Lehmer pairs and binomial series

Abstract

The Hardy function Z(t)=ζ(1/2+it)eiθ(t) takes real values for real t and its real zeros are zeros ζ(s) on the critical line 1/2+it. After discovering the critical value of the local maximum in 1956, Lehmer formulated the assumption that the Hardy function could have a negative local maximum or a positive local minimum. In the paper the Generalized Hardy function is defined as the real part of the Hardy function on any line α+it parallel to the critical line 1/2+it Zα(t)=Re\ ζ(α+it)eiθ(t) and established an distinct relationship between the zeros of the θ(t) function and the zeros of the Generalized Hardy function. ∀ Tλ=(tλ, tλ+1],\ tλ=2πλ2,\ λ=1,\ 2,\ 3\ ... ∃ Aλ:∀ αλ>Aλ |θ(t) -Zαλ(t)|<ε(Aλ),\ t∈ Tλ Then the binomial series is used to establish a relationship between the values of the Generalized Hardy function on any two lines α+it and α+1+it parallel to the critical line. Thus, by induction between values σ=1/2 and σ=αλ>Aλ α(λ)1<α(λ)2<α(λ)3<...<α(λ)<...<α(λ)μλ an distinct relationship has been established between the zeros of the function θ(t) and the zeros of the Hardy function.