Singular holomorphic foliations by curves. III: Zero Lelong numbers

Abstract

Let F be a holomorphic foliation by curves defined in a neighborhood of 0 in Cn (n≥ 2) having 0 as a weakly hyperbolic singularity. Let T be a positive harmonic current directed by F which does not give mass to any of the n coordinate invariant hyperplanes \zj=0\ for 1≤ j≤ n. Then we show that the Lelong number of T at 0 vanishes. Moreover, an application of this local result in the global context is given. We discuss also the relation between several basic notions such as directed positive harmonic currents, directed positive ddc-closed currents, Lelong numbers etc. in the framework of singular holomorphic foliations.