Rotationally symmetric critical metrics for Laplace eigenvalues on tori in a conformal class

Abstract

We study the problem of maximizing the first Laplace-Beltrami eigenvalue normalized by area in a conformal class on a torus. By a result of Nadirashvili, El Soufi, and Ilias, critical metrics for the k-th normalized Laplace-Beltrami eigenvalue functional λk in a conformal class correspond to harmonic maps to spheres. In this paper we construct certain S1-equivariant harmonic maps T2 S3. For each non-rhombic conformal class on a torus, one of these maps corresponds to a rotationally symmetric critical metric for λ1 in this conformal class with the value of λ1 being greater than that of the flat metric. This refines a recent result by Karpukhin that answers a question by El Soufi, Ilias, and Ros. Also, we are able to show that if a rotationally invariant metric on a rectangular torus is maximal for λ1 in its conformal class, then it is S1-equivariant and coincides (up to a scalar factor) with the above metric. Finally, we show that a family of minimal tori in S3 called Otsuki tori fits naturally into our family. This gives an explicit parametrization of Otsuki tori in terms of elliptic integrals.