The estimation of the ratio of two entire functions with the same zeros in the ball

Abstract

The paper studies entire functions of finite order of growth for which a representation of the form (z) = 1+ O(|z|-μ), μ >0, as z ∞, is valid on a fixed ray of the complex plane. The main result is the following. Assume that the zeros of two functions 1, 2 of this class coincide in the circle of radius R with the center in zero. Then given arbitrary small δ∈ (0,1) and >0 the relation of these functions admits the estimate |1(z)/2(z) -1| ≤slant R-μ(1-δ) for all |z|≤slant R1-δ, provided that R≥slant R0 and R0 =R0(, δ) is sufficiently large. This result is of considerable interest in the analysis of the stability in the inverse resonance problem for the Schroedinger equation.