Classical Zariski Topology on Prime Spectrum of Lattice Modules
محل انتشار: مجله جبر و موضوعات مرتبط، دوره: 6، شماره: 2
سال انتشار: 1397
نوع سند: مقاله ژورنالی
زبان: انگلیسی
مشاهده: 218
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شناسه ملی سند علمی:
JR_JART-6-2_001
تاریخ نمایه سازی: 31 تیر 1403
چکیده مقاله:
Let M be a lattice module over a C-lattice L. Let Spec^{p}(M) be the collection of all prime elements of M. In this article, we consider a topology on Spec^{p}(M), called the classical Zariski topology and investigate the topological properties of Spec^{p}(M) and the algebraic properties of M. We investigate this topological space from the point of view of spectral spaces. By Hochster's characterization of a spectral space, we show that for each lattice module M with finite spectrum, Spec^{p}(M) is a spectral space. Also we introduce finer patch topology on Spec^{p}(M) and we show that Spec^{p}(M) with finer patch topology is a compact space and every irreducible closed subset of Spec^{p}(M) (with classical Zariski topology) has a generic point and Spec^{p}(M) is a spectral space, for a lattice module M which has ascending chain condition on prime radical elements.
کلیدواژه ها:
نویسندگان
V. Borkar
Department of Mathematics, Yeshwant Mahavidyalaya, Nanded, India
P. Girase
Department of Mathematics, K K M College, Manwath, Dist- Parbhani. ۴۳۱۵۰۵. Maharashtra, India.
N. Phadatare
Department of Mathematics, Savitribai Phule Pune University, Pune. Maharashtra. India