This book is among the first concise presentations of the set-valued stochastic integration theory as well as its natural
applications, as well as the first to contain complex approach theory of set-valued stochastic integrals. Taking particular
consideration of set-valued Ito , set-valued stochastic Lebesgue, and stochastic Aumann integrals, the volume is divided into
nine parts. It begins with preliminaries of mathematical methods that are then applied in later chapters containing the main
results and some of their applications, and contains many new problems. Methods applied in the book are mainly based on functional
analysis, theory of probability processes, and theory of set-valued mappings.
The volume will appeal to students of mathematics,
economics, and engineering, as well as to mathematics professionals interested in applications of the theory of set-valued