Martini, Horst ; Wenzel, Walter : An analogue of the Krein-Milman Theorem for star-shaped sets
- Author(s):
-
Martini, Horst
Wenzel, Walter
- Title:
- An analogue of the Krein-Milman Theorem for star-shaped sets
- Preprint series:
- Technische Universität Chemnitz, Fakultät für Mathematik (Germany). Preprint 4, 2001
- Mathematics Subject Classification:
-
06A15 [ Galois correspondences, closure operators ] 52-01 [ Instructional exposition (textbooks, tutorial papers, etc.) ] 52A20 [ Convex sets in $n$ dimensions (including convex hypersurfaces) ] 52A30 [ Variants of convex sets (star-shaped, ($m, n$)-convex, etc.) ] - Abstract:
- If $S \subseteq R^n$ is compact and star-shaped, we consider a fixed, nonempty, compact and convex subset K of the convex kernel of S. We prove that $\sigma(sol=S\backslash K$, where $\sigma : \rho(R^n \backslash K) \rightarrow \rho(R^n \backslash T)$ denotes same closure operator induced by visibility problems, and so denotes the - appropriately defined - set of extreme points of S modula K
- Keywords:
- convex sets, star-shaped sets, closure operators, Krein-Milman theorem, visibility problems, d- dimensional volume
- Language:
-
English
- Publication time:
- 11 / 2001
