Uniqueness of tangent currents for positive closed currents
Abstract
Let X be a complex manifold X of dimension k, and let V⊂ X be a K\"ahler submanifold of dimension l, and let B⊂ V be a piecewise C2-smooth domain. Let T be a positive closed currents of bidegree (p,p) in X such that T satisfies a mild reasonable assumption in a neighborhood of ∂ B in X and that the j-th average mean j(T,B,r) for every j with (0,l-p)≤ j≤(l,k-p) converges sufficiently fast to the j-th generalized Lelong number j(T,B) as r tends to 0 so that r-1(j(T, B,r)-j( T,B)) is locally integrable near r=0. Then we show that T admits a unique tangent current along B. A local version where we replace the condition of T near B by the conditions on a finite cover of B by piecewise C2-smooth domains in V is also given. When T is a current of integration over a complex analytic set, we show that j(T,B,r)-j(T,B)=O(r) for some >0, and hence this condition is satisfied. Our result may be viewed as a natural generalization of Blel-Demailly-Mouzali's criterion from the case l=0 to the case l>0. The result has applications in the intersection theory of positive closed currents.
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