Oesterlé-Masser Conjecture/Formulation 2

Theorem

Let $\epsilon \in \R$ be a strictly positive real number.

There exists a constant $K_\epsilon$ such that for all triples of (strictly) positive integers $\tuple {a, b, c}$ with the conditions:

$a + b = c$

$a$, $b$ and $c$ are pairwise coprime

such that:

$c < K_\epsilon \map \Rad {a b c}^{1 + \epsilon}$

where $\Rad$ denotes the radical of an integer.

Also see

• Equivalence of Formulations of Oesterlé-Masser Conjecture

Source of Name

This entry was named for Joseph Oesterlé‎ and David William Masser.