Some conditions for descent of line bundles to GIT quotients (G/B × G/B × G/B)//G

Abstract

We consider the descent of line bundles to GIT quotients of products of flag varieties. Let G be a simple, connected, algebraic group over C. We fix a Borel subgroup B and consider the diagonal action of G on the projective variety X = G/B × G/B × G/B. For any triple (λ, μ, ) of dominant regular characters there is a G-equivariant line bundle L on X. Then, L is said to descend to the GIT quotient π:[X(L)]ss → X(L)//G if there exists a line bundle L on X(L)//G such that L[X(L)]ss π*L. Let Q be the root lattice, the weight lattice, and d the least common multiple of the coefficients of the highest root θ of the Lie algebra g of G written in terms of simple roots. We show that L descends if λ, μ, ∈ d and λ + μ + ∈ , where is a fixed sublattice of Q depending only on the type of g. Moreover, L never descends if λ + μ + Q.