Two-term, asymptotically sharp estimates for eigenvalue means of the Laplacian

Abstract

We present asymptotically sharp inequalities for the eigenvalues μk of the Laplacian on a domain with Neumann boundary conditions, using the averaged variational principle introduced in HaSt14. For the Riesz mean R1(z) of the eigenvalues we improve the known sharp semiclassical bound in terms of the volume of the domain with a second term with the best possible expected power of z. In addition, we obtain two-sided bounds for individual μk, which are semiclassically sharp. In a final section, we remark upon the Dirichlet case with the same methods.