Toric aspects of the first eigenvalue

Abstract

In this paper we study the smallest non-zero eigenvalue λ1 of the Laplacian on toric K\"ahler manifolds. We find an explicit upper bound for λ1 in terms of moment polytope data. We show that this bound can only be attained for CPn endowed with the Fubini-Study metric and therefore CPn endowed with the Fubini-Study metric is spectrally determined among all toric K\"ahler metrics. We also study the equivariant counterpart of λ1 which we denote by λ1T. It is the the smallest non-zero eigenvalue of the Laplacian restricted to torus-invariant functions. We prove that λ1T is not bounded among toric K\"ahler metrics thus generalizing a result of Abreu-Freitas on S2. In particular, λ1T and λ1 do not coincide in general.