English

Newman's conjecture in various settings

Number Theory 2015-08-10 v1

Abstract

De Bruijn and Newman introduced a deformation of the Riemann zeta function ζ(s)\zeta(s), and found a real constant Λ\Lambda which encodes the movement of the zeros of ζ(s)\zeta(s) under the deformation. The Riemann hypothesis (RH) is equivalent to Λ0\Lambda \le 0. Newman made the conjecture that Λ0\Lambda \ge 0 along with the remark that "the new conjecture is a quantitative version of the dictum that the Riemann hypothesis, if true, is only barely so." Newman's conjecture is still unsolved, and previous work could only handle the Riemann zeta function and quadratic Dirichlet LL-functions, obtaining lower bounds very close to zero (for example, for ζ(s)\zeta(s) the bound is at least 1.145411011-1.14541 \cdot 10^{-11}, and for quadratic Dirichlet LL-functions it is at least 1.17107-1.17 \cdot 10^{-7}). We generalize the techniques to apply to automorphic LL-functions as well as function field LL-functions. We further determine the limit of these techniques by studying linear combinations of LL-functions, proving that these methods are insufficient. We explicitly determine the Newman constants in various function field settings, which has strong implications for Newman's quantitative version of RH. In particular, let D\bbZ[T]\mathcal D \in \bbZ[T] be a square-free polynomial of degree 3. Let DpD_p be the polynomial in \bbFp[T]\bbF_p[T] obtained by reducing D\mathcal D modulo pp. Then the Newman constant ΛDp\Lambda_{D_p} equals logap(D)2p\log \frac{|a_p(\mathcal D)|}{2\sqrt{p}}; by Sato--Tate (if the curve is non-CM) there exists a sequence of primes such that limnΛDpn=0\lim_{n \to\infty} \Lambda_{D_{p_n}} = 0. We end by discussing connections with random matrix theory.

Keywords

Cite

@article{arxiv.1310.3477,
  title  = {Newman's conjecture in various settings},
  author = {Julio Andrade and Alan Chang and Steven J. Miller},
  journal= {arXiv preprint arXiv:1310.3477},
  year   = {2015}
}

Comments

Version 1.0, 18 pages, 1 figure

R2 v1 2026-06-22T01:45:56.678Z