Poincaré series, exponents of affine Lie algebras, and McKay-Slodowy correspondence

Abstract: Let $N$ be a normal subgroup of a finite group $G$ and $V$ be a fixed finite-dimensional $G$-module. The Poincar\'{e} series for the multiplicities of induced modules and restriction modules in the tensor algebra $T(V)=\oplus_{k \geq 0}V^{\otimes k}$ are studied in connection with the McKay-Slodowy correspondence. In particular, it is shown that the closed formulas for the Poincar\'e series associated with the distinguished pairs of subgroups of $\mathrm{SU}2$ give rise to the exponents of all untwisted and twisted affine Lie algebras except ${\rm A}{2n}^{(1)}$.