Finite Weil restriction of curves
Abstract
Given number fields L ⊃ K, smooth projective curves C defined over L and B defined over K, and a non-constant L-morphism h C BL,we consider the curve Ch defined over K whose K-rational points parametrize the L-rational points on C whose images under h are defined over K. Our construction provides a framework which includes as a special case that used in Elliptic Curve Chabauty techniques and their higher genus versions. The set Ch(K) can be infinite only when C has genus at most 1; we analyze completely the case when C has genus 1.
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