A Frobenius splitting and cohomology vanishing for the cotangent bundles of the flag varieties of GLn
Abstract
Let k be an algebraically closed field of characteristic p>0, let G=GLn be the general linear group over k, let P be a parabolic subgroup of G, and let uP be the Lie algebra of its unipotent radical. We show that the Kumar-Lauritzen-Thomsen splitting of the cotangent bundle GxPuP of G/P has top degree (p-1)(G/P). The component of that degree is therefore given by the (p-1)-th power of a function f. We give a formula for f and deduce that it vanishes on the exceptional locus of the resolution GxPuP--> O where O is the closure of the Richardson orbit of P. As a consequence we obtain that the higher cohomology groups of a line bundle on GxPuP associated to a dominant weight are zero. The splitting of GxPuP given by fp-1 can be seen as a generalisation of the Mehta-Van der Kallen splitting of GxBu.
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