100% of the zeros of ζ(s) are on the critical line

Abstract

Throughout this manuscript the zeros are counted with multiplicity. We denote by N(T) the number of zeros of ζ(s) in the critical strip upto height T where T>3 is not an ordinate of zero of ζ(s). Denote by N0(T) the number of zeros of ζ(s) on the critical line upto height T. We first show that there exists ε0>0 such that (s) has no zeros on the boundary of a small rectangle Rε defined as Rε=\σ+it∈C 12-ε≤ σ≤ 12+ε,\ 0≤ t≤ T\ whenever 0<ε<ε0. Secondly if Nε(T) is the number of zeros of ζ(s) inside the rectangle Rε then we prove that Nε (T)=N0(T) for ε sufficiently small depending on the height T. We use the Littlewood's lemma on the rectangle Rε along with the Hadamard product of (s) and the asymptotic for the logarithmic derivative of ζ(s) to prove that as T ∞, N0(T)=T2π(T2π)-T2π+O( T) Also if is the proportion of zeros of ζ(s) on the critical line :=T ∞ N0(T)N(T) then we prove as a consequence that =1.

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