Star operations on strong Mori domains (Q2822569)

Let \(D\) be an integral domain with quotient field \(K\), \(S(D)\) denotes the set of all star operations on \(D\) and \(S_{w}(D)\) the subset of \(S(D)\) consisting of all \(\star\in S(D)\) such that \(w\leq \star\). In this paper the authors extended many results concerning Noetherian domains that admit only finitely many star operations to strong Mori domains (recall that a domain is strong Mori, \(SM\) for short, if it satisfies the \(ACC\) on \(w\)-ideals). In Section 2, they proved that if \(S_{w}(D)\) is finite, then \(t\)-\(\dim D=1\) and \(|S_{w}(D)|=\prod|S(D_{P})|\) where the product is taken over the set of \(t\)-maximal ideals \(P\) of \(D\). As an immediate consequences, they characterized strong Mori domains with \(|S_{w}(D)|=2\) or \(3\). Section 3 deals with star operations on polynomial ring over strong Mori domain. They proved that if \(D\) is a strong Mori domain with \(|S_{w}(D)|\) finite, then \(|S_{w}(D[X])|=\prod|S(D[X]_{P[X]})|=|S(D[X]_{N_{v}})|\).