Poincare series of character varieties for nilpotent groups

Abstract

For any compact and connected Lie group G and any free abelian or free nilpotent group , we determine the cohomology of the path component of the trivial representation of the representation space (character variety) Rep(,G)1, with coefficients in a field F with char (F) either 0 or relatively prime to the order of the Weyl group W. We give explicit formulas for the Poincar\'e series. In addition we study G-equivariant stable decompositions of subspaces X(q,G) of the free monoid J(G) generated by the Lie group G, obtained from finitely generated free nilpotent group representations.