Filters on Some Classes of Quantum B-Algebras

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Authors	BOTUR Michal PASEKA Jan
Year of publication	2015
Type	Article in Periodical
Magazine / Source	International Journal of Theoretical Physics
MU Faculty or unit	Faculty of Science
Citation
Doi	http://dx.doi.org/10.1007/s10773-015-2608-0
Field	General mathematics
Keywords	Quantale; Quantum B-algebra; Filter; Prime filter; Pseudo-hoop; Pseudo MTL-algebra
Description	In this paper, we continue the study of quantum B-algebras with emphasis on filters on integral quantum B-algebras. We then study filters in the setting of pseudo-hoops. First, we establish an embedding of a cartesion product of polars of a pseudo-hoop into itself. Second, we give sufficient conditions for a pseudohoop to be subdirectly reducible. We also extend the result of Kondo and Turunen to the setting of noncommutative residuated a-semilattices that, if prime filters and a-prime filters of a residuated a-semilattice A coincide, then A must be a pseudo MTL-algebra.
Related projects:	New approaches to residuated posets