Siegel's theorem on integral points

Finitely many for a smooth algebraic curve of genus > 0 defined over a number field

In mathematics, Siegel's theorem on integral points states that for a smooth algebraic curve C of genus g defined over a number field K, presented in affine space in a given coordinate system, there are only finitely many points on C with coordinates in the ring of integers O of K, provided g > 0.

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