Topological realization of algebras of quasi-invariants, I (with an Appendix by M. V. Feigin and K. E. Feldman)

Abstract

This is the first in a series of papers, where we introduce and study topological spaces that realize the algebras of quasi-invariants of finite reflection groups. Our result can be viewed as a generalization of a well-known theorem of A. Borel that realizes the ring of invariant polynomials a Weyl group W as a cohomology ring of the classifying space BG of the associated Lie group G. In the present paper, we state our realization problem for the algebras of quasi-invariants of Weyl groups and give its solution in the rank one case (for G = SU(2)). We call the resulting G-spaces Fm(G,T) the m-quasi-flag manifolds and their Borel homotopy quotients Xm(G,T) the spaces of m-quasi-invariants. We compute the equivariant K-theory and the equivariant (complex analytic) elliptic cohomology of these spaces and identify them with exponential and elliptic quasi-invariants of W. We also extend our construction of spaces quasi-invariants to a certain class of finite loop spaces B of homotopy type of S3 originally introduced by D. L. Rector. We study the cochain spectra C*(Xm,k) associated to the spaces of quasi-invariants and show that these are Gorenstein commutative ring spectra in the sense of Dwyer, Greenlees and Iyengar.