References
B. A. Romov, “Maximal local classes of partial functions of infinite-valued logic,” Kibern. Sist. Analiz, No. 5, 45–56 (1992).
B. A. Romov, “The completeness problem in the algebra of partial functions of finite-valued logic,” Kibernetika, No. 1, 102–106 (1990).
M. Krasner, “Une generalisation de la notion de corps,” J. Math. Pure Appl.,9, No. 17, 367–385 (1938).
I. Fleischer and I. Rosenberg, “The Galois connection between partial functions and relations,” Pacific J. Math.,79, No. 1, 93–97 (1978).
B. A. Romov, “Algebras of partial functions and their invariants,” Kibernetika, No. 2, 1–11 (1981).
I. Rosenberg, “Universal algebras with all operations of bounded range,” Colloq. Math.,30, No. 2, 177–185 (1974).
G. P. Gavrilov, “Precomplete classes of partial countable-valued logic containing all functions of a single variable,” in: Methods of Discrete Analysis in Graph Theory and Logical Functions [in Russian], No. 28, pp. 12–24, Novosibirsk (1976).
R. V. Freivald, “Functional completeness for not everywhere defined Boolean functions,” Diskret. Anal., No. 8, 55–68 (1966).
L. Haddad, I. Rosenberg, and D. Schweigert, “A maximal partial clone and a Slupecki-type criterion,” Acta Sci. Math. Szeged.,54, No. 2, 89–98 (1990).
B. A. Romov, “On continuation of not everywhere defined functions of many-valued logic,” Kibernetika, No. 3, 27–34 (1987).
B. A. Romov, “On maximal subalgebras of the algebra of partial functions of many-valued logic,” Kibernetika, No. 1, 28–36 (1980).
W. Sierpinski, “Sur les fonctions de plusieures variables,” Fund. Math.,33, 169–173 (1946).
Additional information
Translated from Kibernetika i Sistemnyi Analiz, No. 1, pp. 3–20, January–February, 1993.
Rights and permissions
About this article
Cite this article
Romov, B.A. Maximal finitely defined subalgebras of partial functions of infinite-valued logic. Cybern Syst Anal 29, 1–11 (1993). https://doi.org/10.1007/BF01130083
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01130083