A Bound for the Eigenvalue Counting Function for Higher-Order Krein Laplacians on Open Sets

Abstract

For an arbitrary nonempty, open set ⊂ Rn, n ∈ N, of finite (Euclidean) volume, we consider the minimally defined higher-order Laplacian (- )m|C0∞(), m ∈ N, and its Krein--von Neumann extension AK,,m in L2(). With N(λ,AK,,m), λ > 0, denoting the eigenvalue counting function corresponding to the strictly positive eigenvalues of AK,,m, we derive the bound N(λ,AK,,m) ≤ (2 π)-n vn || \1 + [2m/(2m+n)]\n/(2m) λn/(2m), λ > 0, where vn := πn/2/((n+2)/2) denotes the (Euclidean) volume of the unit ball in Rn. The proof relies on variational considerations and exploits the fundamental link between the Krein--von Neumann extension and an underlying (abstract) buckling problem.