Integrals of differences of subharmonic functions. I. An integral inequality with Nevanlinna characteristic and modulus of continuity of measure

Abstract

We obtain new integral inequalities for the integrals of the difference of subharmonic functions in measure through their Nevanlinna characteristic and some functional characteristic of the measure. These results are new also for meromorphic functions. Let us illustrate the main result for the case of a meromorphic function. We denote by Dz(r) a closed disc of radius r centered at z in the complex plane C. Let μ≥ 0 be a Borel measure on D0(r), and M:=μ(D0(r))<+∞. The modulus of continuity of measure μ is the function h(t):=z∈ Cμ(Dz(t)), t≥ 0. Suppose that ∫0h(t)t dt<+∞. Let f≠ 0 be a meromorphic function on a neighbourhood of D0(R) of radius R>r with f(0)∈ C and the Nevanlinna characteristic Tf . Then there is ∫ +|f| \,dμ ≤ 2R+rR-rTf(R)M(1+∫0R+rh(t)t dt).