Genus 3 curves whose Jacobians have endomorphisms by $Q (\zeta _7 +\bar{\zeta}_7 )$, II

Dun Liang; Haohao Wang; J. W. Hoffman; Ryotaro Okazaki; Yukiko Sakai; ZhiBin Liang

arxiv: 1411.2152 · v1 · pith:BJKHCDCDnew · submitted 2014-11-08 · 🧮 math.AG

Genus 3 curves whose Jacobians have endomorphisms by Q (zeta ₇ +bar{zeta}₇ ), II

J. W. Hoffman , Dun Liang , ZhiBin Liang , Ryotaro Okazaki , Yukiko Sakai , Haohao Wang This is my paper

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keywords zetacurvesgenushoffmanmathrmnonhyperellipticpreviouswang

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In this work we consider constructions of genus three curves $X$ such that $\mathrm{End}(\mathrm{Jac} (X))\otimes Q$ contains the totally real cubic number field $Q(\zeta _7 +\bar{\zeta}_7 )$. We construct explicit three-dimensional families whose generic member is a nonhyperelliptic genus 3 curve with this property. The case when $X$ is hyperelliptic was studied in a previous work by Hoffman and Wang and some nonhyperelliptic curves were constructed in a previous paper by Hoffman, Z. Liang. Sakai and Wang.

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Genus 3 curves whose Jacobians have endomorphisms by Q (zeta ₇ +bar{zeta}₇ ), II

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