The Lindel\"of Condition for Charge Distribution and Balayage

Abstract

Let be a charge distribution on the complex plane C, i.e. the real Radon measure on C with total variation ||. The charge distribution is of finite upper density under order of 1 if 0<r+∞ 1t||(\z∈ C | |z|≤ r\)<+∞. The charge distribution satisfies the Lindel\"of condition of genus 1 if 1≤ r +∞|∫1≤ |z|≤ r 1zd\!(z)|<+∞. These concepts play a key role in the study of entire functions of exponential type and subharmonic functions of finite type under order of 1, as well as in their applications. In our previous works, a technique was developed for balayage of finite genus q=0,1,… of the charge distribution from the half-plane. We show that balayage of genus q=1 of the charge distribution from the half-plane preserves this pair of properties under some condition on .