Let D be an integral domain and let ? be a semistar operation on
D. In this paper, we define the class of ?-quasi-going-up domains, a notion
dual to the class of ?-going-down domains. It is shown that the class of ?-quasi-going-up
domains is a proper subclass of ?-going-down domains and that every
Prüfer-?-multiplication domain is a ?-quasi-going-up domain. Next, we prove
that the ?-Nagata ring Na(D, ?), is a quasi-going-up domain if and only if D is
a e?-quasi-going-up and a e?-quasi-Prüfer domain. Several new characterizations
are given for ?-going-down domains. We also define the universally ?-going-down
domains, and then, give new characterizations of Prüfer-?-multiplication
domains.
Diğer ID | JA44RD27KP |
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Bölüm | Makaleler |
Yazarlar | |
Yayımlanma Tarihi | 1 Aralık 2013 |
Yayımlandığı Sayı | Yıl 2013 Cilt: 14 Sayı: 14 |