Title of article
Characterizations and new subclasses of -filters in residuated lattices
Author/Authors
Ma، نويسنده , , Zhen Ming and Hu، نويسنده , , Bao Qing، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2014
Pages
16
From page
92
To page
107
Abstract
Filters play an important role in studying logical systems and the related algebraic structures. Various filters have been proposed in the literature. In this paper, we aim to develop a unifying definition for some specific filters called I -filters which provide us with a meaningful method to study these filters and corresponding logical algebras. In particular, trivial characterizations of I -filters, non-trivial characterizations of classes of I -filters, such as implicative, fantastic and Boolean filters, and characterizations of homologous logical algebras are obtained. Next, three new types of I -filters named divisible filters, strong and n-contractive filters in residuated lattices are introduced. Particularly, it is verified that n-fold implicative BL-algebras and n-contractive BL-algebras coincide. Finally, we investigate the relationships between these specific I -filters. It is shown that a filter is a fantastic filter if and only if it is both a divisible filter and a regular filter.
Keywords
Non-classical logics , I -filter , Residuated lattice , Divisible filter , Strong filter , n-Contractive filter
Journal title
FUZZY SETS AND SYSTEMS
Serial Year
2014
Journal title
FUZZY SETS AND SYSTEMS
Record number
1601964
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