Inversive localization in noetherian rings

We investigate properties of certain invariants of Noetherian local rings, including their behavior under flat local homomorphisms. We show that these invariants are bounded by the multiplicity for Cohen-Macaulay local rings with infinite residue fields, and they all agree with the multiplicity when

A new ideal I\*, the kernel coefficient ideal of a nonprincipal ideal I, is introduced in a commutative Noetherian ring R. Various properties of this ideal and its relations with many other standard concepts are studied. I\* is also examined in terms of a sequence of subideals I and the relation typ

Let R be a local ring of essentially finite type over a field k of characteristic p > 0. We introduce the concept of p n -bases for an integer n > 0, and the notions of an n-admissible field for R/k and of a t -admissible field for R/k. For such a local ring R we give regularity criteria in terms of

In this paper we study lengths of annihilators of m-primary ideals, J, in quotients Ž . of finitely generated modules, M, over local rings, R, m , modulo m-primary ideals generated by a sequence of ring elements each raised to a power, I s N Ž N N . f , . . . , f , as a function of this power. The m