Cyclicity in p spaces and zero sets of the Fourier transforms

Abstract

We study the cyclicity of vectors u in p(Z). It is known that a vector u is cyclic in 2(Z) if and only if the zero set, Z(u), of its Fourier transform, u, has Lebesgue measure zero and |u| ∈ L1(T), where T is the unit circle. Here we show that, unlike 2(Z), there is no characterization of the cyclicity of u in p(Z), 1<p<2, in terms of Z(u) and the divergence of the integral ∫\T |u| . Moreover we give both necessary conditions and sufficient conditions for u to be cyclic in p(Z), 1<p<2.