Multigraded Fujita Approximation

Abstract

The original Fujita approximation theorem states that the volume of a big divisor D on a projective variety X can always be approximated arbitrarily closely by the self-intersection number of an ample divisor on a birational modification of X. One can also formulate it in terms of graded linear series as follows: let W = \Wk \ be the complete graded linear series associated to a big divisor D: \[ Wk = H0(X,OX(kD)). \] For each fixed positive integer p, define W(p) to be the graded linear subseries of W generated by Wp: \[ W(p)m=cases 0, &if p m; Image (Sk Wp → Wkp ), &if m=kp. cases \] Then the volume of W(p) approaches the volume of W as p∞. We will show that, under this formulation, the Fujita approximation theorem can be generalized to the case of multigraded linear series.