On the Cohen-Macaulay property of the Rees algebra of the module of differentials

Abstract

Let R be an algebra essentially of finite type over a field k and let k(R) be its module of K\"ahler differentials over k. If R is a homogeneous complete intersection and char(k)=0, we prove that k(R) is of linear type whenever its Rees algebra is Cohen-Macaulay and locally at every homogeneous prime p the embedding dimension of Rp is at most twice its dimension.