Groups associated to 1-minimal models for binomial 1-algebras

Abstract

We give an explicit, cochain-level algebraic model for the pronilpotent completion of a group with finitely generated first cohomology. To each binomial 1-dga (A,dA) over R=Z or Fp (p prime) -- a differential graded algebra endowed with a Steenrod 1-product and a compatible binomial operation -- we associate a pronilpotent group G(A) that depends only on the 1-quasi-isomorphism type of A, provided H0(A)=R and H1(A) is a finitely generated free R-module. This group arises functorially from the 1-minimal model of A, which is unique up to isomorphism. When A=C*(X;R) is the cochain algebra of a connected CW-complex X with H1(X;R) finitely generated, the group G(A) recovers the Bousfield--Kan R-completion of π1(X) when R=Fp, and its pro-torsion-free-nilpotent completion when R=Z. Moreover, the group G(A) comes equipped with a natural inverse system \Gn(A)\n 1 whose structure maps Gn+1(A) Gn(A) are surjective. If A=C*(X;R), then Gn(A) is the quotient of π1(X) by the (n+1)th term of the fastest descending central series whose successive quotients are free R-modules. We give a purely algebraic necessary and sufficient criterion that, given an isomorphism Gn(A) Gn(B), determines whether Gn+1(A) Gn+1(B), and we illustrate the use of this criterion with examples distinguishing spaces with isomorphic cohomology rings.