The set of limits of Riemann integral sums of a multifunction and Banach space geometry

Abstract

Let X be a Banach space and F: [0, 1] → 2X \ \ be a bounded multifunction. We study properties of the set I(F) of limits in Hausdorff distance of Riemann integral sums of F. The main results are: (1) I(F) is convex in the case of finite-dimensional X; (2) I(F) = I(conv F) in B-convex spaces or for compact-valued multifunctions; (3) I(F) consists of convex sets whenever X is B-convex; (4) I(F) is star-shaped (thus non-empty) for compact-valued multifunctions in separable spaces. (5) For each infinite-dimensional Banach space there is a bounded multifunction with empty I(F).