Stabilizers on \(L\)-algebras
Stabilizers on \(L\)-algebras
Author(s): Gholam Reza Rezaei, Mona Aaly KologaniSubject(s): Logic
Published by: Wydawnictwo Uniwersytetu Łódzkiego
Keywords: L-algebra; stabilizer; ideal; co-anihiliators; Baire space; topological space
Summary/Abstract: The main goal of this paper is to introduce the notion of stabilizers in \(L\)-algebras and develop stabilizer theory in \(L\)-algebras. In this paper, we introduced the notions of left and right stabilizers and investigated some related properties of them. Then, we discussed the relations among stabilizers, ideal and co-annihilators. Also, we obtained that the set of all ideals of a \(CKL\)-algebra forms a relative pseudo-complemented lattice. In addition, we proved that right stabilizers in \(CKL\)-algebra are ideals. Then by using the right stabilizers we produced a basis for a topology on \(L\)-algebra. We showed that the generated topology by this basis is Baire, connected, locally connected and separable and we investigated the other properties of this topology.
Journal: Bulletin of the Section of Logic
- Issue Year: 53/2024
- Issue No: 1
- Page Range: 105-124
- Page Count: 20
- Language: English
