Note on the a-points of the Riemann zeta function

Abstract

For any a∈C, the zeros of ζ(s)-a, denoted by a=βa+iγa, are called a-points of the Riemann zeta function ζ(s). In this paper, we reformulate some basic results about the a-points of ζ(s) shown by Garunkstis and Steuding. We then deduce an asymptotic of the sum \[ST(a,δ)=Στ<γa≤slant Tζ'(a+iδ)Xa, T∞,\] where 0δ=2παT2π X 1, and X>0 and τ≥slant|δ|+1 are fixed. We also find the interesting varied behavior of ST(a,δ) in different X ranges, which is more complicated than those described before by Gonek and Pearce-Crump.

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