A Buchsbaum theory for tight closure

Abstract

A Noetherian local ring (R,m) is called Buchsbaum if the difference e(q, R)-(R/q), where q is an ideal generated by a system of parameters, is a constant independent of q. In this article, we study the tight closure analog of this condition. We prove that in an unmixed excellent local ring (R,m) of prime characteristic p>0 and dimension at least one, the difference e(q, R)-(R/q*) is independent of q if and only if the parameter test ideal τpar(R) contains m. We also provide a characterization of this condition via derived category which is analogous to Schenzel's criterion for Buchsbaum rings.