Differentials of Cox rings: Jaczewski's theorem revisited

A generalized Euler sequence over a complete normal variety X is the unique extension of the trivial bundle V \otimes O_X by the sheaf of differentials \Omega_X, given by the inclusion of a linear space V in Ext^1(O_X,\Omega_X). For \Lambda, a lattice of Cartier divisors, let R_\Lambda denote the corresponding sheaf associated to V spanned by the first Chern classes of divisors in \Lambda. We prove that any projective, smooth variety on which the bundle R_\Lambda splits into a direct sum of line bundles is toric. We describe the bundle R_\Lambda in terms of the sheaf of differentials on the characteristic space of the Cox ring, provided it is finitely generated. Moreover, we relate the finiteness of the module of sections of R_\Lambda and of the Cox ring of \Lambda.