Restricted spaces of holomorphic sections 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 that =(1,…,) is an -tuple of distinct irreducible proper analytic subsets of X, τ=(τ1,…,τ) is an -tuple of positive real numbers, and let H00(X,Lp) be the space of holomorphic sections of Lp:=L p that vanish to order at least τjp along j, 1≤ j≤. If Y⊂ X is an irreducible analytic subset of dimension m, we consider the space H00 (X|Y, Lp) of holomorphic sections of Lp|Y that extend to global holomorphic sections in H00(X,Lp). Assuming that the triplet (L,,τ) is big in the sense that H00(X,Lp) pn, we give a general condition on Y to ensure that H00(X|Y,Lp) pm. When L is endowed with a continuous Hermitian metric, we show that the Fubini-Study currents of the spaces H00(X|Y,Lp) converge to a certain equilibrium current on Y. We apply this to the study of the equidistribution of zeros in Y of random holomorphic sections in H00(X|Y,Lp) as p∞.

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