Convergence of Random Bounded Linear Operators in the Skorokhod Space

This chapter presents a suitable topology to study the convergence of operator-valued random variables in the Skorokhod space. It introduces the space of random bounded linear operators on a separable Banach space such that their range belongs to the Skorokhod space of right-continuous with left hand limit functions. The chapter proves almost sure and weak convergence results for the sequences of random variables by martingale methods.