English

Zero product determined Lie algebras

Rings and Algebras 2019-08-08 v1 Quantum Algebra

Abstract

A Lie algebra LL over a field F\mathbb{F} is said to be zero product determined (zpd) if every bilinear map f:L×LFf:L\times L\to \mathbb{F} with the property that f(x,y)=0f(x,y)=0 whenever xx and yy commute is a coboundary. The main goal of the paper is to determine whether or not some important Lie algebras are zpd. We show that the Galilei Lie algebra sl2V\mathfrak{sl}_2\ltimes V, where VV is a simple sl2\mathfrak{sl}_2-module, is zpd if and only if dimV=2\dim V =2 or dimV\dim V is odd. The class of zpd Lie algebras also includes the quantum torus Lie algebras Lq\mathcal{L}_q and Lq+\mathcal{L}^+_q, the untwisted affine Lie algebras, the Heisenberg Lie algebras, and all Lie algebras of dimension at most 33, while the class of non-zpd Lie algebras includes the (44-dimensional) aging Lie algebra age(1)\mathfrak {age}(1) and all Lie algebras of dimension more than 33 in which only linearly dependent elements commute. We also give some evidence of the usefulness of the concept of a zpd Lie algebra by using it in the study of commutativity preserving linear maps.

Keywords

Cite

@article{arxiv.1610.07178,
  title  = {Zero product determined Lie algebras},
  author = {Matej Bresar and Xiangqian Guo and Genqiang Liu and Rencai Lu and Kaiming Zhao},
  journal= {arXiv preprint arXiv:1610.07178},
  year   = {2019}
}

Comments

25 pages

R2 v1 2026-06-22T16:28:51.281Z