Primes of the form ax+by
Abstract
For two coprime positive integers a,b, let T(a,b)=\ ax+by : x,y∈ Z 0 \ and let s(a,b)=ab-a-b. It is well known that all integers which are greater than s(a,b) are in T(a,b). Let π (a, b) be the number of primes in T(a,b) which are less than or equal to s(a,b). It is easy to see that π (2, 3)=0 and π (2, b)=1 for all odd integers b 5. In this paper, we prove that if b>a 3 with (a, b)=1, then π (a, b)>0.005 s(a,b)/ s(a,b). We conjecture that 1366π (s(a,b)) π (a, b) 12π (s(a,b)) for all b>a 3 with (a, b)=1.
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