< 1 min
In number theory, Polignac’s Conjecture was introduced by Alphonse de Polignac in 1849
and states :
Given even integer n, it exists an infniity of consecutive prime integers with dierence n. In
other words, given even integer n , it exists an innity of prime numbers p such that p + n
are simultaneously consecutive prime. Our objective is to prove in this present article this old
conjecture. We propose here a proof of this conjecture by proving even deviation prime number
conjecture ,which asserts the existence of infinity prime integers p such that p + n is prime for
any given even integer n