Location of eigenvalues for the wave equation with dissipative boundary conditions

Abstract

We examine the location of the eigenvalues of the generator G of a semi-group V(t) = etG,\: t ≥ 0, related to the wave equation in an unbounded domain ⊂ Rd with dissipative boundary condition ∂u - γ(x) ∂t u = 0 on = ∂ . We study two cases: (A): \: 0 < γ(x) < 1,\: ∀ x ∈ and (B):\: 1 < γ(x), \: ∀ x ∈ . We prove that for every 0 < ε 1, the eigenvalues of G in the case (A) lie in the region ε = \z ∈ C:\: | z | ≤ Cε (| z|12 + ε + 1), \: z < 0\, while in the case (B) for every 0 < ε 1 and every N ∈ N the eigenvalues lie in ε RN, where RN = \z ∈ C:\: | z| ≤ CN (| z| + 1)-N,\: z < 0\.