Naive liftings of DG modules

Abstract

Let n be a positive integer, and let A be a strongly commutative differential graded (DG) algebra over a commutative ring R. Assume that (a) B=A[X1,...,Xn] is a polynomial extension of A, where X1,...,Xn are variables of positive degrees; or (b) A is a divided power DG R-algebra and B=A<X1,...,Xn> is a free extension of A obtained by adjunction of variables X1,...,Xn of positive degrees. In this paper, we study naive liftability of DG modules along the natural injection A-->B using the notions of diagonal ideals and homotopy limits. We prove that if N is a bounded below semifree DG B-module such that ExtBi(N, N)=0 for all i>0, then N is naively liftable to A. This implies that N is a direct summand of a DG B-module that is liftable to A. Also, the relation between naive liftability of DG modules and the Auslander-Reiten Conjecture has been described.