English

Gaussian Harmonic Forms and Two-Dimensional Self-Shrinkers

Differential Geometry 2012-04-02 v1

Abstract

We consider 2-dimensional orientable self-shrinkers Σ\Sigma for the Mean Curvature Flow of polynomial volume growth immersed in Rn\mathbb R^n. We look at closed one forms minimizing the norm Σ\etermω2\int_\Sigma \eterm |\omega|^2 in their cohomology class. Any closed form satisfying the Euler-Lagrange equation for this minimization will be called a Gaussian Harmonic one Form (GHF). We then use these forms to show that if such a Σ\Sigma has genus 1,\geq 1, then we have a lower bound on the supremum norm of A2A^2. GHF's may also be applied to create an upperbound for the lowest eigenvalue of the operator LL. In the codimension one case ΣR3\Sigma \to \mathbb R^3, for certain conditions on the principal curvatures, we use GHF's to get a lower bound on the index of LL depending on the genus gg. Likewise, in the compact codimension one case we obtain an estimate of the lowest eigenvalue of LL and also on infx2\inf |x|^2.

Keywords

Cite

@article{arxiv.1203.6704,
  title  = {Gaussian Harmonic Forms and Two-Dimensional Self-Shrinkers},
  author = {Matthew McGonagle},
  journal= {arXiv preprint arXiv:1203.6704},
  year   = {2012}
}

Comments

10 pages

R2 v1 2026-06-21T20:42:13.139Z