Infinite loop space machine

In topology, a branch of mathematics, given a topological monoid X up to homotopy (in a nice way), an infinite loop space machine produces a group completion of X together with infinite loop space structure. For example, one can take X to be the classifying space of a symmetric monoidal category S; that is, ${\displaystyle X=BS}$. Then the machine produces the group completion ${\displaystyle BS\to K(S)}$. The space ${\displaystyle K(S)}$ may be described by the K-theory spectrum of S.

In 1977 Robert Thomason proved the equivalence of all infinite loop space machines^[1] (he was just 25 years old at the moment.) He published this result next year in a joint paper with John Peter May.

• J. P. May and R. Thomason The uniqueness of infinite loop space machines

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