English

Defects in weighted graphs and Commutators

Combinatorics 2025-05-14 v1

Abstract

Let RR be a commutative ring. In \cite{KK_2025(1)}, the authors introduced RR-weighted graphs as a tool for studying commutators in groups and Lie algebras. These graphs are equivalent to a system of balance equations, and their consistent labelings correspond to solutions of this system of balance equations. In this article, we apply these ideas in the case when RR is a field FF. We focus on FF-weighted graphs with four vertices and establish necessary and sufficient conditions for the existence of consistent labelings on them. A notion of defects in weighted graphs is introduced for this purpose. We prove that defects in weighted graphs prevent Lie brackets from being surjective onto its derived Lie subalgebra. Similarly, these defects prevent certain elements in the commutator subgroup of a nilpotent group of class 22 from being a commutator. As an application of our techniques, we prove that for a Lie algebra LL whose dimension over FF is at most countable and the dimension of its derived subalgebra LL' is at most 33, the Lie bracket is surjective onto LL'. We provide a counterexample when dim(L)=4\dim(L') = 4. We also characterize commutators among LL' for the Lie algebras LL with dim(L/Z(L))4\dim(L/Z(L))\leq 4.

Keywords

Cite

@article{arxiv.2505.07965,
  title  = {Defects in weighted graphs and Commutators},
  author = {Harish Kishnani and Amit Kulshrestha},
  journal= {arXiv preprint arXiv:2505.07965},
  year   = {2025}
}
R2 v1 2026-06-28T23:30:20.940Z