A characterization of some prime ideals in certain F-algebras of holomorphic functions

Abstract

The class Mp (1<p<∞) consists of all holomorphic functions f on the open unit disk D for which ∫02π(+Mf(θ))p\,dθ2π<∞, where Mf(θ)=0≤slant r<1 f(reiθ) . The class Mp equipped with the topology given by the metric p defined by p(f,g)=(∫02πp(1+M(f-g)(θ))\, dθ2π)1/p (f,g∈ Mp) becomes an F-algebra. In this paper, we consider the ideal structure of the classes Mp (1<p<∞). Our main result gives a complete characterization of prime ideals in Mp which are not dense subsets of Mp. As a consequence, we obtaiin a related Mochizuki's result concerning the Privalov classes Np (1<p<∞).