Maximization of Laplace-Beltrami eigenvalues on closed Riemannian surfaces

Abstract

Let (M,g) be a connected, closed, orientable Riemannian surface and denote by λk(M,g) the k-th eigenvalue of the Laplace-Beltrami operator on (M,g). In this paper, we consider the mapping (M, g) λk(M,g). We propose a computational method for finding the conformal spectrum ck(M,[g0]), which is defined by the eigenvalue optimization problem of maximizing λk(M,g) for k fixed as g varies within a conformal class [g0] of fixed volume textrmvol(M,g) = 1. We also propose a computational method for the problem where M is additionally allowed to vary over surfaces with fixed genus, γ. This is known as the topological spectrum for genus γ and denoted by tk(γ). Our computations support a conjecture of N. Nadirashvili (2002) that tk(0) = 8 π k, attained by a sequence of surfaces degenerating to a union of k identical round spheres. Furthermore, based on our computations, we conjecture that tk(1) = 8π23 + 8π (k-1), attained by a sequence of surfaces degenerating into a union of an equilateral flat torus and k-1 identical round spheres. The values are compared to several surfaces where the Laplace-Beltrami eigenvalues are well-known, including spheres, flat tori, and embedded tori. In particular, we show that among flat tori of volume one, the k-th Laplace-Beltrami eigenvalue has a local maximum with value λk = 4π2 k2 2 ( k2 2 - 14)-12. Several properties are also studied computationally, including uniqueness, symmetry, and eigenvalue multiplicity.