IMO 2017/6 via arithmetic geometry – mathoverflow.net

IMO 2017/6 via arithmetic geometry – mathoverflow.net

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The (very nice) final problem of IMO 2017 asked contestants to show: If $S$ is a finite set of lattice points $(x,y)$ with $\gcd(x,y)=1$, then there is a nonconstant homogeneous polyonmial $f \in ...

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