On random convex analysis -- the analytic foundation of the module approach to conditional risk measures

Abstract

To provide a solid analytic foundation for the module approach to conditional risk measures, this paper establishes a complete random convex analysis over random locally convex modules by simultaneously considering the two kinds of topologies (namely the (,λ)--topology and the locally L0-- convex topology). Then, we make use of the advantage of the (,λ)--topology and grasp the local property of L0--convex conditional risk measures to prove that every L0--convex Lp--conditional risk measure (1≤ p≤+∞) can be uniquely extended to an L0--convex LpF(E)--conditional risk measure and that the dual representation theorem of the former can also be regarded as a special case of that of the latter, which shows that the study of Lp--conditional risk measures can be incorporated into that of LpF(E)--conditional risk measures. In particular, in the process we find that combining the countable concatenation hull of a set and the local property of conditional risk measures is a very useful analytic skill that may considerably simplify and improve the study of L0--convex conditional risk measures.