Lie-algebra centers via de-categorification
Abstract
Let g be a Lie algebra over an algebraically closed field of characteristic zero. Define the universal grading group C(g) as having one generator g for each irreducible g-representation , one relation gπ = g-1 whenever π is weakly contained in the dual representation * (i.e. the kernel of π in the enveloping algebra U(g) contains that of *), and one relation g = g'g" whenever is weakly contained in '". The main result is that attaching to an irreducible representation its central character gives an isomorphism between C(g) and the dual z* of the center z g when g is (a) finite-dimensional solvable; (b) finite-dimensional semisimple. The group C(g) is also trivial when the enveloping algebra U(g) has a faithful irreducible representation (which happens for instance for various infinite-dimensional algebras of interest, such as sl(∞), o(∞) and sp(∞)). These are analogues of a result of M\"uger's for compact groups and a number of results by the author on locally compact groups, and provide further evidence for the pervasiveness of such center-reconstruction phenomena.
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