A freeness criterion without patching for modules over local rings

Abstract

It is proved that if A B is a local homomorphism of commutative noetherian local rings, a nonzero finitely generated B-module N whose flat dimension over A is at most edim\, A - edim\, B, is free over B, and is a special type of complete intersection. This result is motivated by a "patching method" developed by Taylor and Wiles, and a conjecture of de Smit, proved by the first author, dealing with the special case when N is flat over A.