Infinitary commutativity and fundamental groups of topological monoids

Abstract

The well-known Eckmann-Hilton Principle may be applied to prove that fundamental groups of H-spaces are commutative. In this paper, we identify an infinitary analogue of the Eckmann-Hilton Principle that applies to fundamental groups of all topological monoids and slightly more general objects called pre--monoids. In particular, we show that every pre--monoid M is "transfinitely π1-commutative" in the sense that permutation of the factors of any infinite loop-concatenation indexed by a countably infinite order and based at the identity e∈ M is a homotopy invariant action. We also give a detailed account of fundamental groups of James reduced products and apply transfinite π1-commutativity to make several computations.