A note on the S-version of Noetherianity
Abstract
It is well-known that a ring is Noetherian if and only if every ascending chain of ideals is stationary, and an integral domain is a PID if and only if every countably generated ideal is principal. We respectively investigate the similar results on S-Noetherian rings and S-w-PIDs, where S is a multiplicative subset and is a star operation. In particular, we gave negative answers to the open questions proposed by Hamed and Hizem hh16, Kim and Lim kl18, and Lim l18 in terms of valuation domains, respectively.
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