curvature proposed by K.Devriendt et al. to node and edge ε-repelling curvature and derive the corresponding Lichnerowicz inequalities on any positive connected signed graph. Moreover, it turns out that edge ε-repelling curvature is no more than the Lin-Lu-Yau curvature of the underlying graph whose transport cost is ε-repelling cost rather than the length of the shortest path.