A Convexity Result in the Spectral Geometry of Conformally Equivalent Metrics on Surfaces

TL;DR

This paper explores the spectral geometry of surfaces, showing that conformally equivalent metrics do not form nontrivial convex sets, which constrains the reconstructability of surfaces from Laplace spectra.

Contribution

It proves a convexity result in the spectral geometry of conformally equivalent metrics, advancing understanding of spectral reconstruction limitations.

Findings

Conformally equivalent metrics on surfaces do not form nontrivial convex sets.

Spectral data constrains the reconstructability of surfaces.

The results are motivated by quantum gravity considerations.

Abstract

Motivated by considerations of euclidean quantum gravity, we investigate a central question of spectral geometry, namely the question of reconstructability of compact Riemannian manifolds from the spectra of their Laplace operators. To this end, we study analytic paths of metrics that induce isospectral Laplace-Beltrami operators over oriented compact surfaces without boundary. Applying perturbation theory, we show that sets of conformally equivalent metrics on such surfaces contain no nontrivial convex subsets. This indicates that cases where the manifolds cannot be reconstructed from their spectra are highly constrained.