The Kac Construction of the Centre of U(g) for Lie Superalgebras
- DOI
- 10.2991/jnmp.2004.11.3.5How to use a DOI?
- Abstract
In 1984, Victor Kac [8] suggested an approach to a description of central elements of a completion of U(g) for any Kac-Moody Lie algebra g. The method is based on a recursive procedure. Each step is reduced to a system of linear equations over a certain subalgebra of meromorphic functions on the Cartan subalgebra. The deteminant of the system coincides with the Shapovalov determinant for g. We prove that the Kac approach can also be applied to finite dimensional Lie superalgebras g(A) with Cartan matrix A (as claimed in [8]) and reproduce for them Sergeev's description of the centers of U(g) [14]. In order to prove this, one needs to show that the recursive procedure stops after a finite number of steps. The original paper [8] does not indicate how to check this fact. Here we give a detailed presentation of the Kac approach and apply it to finite dimensional Lie superalgebras g(A). In particular, we deduce the Kac formulas for the Shapovalov determinants and verify the finiteness of the recursive procedure.
- Copyright
- © 2006, the Authors. Published by Atlantis Press.
- Open Access
- This is an open access article distributed under the CC BY-NC license (http://creativecommons.org/licenses/by-nc/4.0/).
Cite this article
TY - JOUR AU - Maria Gorelik PY - 2004 DA - 2004/08/01 TI - The Kac Construction of the Centre of U(g) for Lie Superalgebras JO - Journal of Nonlinear Mathematical Physics SP - 325 EP - 349 VL - 11 IS - 3 SN - 1776-0852 UR - https://doi.org/10.2991/jnmp.2004.11.3.5 DO - 10.2991/jnmp.2004.11.3.5 ID - Gorelik2004 ER -