Computing rational points on rank 0 genus 3 hyperelliptic curves
Abstract
We compute rational points on genus 3 odd degree hyperelliptic curves C over Q that have Jacobians of Mordell-Weil rank 0. The computation applies the Chabauty-Coleman method to find the zero set of a certain system of p-adic integrals, which is known to be finite and include the set of rational points C(Q). We implemented an algorithm in Sage to carry out the Chabauty-Coleman method on a database of 5870 curves.
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