Partial Convexity |
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Authors: | V G Naidenko |
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Institution: | 1. Institute of Mathematics, Belarus National Academy of Sciences, Belarus
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Abstract: | We study OC-convexity, which is defined by the intersection of conic semispaces of partial convexity. We investigate an optimization problem for OC-convex sets and prove a Krein--Milman type theorem for OC-convexity. The relationship between OC-convex and functionally convex sets is studied. Topological and numerical aspects, as well as separability properties are described. An upper estimate for the Carathéodory number for OC-convexity is found. On the other hand, it happens that the Helly and the Radon number for OC-convexity are infinite. We prove that the OC-convex hull of any finite set of points is the union of finitely many polyhedra. |
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