Results 181 to 190 of about 847,924 (219)
Neurodatascience: Past, Present, and Future. [PDF]
Data Sci SciCooper KW, Shahbaba B, Fortin NJ.
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On derivations of BCI-algebras
Information Sciences, 2004The authors study BCI-algebras. The main contribution in this paper is the introduction of the notion of a derivation for BCI-algebras, which is defined in a way similar to the notion in ring theory. This is done by using the cap-operation and the BCI-product. Also, many properties related to the derivations are developed.
Young Bae Jun
exaly +3 more sources
Information Sciences, 1999
Topological BCI-algebras are characterized in terms of neighborhoods. It is proved that a topological BCI-algebra is Hausdorff iff \(\{0\}\) is closed. A filter base generating a BCI-topology is described.
Young Bae Jun
exaly +2 more sources
Topological BCI-algebras are characterized in terms of neighborhoods. It is proved that a topological BCI-algebra is Hausdorff iff \(\{0\}\) is closed. A filter base generating a BCI-topology is described.
Young Bae Jun
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A Structure of BCI-Algebras [PDF]
International Journal of Theoretical Physics, 2013 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Länger, Helmut, Chajda, Ivan
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Communications of the Korean Mathematical Society, 2003
Summary: We obtain \(Hom(P, _- )\) is an exact functor if \(P\) is a \(p\)-projective \(BCI\)-algebra.
Ahn, Sun Shin, Bang, Keumseong
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Summary: We obtain \(Hom(P, _- )\) is an exact functor if \(P\) is a \(p\)-projective \(BCI\)-algebra.
Ahn, Sun Shin, Bang, Keumseong
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Fuzzy Sets and Systems, 2001
The authors introduce the notions of some kinds of fuzzy ideals (fuzzy positive, fuzzy implicative, fuzzy commutative) in BCI-algebras and investigate their properties. Since the notions of fuzzy ideals which they define are natural extentions of those in crisp theory of BCI-algebras, all results which they prove are of course expected and proved ...
Yong Lin Liu, Jie Meng
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The authors introduce the notions of some kinds of fuzzy ideals (fuzzy positive, fuzzy implicative, fuzzy commutative) in BCI-algebras and investigate their properties. Since the notions of fuzzy ideals which they define are natural extentions of those in crisp theory of BCI-algebras, all results which they prove are of course expected and proved ...
Yong Lin Liu, Jie Meng
exaly +2 more sources