Solvability of the operator Riccati equation in the Feshbach case

Abstract

We consider a bounded block operator matrix of the form L=(arraycc A & B \\ C & D array ), where the main-diagonal entries A and D are self-adjoint operators on Hilbert spaces H_A and H_D, respectively; the coupling B maps H_D to H_A and C is an operator from H_A to H_D. It is assumed that the spectrum σ_D of D is absolutely continuous and uniform, being presented by a single band [α,β]⊂R, α<β, and the spectrum σ_A of A is embedded into σ_D, that is, σ_A⊂(α,β). We formulate conditions under which there are bounded solutions to the operator Riccati equations associated with the complexly deformed block operator matrix L; in such a case the deformed operator matrix L admits a block diagonalization. The same conditions also ensure the Markus-Matsaev-type factorization of the Schur complement M_A(z)=A-z-B(D-z)-1C analytically continued onto the unphysical sheet(s) of the complex z plane adjacent to the band [α,β]. We prove that the operator roots of the continued Schur complement M_A are explicitly expressed through the respective solutions to the deformed Riccati equations.