Connection between the Riemann integrability of a multi-valued function and of its convex hull
Abstract
For a Banach space X we demonstrate the equivalence of the following two properties: (1) X is B-convex (that is, possesses a nontrivial infratype), and (2) if F: [0,1] 2X \\ is a multifunction, conv F denotes the mapping t conv F(t), then the Riemann integrability of conv F is equivalent to the Riemann integrability of F. For multifunctions with compact values the Riemann integrability of conv F is equivalent to the Riemann integrability of F without any restrictions on the Banach space X.
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