Boundedness of operator-valued commutators involving martingale paraproducts
Abstract
Let 1<p<∞. We show the boundedness of operator-valued commutators [πa,Mb] on the noncommutative Lp(L∞(R) M) for any von Neumann algebra M, where πa is the d-adic martingale paraproduct with symbol a∈ BMOd(R) and Mb is the noncommutative left multiplication operator with b∈ BMOdM(R). Besides, we consider the extrapolation property of semicommutative d-adic martingale paraproducts in terms of the BMOdM(R) space.
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