On the density of primes of the form $X^2+c$
November 07, 2023 Β· Declared Dead Β· π Transactions on Machine Learning and Artificial Intelligence
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Authors
Marc Wolf, FranΓ§ois Wolf
arXiv ID
2311.05647
Category
cs.DS: Data Structures & Algorithms
Citations
1
Venue
Transactions on Machine Learning and Artificial Intelligence
Last Checked
4 months ago
Abstract
We present a method for finding large fixed-size primes of the form $X^2+c$. We study the density of primes on the sets $E_c = \{N(X,c)=X^2+c,\ X \in (2\mathbb{Z}+(c-1))\}$, $c \in \mathbb{N}^*$. We describe an algorithm for generating values of $c$ such that a given prime $p$ is the minimum of the union of prime divisors of all elements in $E_c$. We also present quadratic forms generating divisors of Ec and study the prime divisors of its terms. This paper uses the results of Dirichlet's arithmetic progression theorem [1] and the article [6] to rewrite a conjecture of Shanks [2] on the density of primes in $E_c$. Finally, based on these results, we discuss the heuristics of large primes occurrences in the research set of our algorithm.
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