Szego's Condition on Compact subsets of C

Abstract

Let K be a non-polar compact subset of C and μK be its equilibrium measure. Let μ be a unit Borel measure supported on a compact set which contains the support of μK. We prove that a Szego condition in terms of the Radon-Nikodym derivative of μ with respect to μK implies that ∈fn \|Pn(·;μ)\|L2(C;μ)Cap(K)n>0. We show that \|Pn(·;μK)\|L2(C;μK)Cap(K)n≥ 1 for any compact non-polar set K. We also prove that under an additional assumption, unboundedness of the sequence (\|Pn(·;μK)\|L2(C;μK)Cap(K)n) implies that K satisfies the Parreau-Widom condition.