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Towers of 2-covers of hyperelliptic curves |
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| Authors: | Nils Bruin E Victor Flynn |
| Institution: | Department of Mathematics, Simon Fraser University, Burnaby, British Columbia, Canada V5A 1S6 ; Mathematical Institute, University of Oxford, Oxford OX1 3LB, United Kingdom |
| Abstract: | In this article, we give a way of constructing an unramified Galois-cover of a hyperelliptic curve. The geometric Galois-group is an elementary abelian  -group. The construction does not make use of the embedding of the curve in its Jacobian, and it readily displays all subcovers. We show that the cover we construct is isomorphic to the pullback along the multiplication-by- map of an embedding of the curve in its Jacobian. We show that the constructed cover has an abundance of elliptic and hyperelliptic subcovers. This makes this cover especially suited for covering techniques employed for determining the rational points on curves. In particular the hyperelliptic subcovers give a chance for applying the method iteratively, thus creating towers of elementary abelian 2-covers of hyperelliptic curves. As an application, we determine the rational points on the genus |
| Keywords: | Covers of curves hyperelliptic curves rational points descent method of Chabauty |
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curve arising from the question of whether the sum of the first 
fourth powers can ever be a square. For this curve, a simple covering step fails, but a second step succeeds.