Weaving K-frames in Hilbert Spaces

Abstract

Gavruta introduced K-frames for Hilbert spaces to study atomic systems with respect to a bounded linear operator. There are many differences between K-frames and standard frames, so we study weaving properties of K-frames. Two frames \φi\i ∈ I and \i\i ∈ I for a separable Hilbert space H are woven if there are positive constants A ≤ B such that for every subset σ ⊂ I, the family \φi\i ∈ σ \i\i ∈ σc is a frame for H with frame bounds A, B. In this paper, we present necessary and sufficient conditions for weaving K-frames in Hilbert spaces. It is shown that woven K-frames and weakly woven K-frames are equivalent. Finally, sufficient conditions for Paley-Wiener type perturbation of weaving K-frames are given.