Browder's Theorem: from One-Dimensional Parameter Space to General Parameter Space

Abstract

A parametric version of Brouwer's Fixed Point Theorem, which is proven using the fixed-point index, states that for every continuous mapping f : (X × Y) Y, where X is nonempty, compact, and connected subset of a Hausdorff topological space and Y is a nonempty, convex, and compact subset of a locally-convex topological vector space, the set of fixed points of f, defined by Cf := \ (x,y) ∈ X × Y f(x,y)=y\, has a connected component whose projection onto the first coordinate is X. In this note we provide an elementary proof for this result, using its reduction to the case X = [0,1].