Title of article
Distributive lattices with strong endomorphism kernel property as direct sums
Author/Authors
Gurican, Jaroslav Department of Algebra and Geometry - Faculty of Mathematics, Physics and Informatics - Comenius University Bratislava, Slovakia.
Pages
10
From page
45
To page
54
Abstract
Unbounded distributive lattices which have strong endomorphism kernel property (SEKP) introduced by Blyth and Silva in [3] were fully characterized in [11] using Priestley duality (see Theorem 2.8}). We shall determine the structure of special elements (which are introduced after Theorem 2.8 under the name strong elements) and show that these lattices can be considered as a direct product of three lattices, a lattice with exactly one strong element, a lattice which is a direct sum of 2 element lattices with distinguished elements 1 and a lattice which is a direct sum of 2 element lattices with distinguished elements 0, and the sublattice of strong elements is isomorphic to a product of last two mentioned lattices.
Keywords
Unbounded distributive lattice , strong endomorphism kernel property , congruence relation , bounded Priestley space , Priestley duality , strong element , direct sum
Journal title
Categories and General Algebraic Structures with Applications
Serial Year
2020
Record number
2605582
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