On local convexity in L0 and switching probability measures

Abstract

In the paper, we investigate the following fundamental question. For a set K in L0(P), when does there exist an equivalent probability measure Q such that K is uniformly integrable in L1(Q). Specifically, let K be a convex bounded positive set in L1(P). Kardaras [6] asked the following two questions: (1) If the relative L0(P)-topology is locally convex on K, does there exist Q P such that the L0(Q)- and L1(Q)-topologies agree on K? (2) If K is closed in the L0(P)-topology and there exists Q P such that the L0(Q)- and L1(Q)-topologies agree on K, does there exist Q' P such that K is Q'-uniformly integrable? In the paper, we show that, no matter K is positive or not, the first question has a negative answer in general and the second one has a positive answer. In addition to answering these questions, we establish probabilistic and topological characterizations of existence of Q satisfying these desired properties. We also investigate the peculiar effects of K being positive.