Steinerberger Curvature On Digraphs -- Discrete Bonnet-Myers and Lichnerowicz Theorems
Abstract
Steinerberger curvature encodes the global distance geometry of a graph through an equilibrium measure. In this paper, we derive explicit curvature formulas for undirected Cayley graphs of dihedral groups Dn and generalized quaternion groups Q4m. We then extend Steinerberger curvature to strongly connected simple digraphs by introducing in-curvature and out-curvature, reflecting the asymmetry of directed distances. For these directed curvatures, we establish structural properties, including negativity criteria and a permutation relation between in- and out-curvature. Our main results are directed analogues of the Bonnet--Myers, Cheng and Lichnerowicz theorems, together with reverse Bonnet--Myers inequalities for directed diameter and out-radius, and an upper bound for in-radius in terms of total curvature.
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