On the asymptotics of the principal eigenvalue for a Robin problem with a large parameter in planar domains

Abstract

Let ⊂ 2 be a domain having a compact boundary which is Lipschitz and piecewise C4 smooth, and let denote the inward unit normal vector on . We study the principal eigenvalue E(β) of the Laplacian in with the Robin boundary conditions ∂ f/∂ +β f=0 on , where β is a positive number. Assuming that has no convex corners we show the estimate E(β)=-β2- γβ + O(β\23) as β+∞, where γ is the maximal curvature of the boundary.