Difference sets and Polynomials of prime variables
Abstract
Let (x) be a polynomial with rational coefficients. Suppose that has the positive leading coefficient and zero constant term. Let A be a set of positive integers with the positive upper density. Then there exist x,y∈ A and a prime p such that x-y=(p-1). Furthermore, if P be a set of primes with the positive relative upper density, then there exist x,y∈ P and a prime p such that x-y=(p-1).
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