Jacobians among Abelian threefolds: a formula of Klein and a question of Serre
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Autores: Gilles Lachaud, Christophe Ritzenthaler
, Alexey Zykin
- Localización: Mathematical research letters, ISSN 1073-2780, Vol. 17, Nº 2-3, 2010, págs. 323-334
- Idioma: inglés
- DOI: 10.4310/mrl.2010.v17.n2.a11
- Enlaces
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Resumen
Let $(A,a)$ be an indecomposable principally polarized abelian threefold defined over a field $k \subset \CC$. Using a certain geometric Siegel modular form $\chi_{18}$ on the corresponding moduli space, we prove that $(A,a)$ is a Jacobian over $k$ if and only if $\chi_{18}(A, a)$ is a square over $k$. This answers a question of J.-P. Serre. Then, via a natural isomorphism between invariants of ternary quartics and Teichm\"uller modular forms of genus $3$, we obtain a simple proof of Klein formula, which asserts that $\chi_{18}(\Jac C, j)$ is equal to the square of the discriminant of $C$.
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