Spectral flow inside essential spectrum V: on absorbing points of coupling resonances

Abstract

Let H0 and V be self-adjoint operators, such that V admits a factorisation V = F*JF with bounded self-adjoint J and |H0|1/2-compact F. Coupling resonance functions, rj(z), of the pair H0 and V can be defined as rj(z) = - σj(z) -1, where σj(z) are eigenvalues of the compact-operator valued holomorphic function F(H0-z)-1 F*J. Taken together, the functions rj(z) form an infinite-valued holomorphic function on the resolvent set of~H0. These functions contain a lot of information about the pair H0, V (this is well-known in the case of rank one V). A point z0 of the resolvent set we call absorbing if some rj(z) goes to ∞ as z z0 along some half-interval. In this note I present some partial results concerning absorbing points of coupling resonances.