On Haagerup noncommutative quasi Hp() spaces

Abstract

Let M be a σ-finite von Neumann algebra, equipped with a normal faithful state , and let A be a maximal subdiagonal subalgebra of M. We have proved that for 0< p<1, Hp(A) is independent of . Furthermore, in the case that A is a type 1 subdiagonal subalgebra, we have extended the most recent results about the Riesz type factorization to the case 0<p<1 and have proved an interpolation theorem for Hp(A) in the case where 0 < p0, p1 ∞.

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