Average of Hardy's function at Gram points

Abstract

Let Z(t)=-1/2(1/2+it)ζ(1/2+it)=eiθ(t)ζ(1/2+it) be Hardy's function and g(n) be the n-th Gram points defined by θ(g(n))=π n. Titchmarsh proved that Σn ≤ N Z(g(2n)) =2N+O(N3/43/4N) and Σn ≤ N Z(g(2n+1)) =-2N+O(N3/43/4N). We shall improve the error terms to O(N1/43/4N N).