Branched α-combinatorial Ricci flows on closed surfaces with Euler characteristic 0

Abstract

In this paper we introduce the branched α-flows on closed surfaces with Euler characteristic \( ≤ 0\). Based on the strict convexity of the branched α-potentials, we establish the long time existence and convergence of the solutions to the branched α-flows, which generalizes Ge and Xu's main results 2015,2015A on the α-flows. In addtion, we study the prescribed curvature problems under the relaxed precondition (M)∈ Z via alternative α-flows, establishing admissibility conditions for prescribed curvatures and their exponential convergence to target metrics.