Quasi-potentials and regularization of currents, and applications

Abstract

Let Y be a compact K\"ahler manifold. We show that the weak regularization Kn of Dinh and Sibony for the diagonal Y (see Section 2 for more detail) is compatible with wedge product in the following sense: If T is a positive ddc-closed (p,p) current and θ is a smooth (q,q) form then there is a sequence of positive ddc-closed (p+q,p+q) currents Sn whose masses converge to 0 so that -Sn≤ Kn(T θ)-Kn(T) θ ≤ Sn for all n. We also prove a result concerning the quasi-potentials of positive closed currents. We give two applications of these results. First, we prove a corresponding compatibility with wedge product for the pullback operator defined in our previous paper. Second, we define an intersection product for positive ddc-closed currents. This intersection is symmetric and has a local nature.