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Analytic Linear Lie rack Structures on Leibniz Algebras

Differential Geometry 2019-08-15 v1

Abstract

A linear Lie rack structure on a finite dimensional vector space VV is a Lie rack operation (x,y)xy(x,y)\mapsto x\rhd y pointed at the origin and such that for any xx, the left translation Lx:yLx(y)=xy\mathrm{L}_x:y\mapsto \mathrm{L}_x(y)= x\rhd y is linear. A linear Lie rack operation \rhd is called analytic if for any x,yVx,y\in V, xy=y+n=1An,1(x,,x,y), x\rhd y=y+\sum_{n=1}^\infty A_{n,1}(x,\ldots,x,y), where An,1:V××VVA_{n,1}:V\times\ldots\times V\Leftarrow V is an n+1n+1-multilinear map symmetric in the nn first arguments. In this case, A1,1A_{1,1} is exactly the left Leibniz product associated to \rhd. Any left Leibniz algebra (h,[  ,  ])(\mathfrak{h},[\;,\;]) has a canonical analytic linear Lie rack structure given by xcy=exp(adx)(y)x\stackrel{c}{\rhd} y=\exp(\mathrm{ad}_x)(y), where adx(y)=[x,y]\mathrm{ad}_x(y)=[x,y]. In this paper, we show that a sequence (An,1)n1(A_{n,1})_{n\geq1} of n+1n+1-multilinear maps on a vector space VV defines an analytic linear Lie rack structure if and only if [  ,  ]:=A1,1[\;,\;]:=A_{1,1} is a left Leibniz bracket, the An,1A_{n,1} are invariant for (V,[  ,  ]:)(V,[\;,\;]:) and satisfy a sequence of multilinear equations. Some of these equations have a cohomological interpretation and can be solved when the zero and the 1-cohomology of the left Leibniz algebra (V,[  ,  ])(V,[\;,\;]) are trivial. On the other hand, given a left Leibniz algebra (h,[  ,  ])(\mathfrak{h},[\;,\;]), we show that there is a large class of (analytic) linear Lie rack structures on (h,[  ,  ])(\mathfrak{h},[\;,\;]) which can be built from the canonical one and invariant multilinear symmetric maps on h\mathfrak{h}. A left Leibniz algebra on which all the analytic linear Lie rack structures are build in this way will be called rigid. We use our characterizations of analytic linear Lie rack structures to show that sl2(R)\mathfrak{sl}_2(\mathbb{R}) and so(3)\mathfrak{so}(3) are rigid. We conjecture that any simple Lie algebra is rigid as a left Leibniz algebra.

Keywords

Cite

@article{arxiv.1908.05057,
  title  = {Analytic Linear Lie rack Structures on Leibniz Algebras},
  author = {Hamid Abchir and Fatima-Ezzahrae Abid and Mohamed Boucetta},
  journal= {arXiv preprint arXiv:1908.05057},
  year   = {2019}
}

Comments

Submitted, 23 pages

R2 v1 2026-06-23T10:47:16.418Z