Cube term blockers without finiteness
Rings and Algebras
2016-09-12 v1
Abstract
We show that an idempotent variety has a -dimensional cube term if and only if its free algebra on two generators has no -ary compatible cross. We employ Hall's Marriage Theorem to show that a variety of finite signature whose fundamental operations have arities has a -dimensional cube term if and only if it has one of dimension . This lower bound on dimension is shown to be sharp. We show that a pure cyclic term variety has a cube term if and only if it contains no -element semilattice. We prove that the Maltsev condition "existence of a cube term" is join prime in the lattice of idempotent Maltsev conditions.
Keywords
Cite
@article{arxiv.1609.02605,
title = {Cube term blockers without finiteness},
author = {Keith A. Kearnes and Agnes Szendrei},
journal= {arXiv preprint arXiv:1609.02605},
year = {2016}
}
Comments
24 pages