On g-Fusion Frames Representations via Linear Operators

Abstract

Let \M k \ k ∈ Z be a sequence of closed subspaces of Hilbert space H, and let \k\k ∈ Z be a sequence of linear operators from H into Mk, k ∈ Z. In the definition of fusion frames, we replace the orthogonal projections on M k by k and find a slight generalization of fusion frames. In the case where, k is self-adjoint and k(M k)= M k for all k ∈ Z, we show that if a g-fusion frame \(M k, k)\k ∈ Z is represented via a linear operator T on span \M k\ k ∈ Z, then T is bounded; moreover, if \(M k, k)\k ∈ Z is a tight g-fusion frame, then T is not invertible. We also study the perturbation and the stability of these fusion frames. Finally, we give some examples to show the validity of the results.