A convex-valued selection theorem with a non-separable Banach space (Q1748285)

Let \(X\) be a metric space and \(Y\) a Banach space, not necessarily separable. It is proved that a lower semicontinuous convex-valued multifunction from \(X\) to \(Y\) admits a continuous selection provided its values are either closed or finite-dimensional. The proof, geometrical in nature, and using the concept of peeling, does however not assure the existence of a representation of Castaing-Novikov type, permitting to recreate the whole multifunction.