Boundedness of the number of nodal domains for eigenfunctions of generic Kaluza-Klein 3-folds

Abstract

This article concerns the number of nodal domains of eigenfunctions of the Laplacian on special Riemannian 3-manifolds, namely nontrivial principal S1 bundles P X over Riemann surfaces equipped with certain S1 invariant metrics, the Kaluza-Klein metrics. We prove for generic Kaluza-Klein metrics that any Laplacian eigenfunction has exactly two nodal domains unless it is invariant under the S1 action. We also construct an explicit orthonormal eigenbasis on the flat 3-torus T3 for which every non-constant eigenfunction belonging to the basis has two nodal domains.