On uniqueness of functions in the extended Selberg class with moving targets

Abstract

We study the question of when two functions L1,L2 in the extended Selberg class are identical in terms of the zeros of Li-h(i=1,2). Here, the meromorphic function h is called moving target. With the assumption on the growth order of h, we prove that L1 L2 if L1-h and L2-h have the same zeros counting multiplicities. Moreover, we also construct some examples to show that the assumption is necessary. Compared with the known methods in the literature of this area, we developed a new strategy which is based on the transcendental directions first proposed in the study of distribution of Julia set in complex dynamical system. This may be of independent interest.

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