Ward's conjecture is a statement in number theory concerning the distribution of prime numbers. Specifically, it pertains to the existence of infinitely many prime numbers of the form \( n^2 + k \), where \( n \) is a positive integer and \( k \) is a fixed integer. The conjecture asserts that for each positive integer \( k \), there are infinitely many integers \( n \) such that \( n^2 + k \) is prime.
Articles by others on the same topic
There are currently no matching articles.