English

Two-dimensional curvature functionals with superquadratic growth

Analysis of PDEs 2011-08-31 v1 Differential Geometry

Abstract

For two-dimensional, immersed closed surfaces f:ΣRnf:\Sigma \to \R^n, we study the curvature functionals Ep(f)\mathcal{E}^p(f) and Wp(f)\mathcal{W}^p(f) with integrands (1+A2)p/2(1+|A|^2)^{p/2} and (1+H2)p/2(1+|H|^2)^{p/2}, respectively. Here AA is the second fundamental form, HH is the mean curvature and we assume p>2p > 2. Our main result asserts that W2,pW^{2,p} critical points are smooth in both cases. We also prove a compactness theorem for Wp\mathcal{W}^p-bounded sequences. In the case of Ep\mathcal{E}^p this is just Langer's theorem \cite{langer85}, while for Wp\mathcal{W}^p we have to impose a bound for the Willmore energy strictly below 8π8\pi as an additional condition. Finally, we establish versions of the Palais-Smale condition for both functionals.

Keywords

Cite

@article{arxiv.1108.5855,
  title  = {Two-dimensional curvature functionals with superquadratic growth},
  author = {Ernst Kuwert and Tobias Lamm and Yuxiang Li},
  journal= {arXiv preprint arXiv:1108.5855},
  year   = {2011}
}
R2 v1 2026-06-21T18:56:57.442Z