Counting Smooth Solutions to the Equation A+B=C

Abstract

This paper studies integer solutions to the Diophantine equation A+B=C in which none of A, B, C have a large prime factor. We set H(A, B,C) = max(|A|, |B|, |C|), and consider primitive solutions (gcd(A, B, C)=1) having no prime factor p larger than (log H(A, B,C))K, for a given finite K. On the assumption that the Generalized Riemann hypothesis (GRH) holds, we show that for any K > 8 there are infinitely many such primitive solutions having no prime factor larger than (log H(A, B, C))K. We obtain in this range an asymptotic formula for the number of such suitably weighted primitive solutions.