Limit theorems for σ-localized \'Emery convergence

Abstract

Given a bounded sequence \Xn\n of semimartingales on a time interval [0,T], we find a sequence of convex combinations \Yn\n and a limiting semimartingale Y such that \Yn\n converges to Y in a σ-localized modification of the \'Emery topology. More precisely, \Yn\n converges to Y in the \'Emery topology on an increasing sequence \Dn\n of predictable sets covering ×[0,T]. We also prove some technical variants of this theorem, including a version where the complement of \Dn\n forms a disjoint sequence. Applications include a complete characterization of sequences admitting convex combinations converging in the \'Emery topology, and a supermartingale counterpart of Helly's selection theorem.