Brouwer fixed point theorem as a corollary of Lawvere

Abstract

It is investigated in what sense the Brouwer fixed point theorem may be viewed as a corollary of the Lawvere fixed point theorem. A suitable generalisation of the Lawvere fixed point theorem is found and a means is identified by which the Brouwer fixed point theorem can be shown to be a corollary, once an appropriate continuous surjective mapping A' → XA'' has been constructed for each space X in a certain class of "nice" spaces for each one of which the exponential topology on XA'' exists, and here A' and A'' have the same carrier set and the topology on A' is finer than on A''. It is shown that there is a certain natural way of attempting to derive Brouwer as a corollary of Lawvere which is not possible, that is there is no space A for which the exponential topology on [0,1]A exists and there is a continuous surjection A → [0,1]A. We then examine the range of contexts in which phenomena like those described in the first result occur, from a broadly model-theoretic perspective, with a view towards applications for the original motivation for the problem as a problem in decision theory for AI systems, suggested by the Machine Intelligence Research Institute.