Products of Conditional Expectation Operators: Convergence and Divergence

Abstract

In this paper, we investigate the convergence of products of conditional expectation operators. We show that if (,F,P) is a probability space that is not purely atomic, then divergent sequences of products of conditional expectation operators involving 3 or 4 sub-σ-fields of F can be constructed for a large class of random variables in L2(,F,P). This settles in the negative a long-open conjecture. On the other hand, we show that if (,F,P) is a purely atomic probability space, then products of conditional expectation operators involving any finite set of sub-σ-fields of F must converge for all random variables in L1(,F,P).