Kostant's generating functions and McKay-Slodowy correspondence
Abstract
Let N G be a pair of finite subgroups of SL2(C) and V a finite-dimensional fundamental G-module. We study Kostant's generating functions for the decomposition of the SL2( C)-module Sk(V) restricted to N G in connection with the McKay-Slodowy correspondence. In particular, the classical Kostant formula was generalized to a uniform version of the Poincar\'e series for the symmetric invariants in which the multiplicities of any individual module in the symmetric algebra are completely determined.
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