Fourier coefficients of continuous functions with sparse spectrum
Abstract
Let (rk) be an increasing sequence and (wk) a positive sequence. We study the following question: is it true that for every sequence (ak) satisfying Σk=0∞ |ak|2 wk2 < ∞ there exists a function f∈ C(T) such that f(2k) = ak and f(n) = 0 for n k [2k-rk,2k+rk]? We show that this is possible if and only if k∈NΣn=[2 rk]k wk-2 < ∞.
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