Torus quotients of Richardson varieties in Gr,qr+1
Abstract
Let r and q be positive integers and n=qr+1. Let G = SL(n, C) and T be a maximal torus of G. Let Pαr be the maximal parabolic subgroup of G corresponding to the simple root αr. Let ωr be the fundamental weight corresponding to αr. Let W be the Weyl group of G and WPαr be the Weyl group of Pαr. Let WPαr be the set of all minimal coset representatives of W/WPαr in W. Let wr,n (respectively, vr,n) be the minimal (respectively, maximal) element in WPαr such that wr,n(nωr) ≤ 0 (respectively, vr,n(nωr) ≥ 0). Let v ≤ vr,n and Xvwr,n be the Richardson variety in Gr,n corresponding to v and wr,n. In this article, we give a sufficient condition on v such that the GIT quotient of Xvwr,n for the action of T is the product of projective spaces with respect to the descent of the line bundle L(nωr).
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