Matrix-Valued Gabor Frames over LCA Groups for Operators

Abstract

G avruta studied atomic systems in terms of frames for range of operators (that is, for subspaces), namely K-frames, where the lower frame condition is controlled by the Hilbert-adjoint of a bounded linear operator K. For a locally compact abelian group G and a positive integer n, we study frames of matrix-valued Gabor systems in the matrix-valued Lebesgue space L2(G, Cn× n) , where a bounded linear operator on L2(G, Cn× n) controls not only lower but also the upper frame condition. We term such frames matrix-valued (, *)-Gabor frames. Firstly, we discuss frame preserving mapping in terms of hyponormal operators. Secondly, we give necessary and sufficient conditions for the existence of matrix-valued (, *)- Gabor frames in terms of hyponormal operators. It is shown that if is adjointable hyponormal operator, then L2(G, Cn× n) admits a λ-tight (, *)-Gabor frame for every positive real number λ. A characterization of matrix-valued (, *)-Gabor frames is given. Finally, we show that matrix-valued (, *)-Gabor frames are stable under small perturbation of window functions. Several examples are given to support our study.