Unstable loci in flag varieties and variation of quotients

Abstract

We consider the action of a semisimple subgroup G of a semisimple complex group G on the flag variety X=G/B, and the linearizations of this action by line bundles L on X. The main result is an explicit description of the associated unstable locus in dependence of L, as well as a combinatorial formula for its (co)dimension. We observe that the codimension is equal to 1 on the regular boundary of the G-ample cone, and grows towards the interior in steps by 1, in a way that the line bundles with unstable locus of codimension q form a convex polyhedral cone. We also give a recursive algorithm for determining all GIT-classes in the G-ample cone of X. As an application, we give conditions ensuring the existence of GIT-classes C with an unstable locus of codimension at least two and which moreover yield geometric GIT quotients. Such quotients YC reflect global information on G-invariants. They are always Mori dream spaces, and the Mori chambers of the pseudoeffective cone Eff(YC) correspond to the GIT-chambers of the G-ample cone of X. Moreover, all rational contractions f: YC -- Y' to normal projective varieties Y' are induced by GIT from linearizations of the action of G on X. In particular, this is shown to hold for a diagonal embedding G ( G)k, with sufficiently large k.