Random polynomials and pluripotential-theoretic extremal functions

Abstract

There is a natural pluripotential-theoretic extremal function VK,Q associated to a closed subset K of Cm and a real-valued, continuous function Q on K. We define random polynomials Hn whose coefficients with respect to a related orthonormal basis are independent, identically distributed complex-valued random variables having a very general distribution (which includes both normalized complex and real Gaussian distributions) and we prove results on a.s. convergence of a sequence 1/n log |Hn| pointwise and in L1loc(Cm) to VK,Q. In addition we obtain results on a.s. convergence of a sequence of normalized zero currents ddc [1/n log |Hn|] to ddc VK,Q as well as asymptotics of expectations of these currents. All these results extend to random polynomial mappings and to a more general setting of positive holomorphic line bundles over a compact Kahler manifold.