The regularity of almost-commuting partial Grothendieck--Springer resolutions and parabolic analogs of Calogero--Moser varieties

Abstract

Consider the moment map μ T*(p × Cn) p* for a parabolic subalgebra p of gln(C). We prove that the preimage of 0 under μ is a complete intersection when p has finitely many P-orbits, where P⊂eq GLn(C) is a parabolic subgroup such that Lie(P) = p, and give an explicit description of the irreducible components. This allows us to study nearby fibers of μ as they are equidimensional, and one may also construct GIT quotients μ-1(0) /\!\!/ P by varying the stability condition . Finally, we study a variety analogous to the scheme studied by Wilson with connections to a Calogero--Moser phase space where only some of particles interact.