Abstract
Abstract In this paper, we prove some conditional results about the order of zero at central point s = 1/2 of the Rankin-Selberg L-function L(s, πf × π͠′ f ). Then, we give an upper bound for the height of the first zero with positive imaginary part of L(s, πf × π͠′ f ). We apply our results to automorphic L-functions.
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