Ciprian Demeter, S. Zubin Gautam
Published 2010-07-12, updated 2011-09-02Version 2
In the restricted setting of product phase space lattices, we give an alternate proof of P. Linnell's theorem on the finite linear independence of lattice Gabor systems in $L^2(\mathbb R^d)$. Our proof is based on a simple argument from the spectral theory of random Schr\"odinger operators; in the one-dimensional setting, we recover the full strength of Linnell's result for general lattices.
Comments: 13 pages, no figures. Minor errors corrected, additional explanation added to proofs in Section 4
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