Finite Riesz products and Ornstein non-inequalities on quantum tori
Abstract
We demonstrate a construction of products on the quantum torus Tθ2 that generalises the usual construction of finite Riesz products on the commutative torus T2. We explain why the former constitutes a natural analogue of the latter in the non-commutative setting and, based on this construction, as well as on previous results by K. Kazaniecki and the second author, we prove a non-commutative version of an Ornstein non-inequality.
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