Abstract
Let $K$ be a number field not containing a CM subfield. For any smooth projective curve $Y/K$ of genus $\ge 2$, we prove that the image of the "Selmer" part of Grothendieck's section set inside the $K_v$-rational points $Y(K_v)$ is finite for every finite place $v$. This gives an unconditional verification of a prediction of Grothendieck's section conjecture. In the process of proving our main result, we also refine and extend the method of Lawrence and Venkatesh, with potential consequences for explicit computations.
Citation
L. Alexander Betts. Jakob Stix. "Galois sections and p-adic period mappings." Ann. of Math. (2) 201 (1) 79 - 166, January 2025. https://doi.org/10.4007/annals.2025.201.1.2
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