Positive-Curvature Discrete Einstein Metrics on Trees

Abstract

For a weighted tree, the Lin--Lu--Yau Ricci curvature admits an explicit formula in terms of the edge weights. Consequently, the constant-curvature equation is equivalent to an eigenvalue problem for an edge-indexed Ricci matrix RT. Building on the spectral characterization of discrete Einstein metrics on trees, we classify all finite trees whose discrete Einstein metric has positive curvature, equivalently all trees satisfying λ(RT)<0. For caterpillars with spine order m 12, this occurs precisely for the endpoint families Tm(a,0,…,0,b) with 1 a,b 3 and (a,b)(3,3). The remaining cases 3 m 11 are settled by an exact finite verification using rational characteristic polynomials and Sturm root counts. We also determine the zero level set λ(RT)=0: among caterpillars, it consists of the stable family (3,0,…,0,3) together with nine exceptional short-spine caterpillars, while S32 is the unique non-caterpillar zero example.