On the Cyclicity of Dilated Systems in Lattices: Multiplicative Sequences, Polynomials, Dirichlet-type Spaces and Algebras
Abstract
The aim of these notes is to discuss the completeness of the dilated systems in a most general framework of an arbitrary sequence lattice X, including weighted p spaces. In particular, general multiplicative and completely multiplicative sequences are treated. After the Fourier--Bohr transformation, we deal with the cyclicity property in function spaces on the corresponding infinite dimensional Reinhardt domain D∞X'. Functions with (weakly) dominating free term and (in particular) linearly factorable functions are considered. The most attention is paid to the cases of the polydiscs D∞X'|CN=DN and the p-unit balls D∞X'|CN=BpN, in particular to Dirichlet-type and Dirichlet--Drury--Arveson-type spaces and algebras, as X=p(Z+N,(1+α)s), s=(s1,s2,…) and X=p(Z+N,(α!|α|!)t(1+|α|)s), s,t≥ 0, as well as to their infinite variables analogues. We privileged the largest possible scale of spaces and the most elementary instruments used.
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