English

Multigraded Fujita Approximation

Algebraic Geometry 2011-01-05 v2

Abstract

The original Fujita approximation theorem states that the volume of a big divisor DD on a projective variety XX can always be approximated arbitrarily closely by the self-intersection number of an ample divisor on a birational modification of XX. One can also formulate it in terms of graded linear series as follows: let W={Wk}W_{\bullet} = \{W_k \} be the complete graded linear series associated to a big divisor DD: Wk=H0(X,OX(kD)). W_k = H^0\big(X,\mathcal{O}_X(kD)\big). For each fixed positive integer pp, define W(p)W^{(p)}_{\bullet} to be the graded linear subseries of WW_{\bullet} generated by WpW_p: W^{(p)}_{m}={cases} 0, &\text{if $p\nmid m$;} \mathrm{Image} \big(S^k W_p \rightarrow W_{kp} \big), &\text{if $m=kp$.} {cases} Then the volume of W(p)W^{(p)}_{\bullet} approaches the volume of WW_{\bullet} as pp\to\infty. We will show that, under this formulation, the Fujita approximation theorem can be generalized to the case of multigraded linear series.

Cite

@article{arxiv.1005.0432,
  title  = {Multigraded Fujita Approximation},
  author = {Shin-Yao Jow},
  journal= {arXiv preprint arXiv:1005.0432},
  year   = {2011}
}

Comments

6 pages; minor changes; to appear in Pacific Journal of Mathematics

R2 v1 2026-06-21T15:18:09.856Z