Maximality and numeraires in convex sets of nonnegative random variables

摘要

We introduce the concepts of max-closedness and numeraires of convex subsets of L-+(0), the nonnegative orthant of the topological vector space L of all random variables built over a probability space, equipped with a topology consistent with convergence in probability. Max-closedness asks that maximal elements of the closure of a set already lie on the set. We discuss how numeraires arise naturally as strictly positive optimisers of certain concave monotone maximisation problems. It is further shown that the set of numeraires of a convex, max-closed and bounded set of L-+(0) that contains at least one strictly positive element is dense in the set of its maximal elements. (C) 2015 Elsevier Inc. All rights reserved.