Characterization of the σ-Dedekind complete Riesz space by the subadditivity of its positive part mapping

Abstract

Two retractions M and N on convex cones M and respectively N of a real vector space X are called mutually polar if M+N=I and MN=NM=0. In this note it is shown, that if the cones M and N are generating, σ-monotone complete, M and N are σ-monotone continuous, then the subadditivity of M and N (with respect to the order relation induced by M and respectively N) imply that M and N are lattice cones. (X, M) and (X, N) become σ-Dedekind complete Riesz spaces, M and -N are the positive part , respectively the negative part mappings in (X, M); N and -M are the positive part, respectively the negative part mappings in (X, N).