Nilpotent BCK-algebras
Abstract
We recall the derived subalgebra of a BCK-algebra, and use this to define the derived ideal. Using the derived ideal, we show that the category of commutative BCK-algebras is a reflective subcategory of the category of BCK-algebras. After this, we introduce central series and define a notion of nilpotence for BCK-algebras and prove some properties of nilpotence. In particular, for any variety of BCK-algebras, the sub-class of nilpotent algebras is a sub-pseudovariety, though in general not a variety. We also show that the class of BCK-algebras of nilpotence class at most is a sub-quasivariety of all BCK-algebras, and is a variety if and only if . We close by showing that every finite BCK-algebra is nilpotent.
Cite
@article{arxiv.2507.08976,
title = {Nilpotent BCK-algebras},
author = {C. Matthew Evans},
journal= {arXiv preprint arXiv:2507.08976},
year = {2025}
}
Comments
Theorem 4.11 has been generalized compared to the original version, which is now Corollary 4.12