Description of all minimal classes in the partially ordered set \(\mathcal L_2^3\) of closed classes of the three-valued logic that can be homomorphically mapped onto the two-valued logic
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Publication:493891
DOI10.3103/S0027132215010106zbMath1325.03023OpenAlexW1988848213MaRDI QIDQ493891
Publication date: 4 September 2015
Published in: Moscow University Mathematics Bulletin (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3103/s0027132215010106
Related Items (3)
Countability of the set of closed overclasses of some minimal classes in the partly ordered set \(\mathcal{L}_{2}^{3}\) of all closed classes of three-valued logic that can be mapped homomorphically onto two-valued logic ⋮ Cardinality of the continuum of closed superclasses of some minimal classes in the partially ordered set \(\mathcal{L}_2^3\) ⋮ The set of closed classes \(P_{k+1}\) that can be homomorphically mapped on \(P_k\) has the cardinality of continuum
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