Geometry of the fixed points loci and discretization of Springer fibers in classical types
Abstract
Consider a simple algebraic group G of classical type and its Lie algebra g. Let (e,h,f) ⊂ g be an sl2-triple and Qe= CG(e,h,f). The torus Te that comes from the sl2-triple acts on the Springer fiber Be. Let Begr denote the fixed point loci of Be under this torus action. Our main geometric result is that when the partition of e has up to 4 rows, the derived category Db(Begr) admits a complete exceptional collection that is compatible with the Qe-action. The objects in this collection give us a finite set Ye that is naturally equipped with a Qe-centrally extended structure. We prove that the set Ye constructed in this way coincides with a finite set that has appeared in various contexts in representation theory. For example, a direct summand Jc of the asymptotic Hecke algebra is isomorphic to K0(ShQe(Ye× Ye). The left cells in the two-sided cell c corresponding to the adjoint orbit of e are in bijection with the Qe-orbits in Ye. Our main numerical result is an algorithm to compute the multiplicities of the Qe-centrally extended orbits that appear in Ye.
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