McKay correspondence and the branching law for finite subgroups of SL3C
Abstract
Given a finite subgroup of SL3C, we determine how an arbitrary finite dimensional irreducible representation of SL3C decomposes under the action of . To the subgroup we attach a generalized Cartan matrix C. Then, inspired by B. Kostant, we decompose the Coxeter element of the Kac-Moody algebra attached to C as a product of reflections of a special form, thereby suggesting an algebraic form for the McKay correspondence in dimension 3.
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