An effective Hamiltonian for the eigenvalue asymptotics of a Robin Laplacian with a large parameter

Abstract

We consider the Laplacian on a class of smooth domains ⊂ R, 2, with attractive Robin boundary conditions: \[ Qα u=- u, ∂ u∂ n=α u on ∂, \ α>0, \] where n is the outer unit normal, and study the asymptotics of its eigenvalues Ej(Qα) as well as some other spectral properties for α+∞ We work with both compact domains and non-compact ones with a suitable behavior at infinity. For domains with compact C2 boundaries and fixed j, we show that \[ Ej(Qα)=-α2+μj(α)+ O( α), \] where μj(α) is the jth eigenvalue, as soon as it exists, of -S-(-1)α H with (-S) and H being respectively the positive Laplace-Beltrami operator and the mean curvature on ∂. Analogous results are obtained for a class of domains with non-compact boundaries. In particular, we discuss the existence of eigenvalues in non-compact domains and the existence of spectral gaps for periodic domains. We also show that the remainder estimate can be improved under stronger regularity assumptions. The effective Hamiltonian -S-(-1)α H enters the framework of semi-classical Schr\"odinger operators on manifolds, and we provide the asymptotics of its eigenvalues in the limit α+∞ under various geometrical assumptions. In particular, we describe several cases for which our asymptotics provides gaps between the eigenvalues of Qα for large α.