Restrictions on Weil polynomials of Jacobians of hyperelliptic curves
Publication date
2022
Editors
Balakrishnan, Jennifer S.
Elkies, Noam
Hassett, Brendan
Poonen, Bjorn
Sutherland, Andrew
Voight, John
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Part of book
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Abstract
Inspired by experimental data, this paper investigates which isogeny classes of abelian varieties defined over a finite field of odd characteristic contain the Jacobian of a hyperelliptic curve. We provide a necessary condition by demonstrating that the Weil polynomial of a hyperelliptic Jacobian must have a particular form modulo 2. For fixed ${g\geq1}$, the proportion of isogeny classes of $g$ dimensional abelian varieties defined over $\mathbb{F}_q$ which fail this condition is $1 - Q(2g + 2)/2^g$ as $q\to\infty$ ranges over odd prime powers, where $Q(n)$ denotes the number of partitions of $n$ into odd parts.
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Citation
Costa, E, Donepudi, R, Fernando, R, Karemaker, V, Springer, C & West, M 2022, Restrictions on Weil polynomials of Jacobians of hyperelliptic curves. in J S Balakrishnan, N Elkies, B Hassett, B Poonen, A Sutherland & J Voight (eds), Arithmetic Geometry, Number Theory, and Computation. 1 edn, Simons Symposia, Springer, pp. 259–276. https://doi.org/10.1007/978-3-030-80914-0_7