Spectral decomposition of some non-self-adjoint operators

Abstract

We consider non-self-adjoint operators in Hilbert spaces of the form H=H0+CWC, where H0 is self-adjoint, W is bounded and C is a metric operator, C bounded and relatively compact with respect to H0. We suppose that C(H0-z)-1C is uniformly bounded in z∈C. We define the spectral singularities of H as the points of the essential spectrum λ∈σess(H) such that C(H i)-1CW does not have a limit as 0+. We prove that the spectral singularities of H are in one-to-one correspondence with the eigenvalues, associated to resonant states, of an extension of H to a larger Hilbert space. Next, we show that the asymptotically disappearing states for H, i.e. the set of vectors such that e itH0 as t∞, coincide with the generalized eigenstates of H corresponding to eigenvalues λ∈C, (λ)>0. Finally, we define the absolutely continuous spectral subspace of H and show that it satisfies Hac(H)=Hp(H*), where Hp(H*) stands for the point spectrum of H*. We thus obtain a direct sum decomposition of the Hilbert spaces in terms of spectral subspaces of H. One of the main ingredients of our proofs is a spectral resolution formula for a bounded operator r(H) regularizing the identity at spectral singularities. Our results apply to Schr\"odinger operators with complex potentials.