Order continuous Borel liftings (Q802780)

One of the well known theorems of A. and C. Ionescu Tulcea is as follows: Every bounded linear operator \(T: L^{\infty}_{\mu}- L^{\infty}_{\mu}\) has a lifting \(\hat T\) taking values in the space of bounded \(\mu\) measurable functions [refer \textit{A.} and \textit{C. Ionescu Tulcea}: Topics on the theory of lifting (1969; Zbl 0179.463)]. The author of this paper poses the problem if the set of bounded \(\mu\) measurable functions can be replaced by the set of Borel functions in the above mentioned theorem. With that in view the author considers order continuous operators on \(L^{\infty}_{\mu}\) and characterizes those which have order continuous lifting \(\hat T\) taking values in the set of Borel functions.