English

Comparability in the graph monoid

Rings and Algebras 2023-02-23 v3

Abstract

Let Γ\Gamma be the infinite cyclic group on a generator x.x. To avoid confusion when working with Z\mathbb Z-modules which also have an additional Z\mathbb Z-action, we consider the Z\mathbb Z-action to be a Γ\Gamma-action instead. Starting from a directed graph EE, one can define a cancellative commutative monoid MEΓM_E^\Gamma with a Γ\Gamma-action which agrees with the monoid structure and a natural order. The order and the action enable one to label each nonzero element as being exactly one of the following: comparable (periodic or aperiodic) or incomparable. We comprehensively pair up these element features with the graph-theoretic properties of the generators of the element. We also characterize graphs such that every element of MEΓM_E^\Gamma is comparable, periodic, graphs such that every nonzero element of MEΓM_E^\Gamma is aperiodic, incomparable, graphs such that no nonzero element of MEΓM_E^\Gamma is periodic, and graphs such that no element of MEΓM_E^\Gamma is aperiodic. The Graded Classification Conjecture can be formulated to state that MEΓM_E^\Gamma is a complete invariant of the Leavitt path algebra LK(E)L_K(E) of EE over a field K.K. Our characterizations indicate that the Graded Classification Conjecture may have a positive answer since the properties of EE are well reflected by the structure of MEΓ.M_E^\Gamma. Our work also implies that some results of [R. Hazrat, H. Li, The talented monoid of a Leavitt path algebra, J. Algebra, 547 (2020) 430-455] hold without requiring the graph to be row-finite.

Keywords

Cite

@article{arxiv.2005.14235,
  title  = {Comparability in the graph monoid},
  author = {Roozbeh Hazrat and Lia Vas},
  journal= {arXiv preprint arXiv:2005.14235},
  year   = {2023}
}
R2 v1 2026-06-23T15:53:41.739Z