We consider the problem of finding small prime gaps in various sets of
integers $\mathcal{C}$. Following the work of Goldston-Pintz-Yildirim, we will
consider collections of natural numbers that are well-controlled in arithmetic
progressions. Letting $q_n$ denote the $n$-th prime in $\mathcal{C}$, we will
establish that for any small constant $\epsilon>0$, the set $\left\{q_n|
q_{n+1}-q_n \leq \epsilon \log n \right\}$ constitutes a positive proportion of
all prime numbers. Using the techniques developed by Maynard and Tao we will
also demonstrate that $\mathcal{C}$ has bounded prime gaps. Specific examples,
such as the case where $\mathcal{C}$ is an arithmetic progression have already
been studied and so the purpose of this paper is to present results for general
classes of sets

Benatar, Jacques

International Journal of Number Theory

English

arXiv

 We consider the problem of finding small prime gaps in various sets [Formula: see text]. Following the work of Goldston–Pintz–Yıldırım, we will consider collections of natural numbers that are well-controlled in arithmetic progressions. Letting qn denote the nth prime in [Formula: see text], we will establish that for any small constant ϵ &gt; 0, the set {qn | qn+1 - qn ≤ ϵ log n} constitutes a positive proportion of all prime numbers. Using the techniques developed by Maynard and Tao, we will also demonstrate that [Formula: see text] has bounded prime gaps. Specific examples, such as the case where [Formula: see text] is an arithmetic progression have already been studied and so the purpose of this paper is to present results for general classes of sets. </jats:p

Jacques Benatar

Crossref

The existence of small prime gaps in subsets of the integers

In this dissertation we consider the problem of finding small prime gaps in various sets $\mathcal{C} \subset \N$. To approach this problem we will consider collections of natural numbers that are well-controlled in arithmetic progressions. Following the work of Goldston-Pintz-Y{\i}ld{\i}r{\i}m, we let $q_n$ denote the $n$-th prime in $\mathcal{C}$ and establish that for some ``small" constant $\epsilon&gt;0$, the set $\left\{ q_n| q_{n+1}-q_n \leq \epsilon \log n \right\}$ constitutes a positive proportion of all prime numbers. Using the techniques developed by Maynard and Tao we will also demonstrate that $\mathcal{C}$ has bounded prime gaps. Specific examples, such as the case where $\mathcal{C}$ is an arithmetic progression have already been studied and so the purpose of this dissertation is to present results for general classes of sets.\\We also prove a second moment estimate for the Maynard-Tao sieve and give an application to Goldbach and de Polignac numbers. We show that at least one of two nice properties holds. Either consecutive Goldbach numbers lie within a finite distance from one another or else the set of de Polignac numbers has full density in $2 \N$

The existence of small prime gaps in subsets of the integers

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