Differences between Robin and Neumann eigenvalues

Abstract

Let ⊂ R2 be a bounded planar domain, with piecewise smooth boundary ∂ . For σ>0, we consider the Robin boundary value problem \[ - f =λ f, ∂ f∂ n + σ f = 0 on ∂ \] where ∂ f∂ n is the derivative in the direction of the outward pointing normal to ∂ . Let 0<λσ0≤ λσ1≤ … be the corresponding eigenvalues. The purpose of this paper is to study the Robin-Neumann gaps \[ dn(σ):=λnσ-λn0 . \] For a wide class of planar domains we show that there is a limiting mean value, equal to 2 length(∂)/ area()· σ and in the smooth case, give an upper bound of dn(σ)≤ C( ) n1/3σ and a uniform lower bound. For ergodic billiards we show that along a density-one subsequence, the gaps converge to the mean value. We obtain further properties for rectangles, where we have a uniform upper bound, and for disks, where we improve the general upper bound.