α-curvatures and α-flows on low dimensional triangulated manifolds

Abstract

In this paper, we introduce two discrete curvature flows, which are called α-flows on two and three dimensional triangulated manifolds. For triangulated surface M, we introduce a new normalization of combinatorial Ricci flow (first introduced by Bennett Chow and Feng Luo CL1), aiming at evolving α order discrete Gauss curvature to a constant. When α(M)≤0, we prove that the convergence of the flow is equivalent to the existence of constant α-curvature metric. We further get a necessary and sufficient combinatorial-topological-metric condition, which is a generalization of Thurston's combinatorial-topological condition, for the existence of constant α-curvature metric. For triangulated 3-manifolds, we generalize the combinatorial Yamabe functional and combinatorial Yamabe problem introduced by the authors in GX2,GX4 to α-order. We also study the α-order flow carefully, aiming at evolving α order combinatorial scalar curvature, which is a generalization of Cooper and Rivin's combinatorial scalar curvature, to a constant.