The generalized Lelong numbers and intersection theory
Abstract
Let be a complex manifold of dimension and be a K\"ahler submanifold of dimension in and be a domain with -smooth boundary. Let be a positive plurisubharmonic current on such that satisfies a reasonable approximation condition on and near In our previous work we introduce the concept of the generalized Lelong numbers of along for When is a single point is none other than the classical Lelong number of at This article has five purposes: Firstly, we formulate the notion of the generalized Lelong number of associated to every closed smooth -form on This concept extends the previous notion of the generalized Lelong numbers. We also establish their basic properties. Secondly, we define the horizontal dimension of such a current along Next, we characterize in terms of the generalized Lelong numbers. We also establish a Siu's upper-semicontinuity type theorem for the generalized Lelong numbers. In their above-mentioned context, Dinh and Sibony introduced some cohomology classes which may be regarded as their analogues of the classical Lelong numbers. Our third objective is to generalize their notion to the broader context where is (merely) positive pluriharmonic. Moreover, we also establish a formula relating Dinh-Sibony classes and the generalized Lelong numbers. Fourthly, we obtain an effective sufficient condition for defining the intersection of positive closed currents in the sense of Dinh-Sibony's theory of tangent currents on a compact K\"ahler manifold. Finally, we establish an effective sufficient condition for the continuity of the above intersection.
Cite
@article{arxiv.2501.02150,
title = {The generalized Lelong numbers and intersection theory},
author = {Viet-Anh Nguyen},
journal= {arXiv preprint arXiv:2501.02150},
year = {2025}
}
Comments
78 pages. arXiv admin note: substantial text overlap with arXiv:2111.11024; text overlap with arXiv:1203.5810 by other authors