Gaps Between Consecutive Zeros of the Riemann Zeta-Function on the Critical Line.
Gaps between primes, and the pair correlation of zeros of the zeta-function
Gaps between zeros of the derivative of the Riemann -function
Assuming the Riemann hypothesis, we investigate the distribution of gaps between the zeros of . We prove that a positive proportion of gaps are less than times the average spacing and, in the other direction, a positive proportion of gaps are greater than times the average spacing. We also exhibit the existence of infinitely many normalized gaps smaller (larger) than (, respectively).
Generalizations of Ramanujan's formulae
Generating function identities for , via the WZ method.
Geometric properties of the zeta function
Gram's Law and the Argument of the Riemann Zeta Function