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On the Projections of Multivalued Maps

Authors:	U Raitums

Abstract:	This paper considers analogues of the Helmholtz projections of the set of selections of a piecewise smooth multivalued map $\prod :R^n \to 2^{R^{m \times n} }$ , n2. It is shown that, for mn–1 (m=1), the closure of the projection of on the subspace of gradient fields (solenoidal vector fields) is a convex set. For the general case, there are given point-wise conditions on the values of the map which ensure that the closure of the projection of contains the zero element. Possible applications to optimal control problems are discussed.

Keywords:	Multivalued maps Helmholtz projection rank r convex hull extensions of optimal control problems
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