Michael Stoll
Published 2006-03-23Version 1
In this paper, we study bounds for the number of rational points on twists C' of a fixed curve C over a number field K, under the condition that the group of K-rational points on the Jacobian J' of C' has rank smaller than the genus of C'. The main result is that with some explicitly given finitely many possible exceptions, we have a bound of the form 2r + c, where r is the rank of J'(K) and c is a constant depending on C. For the proof, we use a refinement of the method of Chabauty-Coleman; the main new ingredient is to use it for an extension field of K_v, where v is a place of bad reduction for C'.
Comments: 16 pages; to appear in Compositio Math (in a slightly different version)
Journal: Compositio Math. 142, 1201-1214 (2006)
A genus 2 family with 226 sections
The set of non-squares in a number field is diophantine
The Chabauty-Coleman bound at a prime of bad reduction
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