Received: May 21, 2018
Accepted: October 8, 2018
Publication Date: March 1, 2019

Download Citation: RIS|BibTeX|https://doi.org/10.6180/jase.201903_22(1).0003  

ABSTRACT

In this study, we investigate the existence of numerous twin prime pairs according to the prime number inferred by the sieve of Eratosthenes. Given a number M = (6n + 5)², at least three twin prime pairs can be found from the incremental range, which is increased from (6n + 5)² to [6(n + 1) + 5]² for n = 0 to infinite. Thus, we might be able to prove the twin prime conjecture proposed by de Polignac in 1849, that is, several prime numbers p exist for each natural number k by denoting p + 2k as the prime number when k = 1. Instead of twin prime pairs occurring irregularly, we infer that the twin prime conjecture solution might solved by satisfying two conditions: (1) eliminating the non twin prime pairs in associated twin prime pairs would be regular, and (2) the incremental range from (6n + 5)² to [6(n + 1) + 5]² for n = 0 to would be regular. These conditions may not have been considered in previous studies that explored the question on whether numerous twin prime pairs exist, which has been one of the open questions in number theory for more than a century.

Keywords: Twin Primes, Number Theory, Prime Number, Incremental Range