On m-quasiinvariants of Coxeter groups
Abstract
Let W be a finite Coxeter group in a Euclidean vector space V, and m a W-invariant Z+-valued function on the set of reflections in W. Chalyh and Veselov introduced in an interesting algebra Qm, called the algebra of m-quasiinvariants for W. This is the algebra of quantum integrals of the rational Calogero-Moser system with coupling constants m. In a recent paper math-ph/0105014, Feigin and Veselov proposed a number of interesting conjectures concerning the structure of Qm, and verified them for dihedral groups and constant functions m. Our goal is to prove some of these conjectures in the general case.
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