We study questions related to exceptional sets of pluri-Green potentials Vμ in the unit ball B of ℂⁿ in terms of non-isotropic Hausdorff capacity. For suitable measures μ on the ball B, the pluri-Green potentials Vμ are defined by Vμ(z)=∫Blog(1/|ϕz(w)|)dμ(w), where for a fixed z ∈ B, ϕz denotes the holomorphic automorphism of B satisfying ϕz(0)=z, ϕz(z)=0 and (ϕz∘ϕz)(w)=w for every w ∈ B. If dμ(w) = f(w)dλ(w), where f is a non-negative measurable function of B, and λ is the measure on B, invariant under all holomorphic automorphisms of B, then Vμ is denoted by Vf. The main result of this paper is as follows: Let f be a non-negative measurable function on B satisfying ∫B(1-|z|²)fp(z)dλ(z)<∞ for some p with 1 < p < n/(n-1) and some α with 0 < α < n + p - np. Then for each τ with 1 ≤ τ ≤ n/α, there exists a set Eτ⊆S with Hατ(Eτ)=0 such that limz→ζz∈τ,c(ζ)Vf(z)=0 for all points ζ∈S∖Eτ. In the above, for α > 0, Hα denotes the non-isotropic Hausdorff capacity on S, and for ζ ∈ S = ∂B, τ ≥ 1, and c > 0, τ,c(ζ) are the regions defined by τ,c(ζ)=z∈B:|1-⟨z,ζ⟩|τ<c(1-|z|²).

Publié le : 2006-01-01
EUDML-ID : urn:eudml:doc:280581

@article{bwmeta1.element.bwnjournal-article-doi-10_4064-ap88-1-5,
     author = {Kuzman Adzievski},
     title = {Non-isotropic Hausdorff capacity of exceptional sets for pluri-Green potentials in the unit ball of Cn},
     journal = {Annales Polonici Mathematici},
     volume = {89},
     year = {2006},
     pages = {59-82},
     zbl = {1095.31001},
     language = {en},
     url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-doi-10_4064-ap88-1-5}
}

Kuzman Adzievski. Non-isotropic Hausdorff capacity of exceptional sets for pluri-Green potentials in the unit ball of ℂⁿ. Annales Polonici Mathematici, Tome 89 (2006) pp. 59-82. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-doi-10_4064-ap88-1-5/