On the deformation of inversive distance circle packings, III
arXiv:1709.09874 · doi:10.1016/j.jfa.2016.12.020
Abstract
Given a triangulated surface $M$, we use Ge-Xu's $α$-flow \cite{Ge-Xu1} to deform any initial inversive distance circle packing metric to a metric with constant $α$-curvature. More precisely, we prove that the inversive distance circle packing with constant $α$-curvature is unique if $αÏ(M)\leq 0$, which generalize Andreev-Thurston's rigidity results for circle packing with constant cone angles. We further prove that the solution to Ge-Xu's $α$-flow can always be extended to a solution that exists for all time and converges exponentially fast to constant $α$-curvature. Finally, we give some combinatorial and topological obstacles for the existence of constant $α$-curvature metrics.
14 pages, all comments are welcome