Projective limits of Poletsky--Stessin Hardy spaces

Abstract

In this paper we show that that on a strongly pseudoconvex domain D the projective limit of all Poletsky--Stessin Hardy spaces Hpu(D), introduced in PS, is isomorphic to the space H∞(D) of bounded holomorphic functions on D endowed with a special topology. To prove this we show that Carath\'eodory balls lie in approach regions, establish a sharp inequality for the Monge--Amp\'ere mass of the envelope of plurisubharmonic exhaustion functions and use these facts to demonstrate that the intersection of all Poletsky--Stessin Hardy spaces Hpu(D) is H∞(D).