Uhlenbeck spaces via affine Lie algebras
Abstract
Let G be an almost simple simply connected group over , and let aG(2,1) be the moduli scheme of principal G-bundles on the projective plave 2, of second Chern class a, trivialized along a line 1⊂ 2. We define the Uhlenbeck compactification aG of aG(2,1), which classifies, roughly, pairs (G,D), where D is a 0-cycle on 2=2-1 of degree b, and G is a point of a-bG(2,1), for varying b. In addition, we calculate the stalks of the Intersection Cohomology sheaf of aG. To do that we give a geometric realization of Kashiwara's crystals for affine Kac-Moody algebras.
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