Weighted Green functions for complex Hessian operators

Abstract

Let 1≤ m≤ n be two fixed integers. Let Cn be a bounded m-hyperconvex domain and A ⊂ × ]0,+ ∞[ a finite set of weighted poles. We define and study properties of the m-subharmonic Green function of with prescribed behaviour near the weighted set A. In particular we prove uniform continuity of the exponential Green function in both variables (z, A) in the metric space × F, where F is a suitable family of sets of weighted poles in × ]0,+ ∞[ endowed with the Hausdorff distance. Moreover we give a precise estimates on its modulus of continuity. Our results generalize and improve previous results concerning the pluricomplex Green function du to P. Lelong.