Star stable domains

Abstract: We introduce and study the notion of -stability with respect to a semistar operation defined on a domain R; in particular we consider the case where is the w-operation. This notion allows us to generalize and improve several properties of stable domains and totally divisorial domains. MSC: Primary: 13A15; secondary: 13F05; 13G05 IntroductionStar operations, such as the v-closure (or divisorial closure), the t-closure and the w-closure, are an essential tool in modern multiplicative ideal theory for characteriz… Show more

“…When Stability with respect to star operations (and more generally to semistar operations) was introduced and studied by the authors of this paper in [16].…”

“…Recall that a Prüfer domain (resp., a PvMD) is called strongly discrete if P = P 2 for each prime (resp., t-prime) ideal P . A domain is integrally closed and Clifford w-regular (resp., w-stable) if and only if it is a PvMD (resp., a strongly discrete PvMD) with t-finite character [17,Corollary 4.5], [16,Therem 2.9]. Thus, for w = d, an integrally closed Clifford regular (resp., stable) domain is precisely a Prüfer domain (resp., a strongly discrete Prüfer domain) with finite character [5,Theorem 4.5], [32,Theorem 4.6].…”

w-Stability and Cliffordw-Regularity of Polynomial Rings

“…When Stability with respect to star operations (and more generally to semistar operations) was introduced and studied by the authors of this paper in [16].…”

“…Recall that a Prüfer domain (resp., a PvMD) is called strongly discrete if P = P 2 for each prime (resp., t-prime) ideal P . A domain is integrally closed and Clifford w-regular (resp., w-stable) if and only if it is a PvMD (resp., a strongly discrete PvMD) with t-finite character [17,Corollary 4.5], [16,Therem 2.9]. Thus, for w = d, an integrally closed Clifford regular (resp., stable) domain is precisely a Prüfer domain (resp., a strongly discrete Prüfer domain) with finite character [5,Theorem 4.5], [32,Theorem 4.6].…”

w-Stability and Cliffordw-Regularity of Polynomial Rings

“…Here we mainly consider the cases where * = d, w, t. In fact the most interesting results on star stability and star regularity were obtained in [15] and [16] for star operations spectral and of finite type. In addition, if * is spectral and of finite type, * -regularity implies * = w [16,Corollary 1.7]; in particular, if R is Clifford regular, then w = d.…”

Star Stability and Star Regularity for Mori Domains

“…In my conference talk, based on [8,9,10], I showed that many properties of stability and Clifford regularity can be generalized and improved in the set of (semi)star operations. In particular, by using the techniques developed in [9], the results illustrated in the next section can be proved for star regularity with respect to any star operation that is spectral and of finite type (see [9] for the relevant definitions).…”

Finite character, local stability property and local invertibility property