A fixed point theorem for the infinite-dimensional simplex
Abstract
We define the infinite dimensional simplex to be the closure of the convex hull of the standard basis vectors in Rinfinity, and prove that this space has the 'fixed point property': any continuous function from the space into itself has a fixed point. Our proof is constructive, in the sense that it can be used to find an approximate fixed point; the proof relies on elementary analysis and Sperner's lemma. The fixed point theorem is shown to imply Schauder's fixed point theorem on infinite-dimensional compact convex subsets of normed spaces.
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