Matrix Characterization of 4-Ary Algebraic Operations of Idempotent Algebras
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Publication:5412096
DOI10.1080/00927872.2013.763255zbMath1303.08002OpenAlexW1994401867MaRDI QIDQ5412096
J. Pashazadeh, Yuri M. Movsisyan
Publication date: 25 April 2014
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00927872.2013.763255
Operations and polynomials in algebraic structures, primal algebras (08A40) De Morgan algebras, ?ukasiewicz algebras (lattice-theoretic aspects) (06D30) Finitary algebras (08A62)
Related Items (1)
Cites Work
- Lattice ordered polynomial algebras
- On the number of polynomials of an idempotent algebra. II
- On the number of polynomials of an idempotent algebra. I
- CHARACTERIZATION OF TERNARY ALGEBRAIC OPERATIONS OF IDEMPOTENT ALGEBRAS
- A CHARACTERIZATION OF DEMORGAN BISEMIGROUP OF BINARY FUNCTIONS
- BINARY REPRESENTATIONS OF ALGEBRAS WITH AT MOST TWO BINARY OPERATIONS: A CAYLEY THEOREM FOR DISTRIBUTIVE LATTICES
- A Cayley Theorem for Boolean Algebras
- A Characterization of Finite Ternary Algebras
- A Cayley Theorem for Ternary Algebras
- Application of Ternary Algebra to the Study of Static Hazards
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