Gaussian Harmonic Forms and Two-Dimensional Self-Shrinkers
Abstract
We consider 2-dimensional orientable self-shrinkers for the Mean Curvature Flow of polynomial volume growth immersed in . We look at closed one forms minimizing the norm 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 has genus then we have a lower bound on the supremum norm of . GHF's may also be applied to create an upperbound for the lowest eigenvalue of the operator . In the codimension one case , for certain conditions on the principal curvatures, we use GHF's to get a lower bound on the index of depending on the genus . Likewise, in the compact codimension one case we obtain an estimate of the lowest eigenvalue of and also on .
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