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Independent sums of $H^1_n(\mathbb{T})$ and $H^1_n(δ)$

We construct a new idempotent Fourier multiplier on the Hardy space on the bidisc, which could not be obtained by applying known one dimentional results. The main tool is a new $L^1$ equivalent of the Stein martingale inequality which holds for a special filtration of periodic subsets of $\mathbb{T}$ with some restrictions on the functions involved. We also identify the isomorphic type of the range of the associated operator as the independent sum of dyadic $H^1_n$, which is known to be a complemented and invariant subspace of dyadic $H^1$.

preprint2016arXivOpen access
Maciej RzeszutMichal Wojciechowski
math.FAmath.CA
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Maciej RzeszutMichal Wojciechowski

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