In this article we study the homology of spaces ${\rm Hom}(\mathbb{Z}^n,G)$
of ordered pairwise commuting $n$-tuples in a Lie group $G$. We give an
explicit formula for the Poincare series of these spaces in terms of invariants
of the Weyl group of $G$. By work of Bergeron and Silberman, our results also
apply to ${\rm Hom}(F_n/\Gamma_n^m,G)$, where the subgroups $\Gamma_n^m$ are
the terms in the descending central series of the free group $F_n$. Finally, we
show that there is a stable equivalence between the space ${\rm Comm}(G)$
studied by Cohen-Stafa and its nilpotent analogues.Comment: 20 pages, journal versio

Ramras, Daniel A.

Stafa, Mentor

English

arXiv

In this article we study the homology of spaces   Hom(Zn,G)  of ordered pairwise commuting n-tuples in a Lie group G. We give an explicit formula for the Poincaré series of these spaces in terms of invariants of the Weyl group of G. By work of Bergeron and Silberman, our results also apply to   Hom(Fn/Γmn,G) , where the subgroups   Γmn  are the terms in the descending central series of the free group   Fn . Finally, we show that there is a stable equivalence between the space   Comm(G)  studied by Cohen–Stafa and its nilpotent analogues

Hilbert-Poincare series for spaces of commuting elements in Lie groups

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