On the Annihilation of Thin Sets
Abstract
One says that a pair of sets (S,Q) in R is 'annihilating' if no function can be concentrated on S while having its Fourier transform concentrated on Q. One uses to distinguish between weak and strong annihilation types. It is well known that if both sets S and Q are of finite measure then they are strongly annihilating. In this paper we prove that if S is a set of finite measure with periodic gaps, and Q is a set of density zero, then weak annihilation holds. On the other hand a counter-example is constructed, showing that strong annihilation, in general, does not.
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