Multi-window Gabor systems on discrete periodic sets

Abstract

In this paper, we study multiwindow discrete Gabor (M-D-G) systems G(g,L,M,N) on discrete periodic sets S and give some necessary and/or sufficient matrix-conditions for a M-D-G system in 2(S) to be a frame. We characterize, also, which M-D-G frames are Riesz bases by the parameters L, M and N. Matrix-characterizations of M-D-G Parseval frames and M-D-G orthonormal bases are also given. Then, we characterize the existence of M-D-G frames, M-D-G Parseval frames, M-D-G Riesz bases and M-D-G orthonormal bases for 2(Z) by the parameters M, N and L. We present, also, a matrix-characterization of dual M-D-G frames in 2(S). A perturbation matrix-condition of M-D-G frames is also prsented. We, then, show that a pair of M-D-G Bessel systems can generate pairs of M-D-G dual frames. By the Zak-transform, characterizations of complete M-D-G systems and M-D-G frames in 2(Z) are given in the case of M=N and necessary conditions for a M-D-G system to be a Riesz basis/ orthonormal basis for 2(Z) are also given. We, also, study M-D-G K-frames in 2(S), where K∈ B(2(S)\,), and presente some sufficient matrix-conditions for a M-D-G system to form a K-frame and give a construction method of M-D-G K-frames which are not M-D-G frames and some examples.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…