Extension Of The Bauer's Maximum Principle For Compact Metrizable Sets

Let X be a nonempty convex compact subset of some Haus-dorff locally convex topological vector space S. The well know Bauer's maximum principle stats that every convex upper semi-continuous function from X into R attains its maximum at some extremal point of X. We give some extensions of this result when X is assumed to be compact metrizable. We prove that the set of all convex upper semi-continuous functions attaining there maximum at exactly one extremal point of X is a G $\delta$ dense subset of the space of all convex upper semi-continuous functions equipped with a metric compatible with the uniform convergence .