Constructing Riemannian metrics with prescribed nodal sets for Laplacian eigenfunctions

Abstract

Let C be a configuration of n ovals in S2. We show that there is a Riemannian metric g over S2 with a Laplacian eigenfunction whose zero set is C, and the corresponding eigenvalue is the k-th eigenvalue for n≤ k ≤ α1 n. We also have that λVolg(S2) = (n). Additionally, assuming C can be drawn as a topological minor of the m× m grid graph, we show that there is an infinitesimal perturbation of the round metric on S2 and a corresponding Laplacian eigenfunction f with eigenvalue (m2) such that the zero set of f is equivalent to C.