On the number of curves of genus 2 over a finite field |
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Authors: | Gabriel Cardona |
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Institution: | Dept. Ciències Matemàtiques i Informàtica, Universitat de les Illes Balears, Ed. Anselm Turmeda, Campus UIB. Carretera Valldemossa, km. 7.5, E-07122–Palma de Mallorca, Spain |
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Abstract: | In this paper we compute the number of curves of genus 2 defined over a finite field k of odd characteristic up to isomorphisms defined over k; the even characteristic case is treated in an ongoing work (G. Cardona, E. Nart, J. Pujolàs, Curves of genus 2 over field of even characteristic, 2003, submitted for publication). To this end, we first give a parametrization of all points in
, the moduli variety that classifies genus 2 curves up to isomorphism, defined over an arbitrary perfect field (of zero or odd characteristic) and corresponding to curves with non-trivial reduced group of automorphisms; we also give an explicit representative defined over that field for each of these points. Then, we use cohomological methods to compute the number of k-isomorphism classes for each point in
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Keywords: | Finite fields Genus 2 curves Twists of curves |
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