Uniqueness of unconditional basis of Hp(T)2 and Hp(T)(2) for 0<p<1

Abstract

Our goal in this paper is to advance the state of the art of the topic of uniqueness of unconditional basis. To that end we establish general conditions on a pair (X, Y) formed by a quasi-Banach space X and a Banach space Y which guarantee that every unconditional basis of their direct sum X splits into unconditional bases of each summand. As application of our methods we obtain that, among others, the spaces Hp(Td) (2) and Hp(Td)2, for p∈(0,1) and d∈N, have a unique unconditional basis (up to equivalence and permutation).