Number of nodal domains of eigenfunctions on non-positively curved surfaces with concave boundary

Abstract

It is an open problem in general to prove that there exists a sequence of g-eigenfunctions φjk on a Riemannian manifold (M, g) for which the number N(φjk) of nodal domains tends to infinity with the eigenvalue. Our main result is that N(φjk) ∞ along a subsequence of eigenvalues of density 1 if the (M, g) is a non-positively curved surface with concave boundary, i.e. a generalized Sinai or Lorentz billiard. Unlike the recent closely related work of Ghosh-Reznikov-Sarnak and of the authors on the nodal domain counting problem, the surfaces need not have any symmetries.