Holomorphic sections of line bundles vanishing along subvarieties

Abstract

Let X be a compact normal complex space of dimension n, and L be a holomorphic line bundle on X. Suppose =(1,…,) is an -tuple of distinct irreducible proper analytic subsets of X, τ=(τ1,…,τ) is an -tuple of positive real numbers, and consider the space H00 (X, Lp) of global holomorphic sections of Lp:=L p that vanish to order at least τjp along j, 1≤ j≤. We find necessary and sufficient conditions which ensure that H00(X,Lp) pn, analogous to Ji-Shiffman's criterion for big line bundles. We give estimates of the partial Bergman kernel, investigate the convergence of the Fubini-Study currents and their potentials, and the equilibrium distribution of normalized currents of integration along zero divisors of random holomorphic sections in H00 (X, Lp) as p∞. Regularity results for the equilibrium envelope are also included.