Scattering poles near the real axis for two strictly convex obstacles
| Contribuinte(s) |
Institute of Mathematics & Physics (ADT) Mathematical Modelling of Structures, Solids and Fluids |
|---|---|
| Data(s) |
05/12/2008
05/12/2008
01/06/2007
|
| Resumo |
Iantchenko, A., (2007) 'Scattering poles near the real axis for two strictly convex obstacles', Annales of the Institute Henri Poincar? 8 pp.513-568 RAE2008 To study the location of poles for the acoustic scattering matrix for two strictly convex obstacles with smooth boundaries, one uses an approximation of the quantized billiard operator M along the trapped ray between the two obstacles. Using this method G?rard (cf. [7]) obtained complete asymptotic expansions for the poles in a strip Im z ? c as Re z tends to infinity. He established the existence of parallel rows of poles close to Assuming that the boundaries are analytic and the eigenvalues of Poincar? map are non-resonant we use the Birkhoff normal form for M to improve his result and to get the complete asymptotic expansions for the poles in any logarithmic neighborhood of real axis. Peer reviewed |
| Formato |
56 |
| Identificador |
Iantchenko , A 2007 , ' Scattering poles near the real axis for two strictly convex obstacles ' Annales Henri Poincar? , vol 8 , no. 3 , pp. 513-568 . DOI: 10.1007/s00023-006-0315-3 1424-0637 PURE: 88681 PURE UUID: ccc0b8ff-5de3-4aa0-9bbc-a140c2d3f98f dspace: 2160/1405 |
| Idioma(s) |
eng |
| Relação |
Annales Henri Poincar? |
| Tipo |
/dk/atira/pure/researchoutput/researchoutputtypes/contributiontojournal/article Article (Journal) |
| Direitos |
