Realization of Lie algebras and classifying spaces of crossed modules

Abstract

The category of complete differential graded Lie algebras provides nice algebraic models for the rational homotopy types of non-simply connected spaces. In particular, there is a realization functor, -, of any complete differential graded Lie algebra as a simplicial set. In a previous article, we considered the particular case of a complete graded Lie algebra, L0, concentrated in degree 0 and proved that L0 is isomorphic to the usual bar construction on the Malcev group associated to L0. Here we consider the case of a complete differential graded Lie algebra, L=L0 L1, concentrated in degrees 0 and 1. We establish that the category of such two-stage Lie algebras is equivalent to explicit subcategories of crossed modules and Lie algebra crossed modules, extending the equivalence between pronilpotent Lie algebras and Malcev groups. In particular, there is a crossed module C(L) associated to L. We prove that C(L) is isomorphic to the Whitehead crossed module associated to the simplicial pair ( L, L0). Our main result is the identification of L with the classifying space of C(L).