English

Loop W(a,b) Lie conformal algebra

Rings and Algebras 2016-05-11 v2

Abstract

Fix a,b\Ca,b\in\C, let LW(a,b)LW(a,b) be the loop W(a,b)W(a,b) Lie algebra over \C\C with basis {L\a,i,I\b,j\a,\b,i,jZ}\{L_{\a,i},I_{\b,j} \mid \a,\b,i,j\in\Z\} and relations [L\a,i,L\b,j]=(\a\b)L\a+\b,i+j,[L\a,i,I\b,j]=(a+b\a+\b)I\a+\b,i+j,[I\a,i,I\b,j]=0[L_{\a,i},L_{\b,j}]=(\a-\b)L_{\a+\b,i+j}, [L_{\a,i},I_{\b,j}]=-(a+b\a+\b)I_{\a+\b,i+j},[I_{\a,i},I_{\b,j}]=0, where \a,\b,i,jZ\a,\b,i,j\in\Z. In this paper, a formal distribution Lie algebra of LW(a,b)LW(a,b) is constructed. Then the associated conformal algebra CLW(a,b)CLW(a,b) is studied, where CLW(a,b)CLW(a,b) has a \C[]\C[\partial]-basis {Li,Iji,jZ}\{L_i,I_j\,|\,i,j\in\Z\} with λ\lambda-brackets [LiλLj]=(+2λ)Li+j,[LiλIj]=(+(1b)λ)Ii+j[L_i\, {}_\lambda \, L_j]=(\partial+2\lambda) L_{i+j}, [L_i\, {}_\lambda \, I_j]=(\partial+(1-b)\lambda) I_{i+j} and [IiλIj]=0[I_i\, {}_\lambda \, I_j]=0. In particular, we determine the conformal derivations and rank one conformal modules of this conformal algebra. Finally, we study the central extensions and extensions of conformal modules.

Keywords

Cite

@article{arxiv.1603.00147,
  title  = {Loop W(a,b) Lie conformal algebra},
  author = {Guangzhe Fan and Henan Wu and Bo Yu},
  journal= {arXiv preprint arXiv:1603.00147},
  year   = {2016}
}

Comments

12 pages

R2 v1 2026-06-22T13:00:38.836Z