Bounded common fundamental domains for two lattices
Abstract
We prove that for any two lattices L, M ⊂eq Rd of the same volume there exists a measurable, bounded, common fundamental domain of them. In other words, there exists a bounded measurable set E ⊂eq Rd such that E tiles Rd when translated by L or by M. In fact, the set E can be taken to be a finite union of polytopes. A consequence of this is that the indicator function of E forms a Weyl--Heisenberg (Gabor) orthogonal basis of L2(Rd) when translated by L and modulated by M*, the dual lattice of M.
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