Projective normality of torus quotients of flag varieties

Abstract

Let G=SLn( C) and T be a maximal torus in G. We show that the quotient T G/Pα1 Pα2 is projectively normal with respect to the descent of a suitable line bundle, where Pαi is the maximal parabolic subgroup in G associated to the simple root αi, i=1,2. We give a degree bound of the generators of the homogeneous coordinate ring of T (G3,6)ssT(L23). If G =Spin7, we give a degree bound of the generators of the homogeneous coordinate ring of T (G/Pα2)ssT(L22) whereas we prove that the quotient T (G/Pα3)ssT(L43) is projectively normal with respect to the descent of the line bundles L43.