Value distribution of meromorphic transforms and applications
摘要
A meromorphic transform between complex manifolds is a surjective mutivalued map with an analytic graph. Let be a sequence of meromorphic transforms from a compact Kahler manifold X into compact Kahler manifolds X_n. We give conditions which imply that the behavior of the sequence of preimages of x_n does not depend on the generic sequence of points (x_1,x_2,....). Using this formalism, we obtain sharp results on the limit distribution of common zeros, of random holomorphic sections of high powers of a positive holomorphic line bundle L over a projective manifold X. We consider also the equidistribution problem for random iteration of correspondences. If f is a meromorphic self correspondence of a compact Kahler manifold X, under a hypothesis on the dynamical degrees, we construct an -invariant probability measure such that quasi-p.s.h. functions are -integrable. Every projective manifold admits such correspondences. When f is a meromorphic map, the measure is exponentially mixing. We give some analogous results for random iterations of correspondences. We also consider the problem of equidistribution of preimages of subvarieties for a correspondences and more precisely for polynomial automorphisms.
引用
@article{arxiv.math/0306095,
title = {Value distribution of meromorphic transforms and applications},
author = {T. C. Dinh and N. Sibony},
journal= {arXiv preprint arXiv:math/0306095},
year = {2007}
}
备注
56 pages, in French