Weighted θ-Incomplete Pluripotential Theory

Abstract

Weighted pluripotential theory is a rapidly developing area; and Callaghan Callaghan recently introduced θ-incomplete polynomials in for d>1. In this paper we combine these two theories by defining weighted θ-incomplete pluripotential theory. We define weighted θ-incomplete extremal functions and obtain a Siciak-Zahariuta type equality in terms of θ-incomplete polynomials. Finally we prove that the extremal functions can be recovered using orthonormal polynomials and we demonstrate a result on strong asymptotics of Bergman functions in the spirit of BermanCn.