Centers of Universal Enveloping Algebras

Abstract

The universal enveloping algebra U(g ) of a current (super)algebra or loop (super)algebra g is considered over an algebraically closed field K with characteristic p 0. This paper focuses on the structure of the center Z(g ) of U(g ). In the case of zero characteristic, Z(g ) is generated by the centers of g . In the case of prime characteristic, Z(g ) is generated by the centers of g and the p-centers of U(g ). We also study the structure of Z(g ) in the semisimple Lie (super)algebra.

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