Alpha-invariant of toric line bundles
Volume 114 / 2015
Annales Polonici Mathematici 114 (2015), 13-27
MSC: Primary 32Q15; Secondary 14M25.
DOI: 10.4064/ap114-1-2
Abstract
We generalize the work of Jian Song by computing the $\alpha $-invariant of any (nef and big) toric line bundle in terms of the associated polytope. We use the analytic version of the computation of the log canonical threshold of monomial ideals to give the log canonical threshold of any non-negatively curved singular hermitian metric on the line bundle, and deduce the $\alpha $-invariant from this.