Spectral shift function and Resonances near the low ground state for Pauli and Schr\"odinger operators

Abstract

We study the spectral shift function (SSF) (λ) and the resonances of the operator HV := ( σ · (-i∇ - A) )2 + V in L2(R3) near the origin. Here σ := (σ1,σ2,σ3) are the 2 × 2 Pauli matrices and V is a hermitian potential decaying exponentially in the direction of the magnetic field B := curl 0.6mm A. We give a representation of the derivative of the SSF as a sum of the imaginary part of a holomorphic function and a harmonic measure related to the resonances of HV. This representation warrant the Breit-Wigner approximation moreover we deduce information about the singularities of the SSF at the origin and a local trace formula.