Optimal eigenvalues for some Laplacians and Schrödinger operators depending on curvature
arXiv:math-ph/9901022
Abstract
This article is an expanded version of the plenary talk given by Evans Harrell at QMath98, a meeting in Prague, June 1998. We consider Laplace operators and Schrödinger operators with potentials containing curvature on certain regions of nontrivial topology, especially closed curves, annular domains, and shells. Dirichlet boundary conditions are imposed on any boundaries. Under suitable assumptions we prove that the fundamental eigenvalue is maximized when the geometry is round. We also comment on the use of coordinate transformations for these operators and mention some open problems.
Plain TeX, 11 pages; to appear in the Proceedings of QMath7, Birkhäuser Verlag, Basel 1999