On the exceptional set in the abc conjecture
Abstract
The abc conjecture states that there are only finitely many triples of coprime positive integers (a,b,c) such that a+b=c and rad(abc) < c1-ε for any ε > 0. Using the optimized methods in a recent work of Browning, Lichtman and Ter\"av\"ainen, we showed that the number of those triples with c ≤slant X is O(X56/85+) for any > 0, where 5685 ≈ 0.658824. This constitutes an improvement of the previous bound O(X33/50).
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