Difference between revisions of "Bauer simplex"
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| − | A non-empty compact convex subset | + | {{TEX|done}} |
| + | A non-empty compact convex subset $K$ of a [[Locally convex space|locally convex space]] that is a [[Choquet simplex|Choquet simplex]] and such that the set $\partial_eK$ of its extreme points is closed (cf. also [[Convex hull|Convex hull]]). | ||
| − | Bauer simplices are also characterized as the compact convex subsets | + | Bauer simplices are also characterized as the compact convex subsets $K$ such that every real-valued [[Continuous function|continuous function]] on $\partial_eK$ can be extended to a (unique) continuous affine function on $K$, or, equivalently, for which every point in $K$ is in the barycentre of a unique probability measure on $K$ supported by $\partial_eK$. |
Such sets have been studied for the first time by H. Bauer [[#References|[a3]]]. They were called Bauer simplices in [[#References|[a1]]]. See [[#References|[a1]]] for their relation with several aspects of convexity theory and potential theory. | Such sets have been studied for the first time by H. Bauer [[#References|[a3]]]. They were called Bauer simplices in [[#References|[a1]]]. See [[#References|[a1]]] for their relation with several aspects of convexity theory and potential theory. | ||
Latest revision as of 12:50, 4 September 2014
A non-empty compact convex subset $K$ of a locally convex space that is a Choquet simplex and such that the set $\partial_eK$ of its extreme points is closed (cf. also Convex hull).
Bauer simplices are also characterized as the compact convex subsets $K$ such that every real-valued continuous function on $\partial_eK$ can be extended to a (unique) continuous affine function on $K$, or, equivalently, for which every point in $K$ is in the barycentre of a unique probability measure on $K$ supported by $\partial_eK$.
Such sets have been studied for the first time by H. Bauer [a3]. They were called Bauer simplices in [a1]. See [a1] for their relation with several aspects of convexity theory and potential theory.
More recently (1990s), new connections between them and some general problems in the approximation of continuous functions by positive operators and abstract degenerate elliptic-parabolic problems have been discovered (see, e.g., [a2]).
References
| [a1] | E.M. Alfsen, "Compact convex sets and boundary integrals" , Springer (1971) |
| [a2] | F. Altomare, M. Campiti, "Korovkin type approximation theory and its applications" , W. de Gruyter (1994) |
| [a3] | H. Bauer, "Schilowsche Rand und Dirichletsches Problem" Ann. Inst. Fourier , 11 (1961) pp. 89–136 |
Bauer simplex. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Bauer_simplex&oldid=33240