Completeness of Discrete Translates in H1(R)

Abstract

We provide a characterization of discrete sets ⊂ R that admit a function whose -translates are complete in the Hardy space H1(R). In particular, we show that such a set cannot be uniformly discrete. We then give a uniformly discrete ⊂ R which admits a pair of functions such that their -translates are complete in H1(R).

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