On different modes of order convergence and some applications

Abstract

Different notions for order convergence have been considered by various authors. Associated to every notion of order convergence corresponds a topology, defined by taking as the closed sets those subsets of the poset satisfying that no net in them order converges to a point that is outside of the set. We shall give a thorough overview of these different notions and provide a systematic comparison of the associated topologies. Then, in the last section we shall give an application of this study by giving a result on von Neumann algebras complementing the study started in ChHaWe. We show that for every atomic von Neumann algebra (not necessarily σ-finite) the restriction of the order topology to bounded parts of M coincides with the restriction of the σ-strong topology s(M,M). We recall that the methods of ChHaWe rest heavily on the assumption of σ-finiteness. Further to this, for a semi-finite measure space, we shall give a complete picture of the relations between the topologies on L∞ associated with the duality L1, L∞ and its order topology.