English

Resonances and Spectral Shift Function for the semi-classical Dirac operator

Spectral Theory 2009-11-11 v1 Mathematical Physics Analysis of PDEs math.MP

Abstract

We consider the self-adjoint operator H=H0+VH=H_0+V, where H0H_0 is the free semi-classical Dirac operator on R3R^3. We suppose that the smooth matrix-valued potential V=O(<x>δ),δ>0,V=O(<x>^{-\delta}), \delta>0, has an analytic continuation in a complex sector outside a compact. We define the resonances as the eigenvalues of the non-selfadjoint operator obtained from the Dirac operator HH by a complex distortions of R3R^{3}.We establish an upper bound O(h3)O(h^{-3}) for the number of resonances in any compact domain. For δ>3\delta>3, a representation of the derivative of the spectral shift function ξ(λ,h)\xi(\lambda,h) related to the semi-classical resonances of HH and a local trace formula are obtained. In particular, if VV is an electro-magnetic potential, we deduce a Weyl-type asymptotic of the spectral shift function. As a by-product, we obtain an upper bound O(h2)O(h^{-2}) for the number of resonances close to non-critical energy levels in domains of width hh and a Breit-Wigner approximation formula for the derivative of the spectral shift function.

Keywords

Cite

@article{arxiv.math/0610622,
  title  = {Resonances and Spectral Shift Function for the semi-classical Dirac operator},
  author = {Abdallah Khochman},
  journal= {arXiv preprint arXiv:math/0610622},
  year   = {2009}
}

Comments

39 pages, 1 figure