On the resonances of the Laplacian on waveguides Article

cited authors

  • Edward, J

fiu authors

abstract

  • The resonances for the Dirichlet and Neumann Laplacian are studied on compactly perturbed waveguides. In the absence of resonances, an upper bound is proven for the localised resolvent. This is then used to prove that the existence of a quasimode whose asymptotics is bounded away from the thresholds implies the existence of resonances converging to the real axis. The following upper bound to the number of resonances is also proven: #{kj ε Res(Δ), dist(kj, physical plane) < 1 + √ kj /2, kj < r} < Cr3+ε. © 2002 Elsevier Science (USA). All rights reserved.

publication date

  • August 1, 2002

Digital Object Identifier (DOI)

start page

  • 89

end page

  • 116

volume

  • 272

issue

  • 1