Degenerate flag varieties of type A: Frobenius splitting and BW theorem

Abstract

Let a be the PBW degeneration of the flag varieties of type An-1. These varieties are singular and are acted upon with the degenerate Lie group SLna. We prove that a have rational singularities, are normal and locally complete intersections, and construct a desingularization R of a. The varieties R can be viewed as towers of successive 1-fibrations, thus providing an analogue of the classical Bott-Samelson-Demazure-Hansen desingularization. We prove that the varieties R are Frobenius split. This gives us Frobenius splitting for the degenerate flag varieties and allows to prove the Borel-Weyl type theorem for a. Using the Atiyah-Bott-Lefschetz formula for R, we compute the q-characters of the highest weight n-modules.