Maximal weak Orlicz types and the strong maximal on von Neumann algebras
Abstract
Let En: M Mn and Em: N Nm be two sequences of conditional expectations on finite von Neumann algebras. The optimal weak Orlicz type of the associated strong maximal operator E = (En Em)n,m is not yet known. In a recent work of Jose Conde and the two first-named authors, it was show that E has weak type (, ) for a family of functions including (t) = t \, 2+ t, for every > 0. In this article, we prove that the weak Orlicz type of E cannot be lowered below L 2 L, meaning that if E is of weak type (, ), then (s) ∈ o(s \, 2 s). Our proof is based on interpolation. Namely, we use recent techniques of Cadilhac/Ricard to formulate a Marcinkiewicz type theorem for maximal weak Orlicz types. Then, we show that a weak Orlicz type lower than L 2 L would imply a p-operator constant for E smaller than the known optimum as p 1+.
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