Tensoring with the Frobenius endomorphism

Abstract

Let R be a commutative Noetherian Cohen-Macaulay local ring that has positive dimension and prime characteristic. Li proved that the tensor product of a finitely generated non-free R-module M with the Frobenius endomorphism ^n\!R is not maximal Cohen-Macaulay provided that M has rank and n 0. We replace the rank hypothesis with the weaker assumption that M is locally free on the minimal prime ideals of R. As a consequence, we obtain, if R is a one-dimensional non-regular complete reduced local ring that has a perfect residue field and prime characteristic, then ^n\!R R^n\!R has torsion for all n0. This property of the Frobenius endomorphism came as a surprise to us since, over such rings R, there exist non-free modules M such that MRM is torsion-free.