On Legendre's, Brocard's, Andrica's, and Oppermann's Conjectures
Abstract
Let n∈Z+. Is it true that every sequence of n consecutive integers greater than n2 and smaller than (n+1)2 contains at least one prime number? In this paper we show that this is actually the case for every n ≤ 1,193,806,023. In addition, we prove that a positive answer to the previous question for all n would imply Legendre's, Brocard's, Andrica's, and Oppermann's conjectures, as well as the assumption that for every n there is always a prime number in the interval [n,n+2n-1].
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