The cut-off resolvent can grow arbitrarily fast in obstacle scattering

Abstract

We consider time-harmonic acoustic scattering by a compact sound-soft obstacle Γ⊂ Rn (n≥ 2) that has connected complement Ω:= Rn Γ. This scattering problem is modelled by the inhomogeneous Helmholtz equation Δu + k2 u = -f in Ω, the boundary condition that u=0 on ∂ Ω= ∂ Γ, and the standard Sommerfeld radiation condition. It is well-known that, if the boundary ∂ Ω is smooth, then the norm of the cut-off resolvent of the Laplacian, that maps the compactly supported inhomogeneous term f to the solution u restricted to some ball, grows at worst exponentially with k. In this paper we show that, if no smoothness of Γ is imposed, then the growth can be arbitrarily fast. Precisely, given some modestly increasing unbounded sequence 0<k1<k2<… and some arbitrarily rapidly increasing sequence 0<a1<a2<…, we construct a compact Γ such that, for each j∈ N, the norm of the cut-off resolvent at k=kj is greater than aj.