Integrably bounded set-valued stochastic integrals

The paper is devoted to properties of Aumann and Ito set-valued stochastic integrals, defined as some set-valued random variables. In particular the problem of integrable boundedness of the generalized Ito set-valued stochastic integrals is considered. Unfortunately, Ito set-valued stochastic integrals, defined by E.J. Jung and J.H. Kim in the paper [5], are not in general integrably bounded (see [8,15]). Therefore, in the present paper we consider generalized Ito set-valued stochastic integrals (see [10,11]) defined for absolutely summable and countable subsets of the space IL2(IR+ x Omega, Sigma(IF),IRdxm) of all square integrable IF-nonanticipative matrix valued stochastic processes. Such integrals are integrably bounded and possess properties needed in the theory of set-valued stochastic equations. (C) 2017 Elsevier Inc. All rights reserved.