Cross-Gram Matrix associated to two sequences in Hilbert spaces

Abstract

The conditions for sequences \fk\k=1∞ and \gk\k=1∞ being Bessel sequences, frames or Riesz bases, can be expressed in terms of the so-called cross-Gram matrix. In this paper we investigate the cross-Gram operator, G, associated to the sequence \ fk, gj\j, k=1∞ and sufficient and necessary conditions for boundedness, invertibility, compactness and positivity of this operator are determined depending on the associated sequences. We show that invertibility of G is not possible when the associated sequences are frames but not Riesz Bases or at most one of them is Riesz basis. In the special case we prove that G is a positive operator when \gk\k=1∞ is the canonical dual of \fk\k=1∞.