Kostant's generating functions, Ebeling's theorem and McKay's observation relating the Poincare series

Abstract

We generalize B. Kostant's construction of generating functions to the case of multiply-laced diagrams and we prove for this case W. Ebeling's theorem which connects the Poincare series [PG(t)]0 and the Coxeter transformations. According to W. Ebeling's theorem [PG(t)]0 = X(t2)X(t2), where X is the characteristic polynomial of the Coxeter transformation and X is the characteristic polynomial of the corresponding affine Coxeter transformation. We prove McKay's observation relating the Poincare series [PG(t)]i: (t+t-1)[PG(t)]i = Σi ← j[PG(t)]j, where j runs over all vertices adjacent to i.

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