Koszul duality for simplicial restricted Lie algebras

Abstract

Let s0Lier be the category of 0-reduced simplicial restricted Lie algebras over a fixed perfect field of positive characteristic p. We prove that there is a full subcategory Ho(s0Lier) of the homotopy category Ho(s0Lier) and an equivalence Ho(s0Lier)(s1CoAlgtr). Here s1CoAlgtr is the category of 1-reduced simplicial truncated coalgebras; informally, a coaugmented cocommutative coalgebra C is truncated if xp=0 for any x from the augmentation ideal of the dual algebra C*. Moreover, we provide a sufficient and necessary condition in terms of the homotopy groups π*(L) for L ∈ Ho(s0Lier) to lie in the full subcategory Ho(s0Lier). As an application of the equivalence above, we construct and examine an analog of the unstable Adams spectral sequence of A. K. Bousfield and D. Kan in the category sLier. We use this spectral sequence to recompute the homotopy groups of a free simplicial restricted Lie algebra.