Individual ergodic theorems in noncommutative symmetric spaces

Abstract

It is known that, for a positive Dunford-Schwartz operator in a noncommutative Lp-space, 1≤ p<∞ or, more generally, in a noncommutative Orlicz space with order continuous norm, the corresponding ergodic averages converge bilaterally almost uniformly. We show that these averages converge bilaterally almost uniformly in each noncommutative symmetric space E such that μt(x) 0 as t 0 for every x ∈ E, where μt(x) is a non-increasing rearrangement of x. In particular, these averages converge bilaterally almost uniformly in all noncommutative symmetric spaces with order continuous norm.