An application of spherical geometry to hyperk\"ahler slices

Abstract

This work is concerned with Bielawski's hyperk\"ahler slices in the cotangent bundles of homogeneous affine varieties. One can associate such a slice to the data of a complex semisimple Lie group G, a reductive subgroup H⊂eq G, and a Slodowy slice S⊂eqg:=Lie(G), defining it to be the hyperk\"ahler quotient of T*(G/H)× (G× S) by a maximal compact subgroup of G. This hyperk\"ahler slice is empty in some of the most elementary cases (e.g. when S is regular and (G,H)=(SLn+1,GLn), n≥ 3), prompting us to seek necessary and sufficient conditions for non-emptiness. We give a spherical-geometric characterization of the non-empty hyperk\"ahler slices that arise when S=Sreg is a regular Slodowy slice, proving that non-emptiness is equivalent to the so-called a-regularity of (G,H). This a-regularity condition is formulated in several equivalent ways, one being a concrete condition on the rank and complexity of G/H. We also provide a classification of the a-regular pairs (G,H) in which H is a reductive spherical subgroup. Our arguments make essential use of Knop's results on moment map images and Losev's algorithm for computing Cartan spaces.