Abstract
We introduce the notion of strongly t -convex set-valued maps and present some properties of it. In particular, a Bernstein-Doetsch and Sierpiński-type theorems for strongly midconvex set-valued maps, as well as a Kuhn-type result are obtained. A representation of strongly t -convex set-valued maps in inner product spaces and a characterization of inner product spaces involving this representation is given. Finally, a connection between strongly convex set-valued maps and strongly convex sets is presented. © 2013 The Author(s).
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CITATION STYLE
Leiva, H., Merentes, N., Nikodem, K., & Sánchez, J. L. (2013). Strongly convex set-valued maps. In Journal of Global Optimization (Vol. 57, pp. 695–705). https://doi.org/10.1007/s10898-013-0051-4
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