On a family of frames for Krein spaces

Abstract

A definition of frames for Krein spaces is proposed, which extends the notion of J-orthonormal basis of Krein spaces. A J-frame for a Krein space (, \,\,) is in particular a frame for in the Hilbert space sense. But it is also compatible with the indefinite inner product \,\,, meaning that it determines a pair of maximal uniformly J-definite subspaces with different positivity, an analogue to the maximal dual pair associated to a J-orthonormal basis. Also, each J-frame induces an indefinite reconstruction formula for the vectors in , which resembles the one given by a J-orthonormal basis.