Improved inequalities between Dirichlet and Neumann eigenvalues of the biharmonic operator

Abstract

We prove that the (k+d)-th Neumann eigenvalue of the biharmonic operator on a bounded connected d-dimensional (d2) Lipschitz domain is not larger than its k-th Dirichlet eigenvalue for all k∈N. For a special class of domains with symmetries we obtain a stronger inequality. Namely, for this class of domains, we prove that the (k+d+1)-th Neumann eigenvalue of the biharmonic operator does not exceed its k-th Dirichlet eigenvalue for all k∈N. In particular, in two dimensions, this special class consists of domains having an axis of symmetry.