Title of article :
ON THE CLASSICAL PRIME SPECTRUM OF LATTICE MODULES
Author/Authors :
Girase, Pradip Department of Mathematics - K. K. M. College - Manwath Dist-Parbhani, India , Borkar, Vandeo Department of Mathematics - Yeshwant Mahavidyalaya Nanded, India , Phadatare, Narayan Department of Mathematics - Savitribai Phule Pune - University Pune, India
Abstract :
Let M be a lattice module over a C-lattice L. A proper element
P of M is said to be classical prime if for a, b ∈ L and X ∈ M, abX ≤ P
implies that aX ≤ P or bX ≤ P. The set of all classical prime elements of M,
Speccp(M) is called as classical prime spectrum. In this article, we introduce
and study a topology on Speccp(M), called as Zariski-like topology of M. We
investigate this topological space from the point of view of spectral spaces.
We show that if M has ascending chain condition on classical prime radical
elements, then Speccp(M) with the Zariski-like topology is a spectral space
Keywords :
Classical prime element , classical prime spectrum , classical prime radical element , Zariski-like topology , spectral space
Journal title :
International Electronic Journal of Algebra
