Higher dimensional surgery and Steklov eigenvalues
Abstract
We show that for compact Riemannian manifolds of dimension at least with nonempty boundary, we can modify the manifold by performing surgeries of codimension or higher, while keeping the Steklov spectrum nearly unchanged. This shows that certain changes in the topology of a domain do not have an effect when considering shape optimization questions for Steklov eigenvalues in dimensions and higher. Our result generalizes the 1-dimensional surgery in [FS2] to higher dimensional surgeries and to higher eigenvalues. It is proved in [FS2] that the unit ball does not maximize the first nonzero normalized Steklov eigenvalue among contractible domains in , for . We show that this is also true for higher Steklov eigenvalues. Using similar ideas we show that in , for , the -th normalized Steklov eigenvalue is not maximized in the limit by a sequence of contractible domains degenerating to the disjoint union of unit balls, in contrast to the case in dimension [GP1].
Cite
@article{arxiv.2007.06734,
title = {Higher dimensional surgery and Steklov eigenvalues},
author = {Han Hong},
journal= {arXiv preprint arXiv:2007.06734},
year = {2020}
}
Comments
17 pages