Nil-Noetherian rings
Abstract
In this paper, we say a ring R is Nil-Noetherian provided that any nil ideal is finitely generated. First, we show that the Hilbert basis theorem holds for Nil-Noetherian rings, that is, R is Nil-Noetherian if and only if R[x] is Nil-Noetherian, if and only if R[[x]] is Nil-Noetherian. Then we discuss some Nil-Noetherian properties on idealizations and bi-amalgamated algebras. Finally, we give the Cartan-Eilenberg-Bass Theorem for Nil-Noetherian rings in terms of Nil-injective modules and Nil-FP-injective modules. Besides, some examples are given to distinguish Nil-Noetherian rings, Nil-coherent rings and so on.
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