English

A flow method for curvature equations

Analysis of PDEs 2023-07-27 v1 Differential Geometry

Abstract

We consider a general curvature equation F(κ)=G(X,ν(X))F(\kappa)=G(X,\nu(X)), where κ\kappa is the principal curvature of the hypersurface MM with position vector XX. It includes the classical prescribed curvature measures problem and area measures problem. However, Guan-Ren-Wang \cite{GRW} proved that the C2C^2 estimate fails usually for general function FF. Thus, in this paper, we pose some additional conditions of GG to get existence results by a suitably designed parabolic flow. In particular, if F=σk1kF=\sigma_{k}^\frac{1}{k} for 1kn1\forall 1\le k\le n-1, the existence result has been derived in the famous work \cite{GLL} with G=ψ(XX)X,ν1kXn+1kG=\psi(\frac{X}{|X|})\langle X,\nu\rangle^{\frac1k}{|X|^{-\frac{n+1}{k}}}. This result will be generalized to G=ψ(XX)X,ν1pkXqk1kG=\psi(\frac{X}{|X|})\langle X,\nu\rangle^\frac{{1-p}}{k}|X|^\frac{{q-k-1}}{k} with p>qp>q for arbitrary kk by a suitable auxiliary function. The uniqueness of the solutions in some cases is also studied.

Keywords

Cite

@article{arxiv.2307.14096,
  title  = {A flow method for curvature equations},
  author = {Shanwei Ding and Guanghan Li},
  journal= {arXiv preprint arXiv:2307.14096},
  year   = {2023}
}
R2 v1 2026-06-28T11:40:32.689Z