Brouwer Fixed Point Theorem in (L0)d
Abstract
The classical Brouwer fixed point theorem states that in Rd every continuous function from a convex, compact set on itself has a fixed point. For an arbitrary probability space, let L0 = L0 (, A,P) be the set of random variables. We consider (L0)d as an L0-module and show that local, sequentially continuous functions on closed and bounded subsets have a fixed point which is measurable by construction.
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