Combinatorial $p$-th Calabi flows on surfaces
Differential Geometry
2018-10-30 v1
Abstract
For triangulated surfaces and any , we introduce the combinatorial -th Calabi flow which precisely equals the combinatorial Calabi flows first introduced in H. Ge's thesis when . The difficulties for the generalizations come from the nonlinearity of the -th flow equation when . Adopting different approaches, we show that the solution to the combinatorial -th Calabi flow exists for all time and converges if and only if there exists a circle packing metric of constant (zero resp.) curvature in Euclidean (hyperbolic resp.) background geometry. Our results generalize the work of H. Ge, Ge-Xu and Ge-Hua on the combinatorial Calabi flow from to any .
Cite
@article{arxiv.1810.11625,
title = {Combinatorial $p$-th Calabi flows on surfaces},
author = {Aijin Lin and Xiaoxiao Zhang},
journal= {arXiv preprint arXiv:1810.11625},
year = {2018}
}
Comments
24 pages