Scattering matrices and Weyl functions
arXiv:math-ph/0604013 · doi:10.1112/plms/pdn016
Abstract
For a scattering system $\{A_Î,A_0\}$ consisting of selfadjoint extensions $A_Î$ and $A_0$ of a symmetric operator $A$ with finite deficiency indices, the scattering matrix $\{S_\gT(\gl)\}$ and a spectral shift function $ξ_Î$ are calculated in terms of the Weyl function associated with the boundary triplet for $A^*$ and a simple proof of the Krein-Birman formula is given. The results are applied to singular Sturm-Liouville operators with scalar and matrix potentials, to Dirac operators and to Schrödinger operators with point interactions.
39 pages