WEAK LATTICES

Autori

  • Ivan Chajda Palack´y University Olomouc - Department of Algebra and Geometry
  • Helmut L¨anger Vienna University of Technology - Institute of Discrete Mathematics and Geometry

Parole chiave:

BCK-algebra, weak semilattice, weak lattice, directoid, semilattice, antitone involution, skew basic algebra, de Morgan laws

Abstract

The ordered set induced by a BCK-algebra \(\mathcal{A}\) can be equipped with a binary term operation on \(\mathcal{A}\) such that the resulting structure is a so-called weak semilattice.  If this structure is endowed with an antitone involution we can introduce a second binary operation and the structure arising this way is called a weak lattice.  Properties of weak lattices and weak semilattices are investigated and connections to directoids and semilattices are established.  Moreover, a derived structure similar to basic algebras is introduced and called a skew basic algebra.  An axiomatization of these algebras is presented.  It is shown that every bounded poset can be organized into a weak lattice and the number of non-isomorphic weak lattices of cardinality less than five is determined. 

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Pubblicato

2013-05-24

Come citare

Chajda, I., & L¨anger, H. (2013). WEAK LATTICES. Italian Journal of Pure and Applied Mathematics, 30, 125–140. Recuperato da https://journals.uniurb.it/index.php/ijpam/article/view/6097

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