English

Complexe canonique d'une alg\`ebre de Lie r\'eductive

Representation Theory 2007-05-23 v1 Algebraic Geometry

Abstract

Let \gothg{\goth g} be a finite dimensional complex reductive Lie algebra and \dv..\dv .. an invariant non degenerated bilinear form on \gothg×\gothg{\goth g}\times {\goth g} which extends the Killing form of [\gothg,\gothg][{\goth g},{\goth g}]. We define the homology complex C(\gothg)C_{\bullet}({\goth g}). Its space is the algebra \tkC\eSg\tkC\eSg\ex\gothg\tk {{\Bbb C}}{\e Sg}\tk {{\Bbb C}}{\e Sg}\ex {}{{\goth g}} where \eSg\e Sg and \ex\gothg\ex {}{{\goth g}} are the symmetric and exterior algebras of \gothg{\goth g}. The differential of C(\gothg)C_{\bullet}({\goth g}) is the \tkC\eSg\eSg\tk {{\Bbb C}}{\e Sg}\e Sg-derivation which associates to the element vv of \gothg{\goth g} the function (x,y)\dvv[x,y](x,y)\mapsto \dv v{[x,y]} on \gothg×\gothg{\goth g}\times {\goth g}. Then the complex C(\gothg)C_{\bullet}({\goth g}) has no homology in degree strictly bigger than \rk\gothg\rk {\goth g}.

Keywords

Cite

@article{arxiv.math/0509303,
  title  = {Complexe canonique d'une alg\`ebre de Lie r\'eductive},
  author = {Jean-Yves Charbonnel},
  journal= {arXiv preprint arXiv:math/0509303},
  year   = {2007}
}

Comments

9 pages in french