Balayage of charge distributions and subharmonic functions onto a strip

Abstract

We consider two balayage constructions on the complex plane C with real axis R for 0≤ b∈ R. Let u -∞ be a subharmonic function on C of order ord[u]:=z ∞ \1,u(z)\ |z|≤ 1, U=u-v be the difference of subharmonic functions u and v -∞ on C with ord[v]≤ 1, i.e., δ-subharmonic function on C of order ord[U]≤ 1. Then there is a δ-subharmonic function V ∞ on C of order ord[V]≤ 1 such that V is harmonic on \ z ∈ C| | z|> b\ and U(z) V(z) for all z∈ \ z ∈ C| | z|≤ b\ E where E⊂ C is polar. If u is a subharmonic function of finite type under order 1, i.e., z ∞ u(z)|z|<+∞, then there exist subharmonic functions u R and ub of finite type under order 1 that are harmonic respectively on C R and \ z ∈ C| | z|> b\ such that cases u(z) u R(z)+ub(z) for all z∈ R \ z ∈ C| | z|≤ b\,\\ u(z)≤ u R(z) + ub(z) for each z∈ C.cases At the same time, we trace special relationships between the various logarithmic characteristics of the Riesz mass and charge distributions of subharmonic and δ-subharmonic functions.