On a Diophantine Inequality with Primes Yielding Square-Free Sums with Given Numbers
Abstract
Let α∈ R and β∈ R be given. Suppose that a1,…,as are distinct positive integers that do not contain a reduced residue system modulo p2 for any prime p. We prove that there exist infinitely many primes p such that the inequality ||α p+β||<p-1/10 holds and all the numbers p+a1,…,p+as are square-free.
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