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

Abstract

Let 1<c<d be two relatively prime integers and gc,d=cd-c-d. We confirm, by employing the Hardy--Littlewood method, a 2020 conjecture of Ram\'rez Alfons\'n and Skaba which states that #\p gc,d:p∈ P, ~p=cx+dy,~x,y∈ Z≥slant0\ 12π(gc,d) (as~c→∞), where P is the set of primes, Z≥slant0 is the set of nonnegative integers and π(t) denotes the number of primes not exceeding t.