T-admissible processes and noncommutative weighted ergodic theorems

Abstract

In this article, we study the bilaterally almost uniform (b.a.u.) convergence of weighted averages of a positive Dunford-Schwartz operator on the noncommutative Lp-spaces associated to a semifinite von Neumann algebra by a large number of weighting sequences. We do this by extending the classical "subsequence argument" to the noncommutative setting. This is then used to establish a large number of sequences satisfying a certain decay condition as good weights for the noncommutative individual ergodic theorem. This class includes those sequences generated by bounded i.i.d. sequences and the M\"obius function. We also study similar problems for T-admissible processes on a semifinite von Neumann algebra, showing that if a Wiener-Wintner type ergodic theorem holds for a class U⊂ Wq of weights for T-additive process, then it also holds for strongly p-bounded T-admissible processes, assuming that the duality 1p+1q=1 holds and that T is a normal τ-preserving *-automorphism.