On an inequality related to the radial growth of subharmonic functions

Abstract

It is a classical result that every subharmonic function, defined and Lp-integrable for some p, 0<p<+∞, on the unit disk D of the complex plane C is for almost all θ of the form o((1-| z|)-1/p), uniformly as z eiθ in any Stolz domain. Recently Pavlovi\'c gave a related integral inequality for absolute values of harmonic functions, also defined on the unit disk in the complex plane. We generalize Pavlovi\'c's result to so called quasi-nearly subharmonic functions defined on rather general domains in Rn, n≥ 2.