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Convex function, their extensions and extremal structure of their epigraphs

Let f be a real valued function with the domain dom(f) in some vector
space X and let C be the collection of convex subsets of X. The following
two questions are investigated;
1. Do there exist maximal convex restrictions g of f with dom(g) 2 C?
2. If f is convex with dom(f) 2 C, do there exist maximal convex extension
g of f with dom(g) 2 C?
We will show that the answer to both questions is positive under a certain
condition on C.
We also show that the extreme points of the epigraph of a real continuous
strictly convex function are dense in the graph of such a function, and the
set of such extreme points of an epigraph may be equal to the graph.
Moreover we show that a set of extreme points of an epigraph may be equal
to a graph of such a convex function under certain conditions. We also
discuss conditions under which an epigraph of a real convex function on a
Banach space X may, and may not, have extreme points, denting points
and/or strongly exposed points.
One of the interesting results in this discussion is that boundary points,
extreme points, denting points and the graphs in an closed epigraph of a
strictly convex function coincide. Moreover, we show that there is relationship
between the extremal structure of an epigraph of a convex function
and a point in a domain on which such a function attains its minimum.

Identiferoai:union.ndltd.org:netd.ac.za/oai:union.ndltd.org:wits/oai:wiredspace.wits.ac.za:10539/12374
Date04 February 2013
CreatorsNthebe, Johannes. M. T.
Source SetsSouth African National ETD Portal
LanguageEnglish
Detected LanguageEnglish
TypeThesis
Formatapplication/pdf

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