Cyclicity in weighted p spaces
Abstract
We study the cyclicity in weighted p(Z) spaces. For p ≥ 1 and β ≥ 0, let p\β(Z) be the space of sequences u=(u\n)\n∈ Z such that (u\n |n|β)∈ p(Z) . We obtain both necessary conditions and sufficient conditions for u to be cyclic in p\β(Z), in other words, for \(u\n+k)\n ∈ Z,~ k ∈ Z \ to span a dense subspace of p\β(Z). The conditions are given in terms of the Hausdorff dimension and the capacity of the zero set of the Fourier transform of u.
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