In this paper we consider non-separable Gabor schemes for discrete-time signals. We show that three different interpretations of a non-separable lattice lead to three different types of implementation. First, a non-separable lattice can be seen as a union of rectangular lattices, which leads to a filter bank implementation. Secondly, a rectangular lattice can be obtained by shearing a non-separable lattice. As a direct consequence, conventional algorithms developed for rectangular lattices can be re-used for the non-separable case. And finally, interpreting the non-separable lattice as a sub-lattice of a denser rectangular lattice allows the use of the Zak transformation.
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