Uniformly S-Noetherian rings

Abstract

Let R be a ring and S a multiplicative subset of R. Then R is called a uniformly S-Noetherian (u-S-Noetherian for abbreviation) ring provided there exists an element s∈ S such that for any ideal I of R, sI ⊂eq K for some finitely generated sub-ideal K of I. We give the Eakin-Nagata-Formanek Theorem for u-S-Noetherian rings. Besides, the u-S-Noetherian properties on several ring constructions are given. The notion of u-S-injective modules is also introduced and studied. Finally, we obtain the Cartan-Eilenberg-Bass Theorem for uniformly S-Noetherian rings.