On a conjecture of Ram\'rez Alfons\'n and Skaba III

Abstract

Let 1<c<d be two relatively prime integers. For a non-negative integer , let g(c,d) be the largest integer n such that n=c x+d y has at most non-negative solutions (x,y). In this paper we prove that π,c,dπ(g(c,d))2 +2(as~ c∞)\,, where π,c,d is the number of primes n having more than distinct non-negative solutions to n=c x+d y with n g(c,d), and π(x) denotes the number of all primes up to x. The case where =0 has been proved by Ding, Zhai and Zhao recently, which was conjectured formerly by Ram\'rez Alfons\'n and Skaba.

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