Browder's Theorem with General Parameter Space
Abstract
Browder (1960) proved that for every continuous function F : X × Y Y, where X is the unit interval and Y is a nonempty, convex, and compact subset of n, the set of fixed points of F, defined by CF := \ (x,y) ∈ X × Y F(x,y)=y\ has a connected component whose projection to the first coordinate is X. We extend this result to the case where X is a connected and compact Hausdorff space.
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