The pluricomplex Poisson kernel for convex finite type domains

Abstract

Given a bounded convex domain D⊂ Cn of finite D'Angelo type and a boundary point ∈ ∂ D, we prove that the homogeneous complex Monge-Amp\`ere equation (ddcu)n=0 possesses a continuous strictly negative solution that vanishes on ∂ D \\ and has a simple pole at . We establish that (z) equals (up to sign) the normal derivative at of the pluricomplex Green function Gz, and its sublevel sets are the horospheres centered at . Moreover, satisfies a Phragmen-Lindel\"of type-theorem and provides a reproducing formula for plurisubharmonic functions. Consequently, serves as a generalisation of the classical Poisson kernel of the unit disc. Our approach, based on metric methods and scaling techniques, allows our results to be applied to strongly convex domains with C2-smooth boundaries as well. In the course of the proof, we also establish a novel estimate of the Kobayashi distance near boundary points.