Frames of subspaces in Hilbert spaces with W-metrics

Abstract

If (,·,·) is a Hilbert space and on it we consider the sesquilinear form \,W·,· so-called W-metric, where W*=W∈, and \,W=\0\, then the space (,\,W·,·) is called Hilbert space with W-metric or simply W-space. In this paper we investigate the dynamic of frames of subspace on these spaces, where the sense of dynamics refers to the behavior of frames of subspace in W (the completion of (,\,W·,·)) comparing with and vice versa. This work is based on the study made in KEFER,GMMM on frames in Krein spaces. In a similar way, Casazza and Kutyniok obtained some results in the context of Hilbert spaces, see CG. We take tools of theory of C*-algebra, and properties of , to show that every Hilbert space with W-metric W with 0∈σ(W) has a decomposition W=n∈\∞\_nW, where _nW (σ(W),x\,dμn(x)) are Krein spaces, for every n∈\∞\. Moreover, we investigate the dynamics of frames of subspace when the self-adjoint operator W is unbounded.