INVESTIGADORES
CELANI Sergio Arturo
artículos
Título:
Subordination Tarski algebras
Autor/es:
CELANI, SERGIO A.
Revista:
JOURNAL OF APPLIED NON-CLASSICAL LOGICS
Editorial:
Taylor and Francis
Referencias:
Año: 2019 p. 1 - 19
ISSN:
1166-3081
Resumen:
In this work we will study Tarski algebras endowed with a subordination, called subordination Tarski algebras. We will define the notion of round filters, and we will study the class of irreducible round filters and the maximal round filters, called ends. We will prove that the poset of all round filters is a lattice isomorphic to the lattice of the congruences that are compatible with the subordination. We will prove that every end is an irreducible round filter, and that in a topological subordination Tarski algebra A , every irreducible round filter is an end iff A is a monadic subordination Tarski algebra. As corollary of this result we have that the variety of monadic Tarski algebra can be characterized as the topological Tarski algebras where every irreducible open filter is a maximal open filter. /* Layout-provided Styles */div.standard {margin-bottom: 2ex;}
