Semi-classical weights and equivariant spectral theory

Author(s)

Dryden, Emily; Guillemin, Victor W; Sena-Dias, Rosa Isabel

Abstract

We prove inverse spectral results for differential operators on manifolds and orbifolds invariant under a torus action. These inverse spectral results involve the asymptotic equivariant spectrum, which is the spectrum itself together with "very large" weights of the torus action on eigenspaces. More precisely, we show that the asymptotic equivariant spectrum of the Laplace operator of any toric metric on a generic toric orbifold determines the equivariant biholomorphism class of the orbifold; we also show that the asymptotic equivariant spectrum of a Tn-invariant Schrödinger operator on Rn determines its potential in some suitably convex cases. In addition, we prove that the asymptotic equivariant spectrum of an S1-invariant metric on S2determines the metric itself in many cases. Finally, we obtain an asymptotic equivariant inverse spectral result for weighted projective spaces. As a crucial ingredient in these inverse results, we derive a surprisingly simple formula for the asymptotic equivariant trace of a family of semi-classical differential operators invariant under a torus action. Keywords: Laplacian; Asymptotic equivariant spectrum; Semi-classical weights; Toric manifold; Symplectic orbifold

Date issued

2016-05

URI

http://hdl.handle.net/1721.1/118447

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Advances in Mathematics

Publisher

Elsevier BV

Citation

Dryden, Emily B. et al. “Semi-Classical Weights and Equivariant Spectral Theory.” Advances in Mathematics 299 (August 2016): 202–246 © 2016 Elsevier Inc

Version: Original manuscript

ISSN

0001-8708

1090-2082