Homotopy theory of monoid actions via group actions and an Elmendorf style theorem

Abstract

Let M be a monoid and G:Mon Grp be the group completion functor from monoids to groups. Given a collection X of submonoids of M and for each N∈ X a collection YN of subgroups of G(N), we construct a model structure on the category of M-spaces and M-equivariant maps, called the ( X, Y)-model structure, in which weak equivalences and fibrations are induced from the standard YN-model structures on G(N)-spaces for all N∈ X. We also show that for a pair of collections (X,Y) there is a small category O(X,Y) whose objects are M-spaces M×NG(N)/H for each N∈ X and H∈ YN and morphisms are M-equivariant maps, such that the ( X, Y)-model structure on the category of M-spaces is Quillen equivalent to the projective model structure on the category of contravariant O(X,Y)-diagrams of spaces.