On Arnold's Transversality Conjecture for the Laplace-Beltrami Operator

Abstract: This paper is concerned with the structure of the set of Riemannian metrics on a connected manifold such that the corresponding Laplace-Beltrami operator has an eigenvalue of a given multiplicity. We introduce a simple geometric condition on metrics and their corresponding Laplace eigenfunctions, and show it is equivalent to the strong Arnold hypothesis. This hypothesis essentially posits that multiple Laplace eigenvalues split up under perturbation like those of symmetric matrices. We prove our condition is satisfied except on a set of infinite codimension, and use this to obtain non-crossing rules for Laplace eigenvalues. Furthermore, we show that our condition is satisfied on all metrics admitting eigenvalues of multiplicity at most six, and exhibit examples of metrics violating it.