Refined effective bounds for Bloch-Kato Selmer groups associated to hyperelliptic curves
Abstract
We develop refined methods to effectively bound the dimension of Bloch-Kato Selmer groups associated to the higher Chow group CH2(J,1), where J is the Jacobian of a hyperelliptic curve X. This extends the recent work of Dogra on explicit 2-descent for these Selmer groups to include cases where X does not have a rational Weierstrass point. Additionally, we develop methods for obtaining sharper dimension bounds under the assumption that X has good ordinary reduction at 2. As a consequence, we establish new criteria for deducing finiteness of the depth 2 Chabauty-Kim set X(Q2)2, and demonstrate the efficacy of these criteria on curves from the LMFDB.
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