On the existence of parameterized noetherian rings
Abstract
A ring R is called left strictly (<α)-noetherian if α is the minimum cardinal such that every ideal of R is (<α)-generated. In this note, we show that for every singular (resp., regular) cardinal α, there is a valuation domain D, which is strictly (<α)-noetherian (resp., strictly (<α+)-noetherian), positively answering a problem proposed in Marcos25 under some set theory assumption.
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