Discrete Zak Transform and Multi-window Gabor Systems on Discrete Periodic Sets
Abstract
In this paper, G(g,L,M,N) denotes a L-window Gabor system on a periodic set S, where L,M,M∈ N and g=\gl\l∈ NL⊂ 2(S). We characterize which g generates a complete multi-window Gabor system and a multi-window Gabor frame G(g,L,M,N) on S using the Zak transform. Admissibility conditions for a periodic set to admit a complete multi--window Gabor system, multi-window Gabor (Parseval) frame, and multi--window Gabor (orthonormal) basis G(g,L,M,N) are given with respect to the parameters L, M and N.
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