On polynomial d-chaos via d-dissociated character subsystems on compact abelian groups
Abstract
In this paper, we study polynomial chaoses of degree d constructed from sequences of functions; that is, sets of all possible d-fold products of sequence elements, allowing repeated factors. The tetrahedral chaos of degree d is defined as the subset consisting of products with pairwise distinct factors. We prove that polynomial d-chaoses (and, consequently, the tetrahedral chaoses) with respect to d-dissociated subsystems of characters on compact abelian groups are q-lacunary and 2d/(d+1)-Sidon systems.
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