Characterization of strongly exposed points in \(L_2(T,X)\) (Q1586987)

The author proves that an integrable selection \(f\) of a multifunction \(F\) is a strongly exposed point of the set of all integrable selections of \(F\) if and only if \(f(t)\) is a strongly exposed point of the set \(F(t)\) for almost every \(t\in [0,1]\). Here \(F\) is a measurable multifunction on the interval \([0,1]\) with values in the set of bounded closed convex subsets of a separable Banach space.