Lie models of homotopy automorphism monoids and classifying fibrations

Abstract

Given X a finite nilpotent simplicial set, consider the classifying fibrations X BautG*(X) BautG(X), X Z Bautπ*(X), where G and π denote, respectively, subgroups of the free and pointed homotopy classes of free and pointed self homotopy equivalences of X which act nilpotently on H*(X) and π*(X). We give algebraic models, in terms of complete differential graded Lie algebras (cdgl's), of the rational homotopy type of these fibrations. Explicitly, if L is a cdgl model of X, there are connected sub cdgl's DerG L and Derπ L of the Lie algebra Der L of derivations of L such that the geometrical realization of the sequences of cdgl morphisms Lad DerG L DerG L× sL, L L× Derπ L Derπ L have the rational homotopy type of the above classifying fibrations. Among the consequences we also describe in cdgl terms the Malcev Q-completion of G and π together with the rational homotopy type of the classifying spaces BG and Bπ.