Diameter and Laplace eigenvalue estimates for left-invariant metrics on compact Lie groups

Abstract

Let G be a compact connected Lie group of dimension m. Once a bi-invariant metric on G is fixed, left-invariant metrics on G are in correspondence with m× m positive definite symmetric matrices. We estimate the diameter and the smallest positive eigenvalue of the Laplace-Beltrami operator associated to a left-invariant metric on G in terms of the eigenvalues of the corresponding positive definite symmetric matrix. As a consequence, we give partial answers to a conjecture by Eldredge, Gordina and Saloff-Coste; namely, we give large subsets S of the space of left-invariant metrics M on G such that there exists a positive real number C depending on G and S such that λ1(G,g)diam(G,g)2≤ C for all g∈ S. The existence of the constant C for S= M is the original conjecture.