Abstract
A description of all minimal classes in the partially ordered set L 32 of closed classes of the three-valued logic that can be homomorphically mapped onto the two-valued logic is given.
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References
A. V. Maltsev, “The Homomorphisms of Functional Systems in Multi-Valued Logics,” Matem. Voprosy Kibern., No. 4, 5 (1992).
A. I. Maltsev, “Iterative Algebras and Post Varieties,” Algebra i Logika 5(2), 5 (1966) [in: Selected Works, Vol. 2, (1976), pp. 316–330]
V. M. Gnedenko. “Finding the Orders of Precomplete Classes in the Three-Valued Logic,” Problemy Kibern., Issue 8, 341 (1962).
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Original Russian Text © A.V. Makarov, 2015, published in Vestnik Moskovskogo Universiteta, Matematika. Mekhanika, 2015, Vol. 70, No. 1, pp. 65–66.
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Makarov, A.V. Description of all minimal classes in the partially ordered set L 32 of closed classes of the three-valued logic that can be homomorphically mapped onto the two-valued logic. Moscow Univ. Math. Bull. 70, 48 (2015). https://doi.org/10.3103/S0027132215010106
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DOI: https://doi.org/10.3103/S0027132215010106