Abstract
We introduce a new concept of ideals in BCC-algebras and describe connections between such ideals and congruences.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
W. A. Dudek: The number of subalgebras of finite BCC-algebras. Bull. Inst. Math. Academia Sinica 20 (1992), 129–136.
W. A. Dudek: On proper BCC-algebras. Bull. Inst. Math. Academia Sinica 20 (1992), 137–150.
W. A. Dudek: On constructions of BCC-algebras. Selected Papers on BCK-and BCI-algebras, 1 (1992), 93–96.
K. Iséki and S. Tanaka: Ideal theory of BCK-algebras. Math. Japonica 21 (1976), 351–366.
K. Iséki and S. Tanaka: An introduction to the theory of BCK-algebras. Math. Japonica 23 (1978), 1–26.
Y. Komori: The variety generated by BCC-algebras is finitely based. Reports Fac. Sci. Shizuoka Univ. 17 (1983), 13–16.
Y. Komori: The class of BCC-algebras is not a variety. Math. Japonica 29 (1984), 391–394.
A. Wroński: BCK-algebras do not form a variety. Math. Japonica 28 (1983), 211–213.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Dudek, W.A., Zhang, X. On ideals and congruences in bcc-algebras. Czechoslovak Mathematical Journal 48, 21–29 (1998). https://doi.org/10.1023/A:1022407325810
Issue Date:
DOI: https://doi.org/10.1023/A:1022407325810