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A note on summands of compact convex sets

Published online by Cambridge University Press:  26 February 2010

Jerzy Grzybowski
Affiliation:
Faculty of Mathematics, Adam Mickiewicz University, ul. Matejki 48/49, 60-769 Poznań, Poland.
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Abstract

In this paper we prove that a maximal common summand of two compact convex sets in R2 is unique up to translation.

Type
Research Article
Copyright
Copyright © University College London 1996

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References

D-R.Demyanov, V. F. and Rubinov, A. M.. Quasidifferential Calculus (Optimization Software Inc., Springer-Verlag, 1986).CrossRefGoogle Scholar
G.Grzybowski, J.. Minimal pairs of convex compact sets. Archiv der Math., 63 (1994), 173181.CrossRefGoogle Scholar
P-S-U.Pallaschke, D.Scholtes, S. and Urbanski, R.. On minimal pairs of convex compact sets. Bull. Acad. Polon. Sci., Ser. Sci. Math., 39 (1991), 105109.Google Scholar
P-U.Pallaschke, D. and Urbanski, R.. Some criteria for the minimality of pairs of convex compact sets. Zeitschrift fur Operations Research, 37 (1993), 129150.Google Scholar
R-A.Rubinov, A. M. and Akhundov, I. S.. Differences of compact sets in the sense of Demyanov and its application to non-smooth analysis. Optimization 23, (1992), 179189.CrossRefGoogle Scholar
S1.Scholtes, S.. Minimal pairs of convex bodies in two dimensions, Mathematika, 39 (1992), 267273.CrossRefGoogle Scholar
S2.Scholtes, S.. On convex bodies and some applications to optimization, Doctoral Thesis (University of Karlsruhe).Google Scholar