Browder's Theorem through Brouwer's Fixed Point Theorem

Abstract

One of the conclusions of Browder (1960) is a parametric version of Brouwer's Fixed Point Theorem, stating that for every continuous function f : ([0,1] × X) X, where X is a simplex in a Euclidean space, the set of fixed points of f, namely, the set \(t,x) ∈ [0,1] × X f(t,x) = x\, has a connected component whose projection on the first coordinate is [0,1]. Browder's (1960) proof relies on the theory of the fixed point index. We provide an alternative proof to Browder's result using Brouwer's Fixed Point Theorem.