Rigidity properties of the cotangent complex

Abstract

This work concerns maps R S of commutative noetherian rings, locally of finite flat dimension. It is proved that the Andr\'e-Quillen homology functors are rigid, namely, if Dn(S/R;-)=0 for some n 2, then Dn(S/R;-)=0 for all n 2 and is locally complete intersection. This extends Avramov's theorem that draws the same conclusion assuming Dn(S/R;-) vanishes for all n 0, confirming a conjecture of Quillen. The rigidity of Andr\'e-Quillen functors is deduced from a more general result about the higher cotangent modules which answers a question raised by Avramov and Herzog, and subsumes a conjecture of Vasconcelos that was proved recently by the first author. The new insight leading to these results concerns the equivariance of a map from Andr\'e-Quillen cohomology to Hochschild cohomology defined using the universal Atiyah class of .