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Bounded Gaps Between Primes in Multidimensional Hecke Equidistribution Problems

Number Theory 2020-04-13 v1

Abstract

Using Duke's large sieve inequality for Hecke Gr{\"o}ssencharaktere and the new sieve methods of Maynard and Tao, we prove a general result on gaps between primes in the context of multidimensional Hecke equidistribution. As an application, for any fixed 0<ϵ<120<\epsilon<\frac{1}{2}, we prove the existence of infinitely many bounded gaps between primes of the form p=a2+b2p=a^2+b^2 such that a<ϵp|a|<\epsilon\sqrt{p}. Furthermore, for certain diagonal curves C:axα+byβ=c\mathcal{C}:ax^{\alpha}+by^{\beta}=c, we obtain infinitely many bounded gaps between the primes pp such that p+1#C(Fp)<ϵp|p+1-\#\mathcal{C}(\mathbb{F}_p)|<\epsilon\sqrt{p}.

Keywords

Cite

@article{arxiv.1509.04378,
  title  = {Bounded Gaps Between Primes in Multidimensional Hecke Equidistribution Problems},
  author = {Jesse Thorner},
  journal= {arXiv preprint arXiv:1509.04378},
  year   = {2020}
}
R2 v1 2026-06-22T10:56:45.780Z