Restrictions on Weil polynomials of Jacobians of hyperelliptic curves

Publication date

2022

Authors

Costa, Edgar
Donepudi, RaviISNI 0000000518163948
Fernando, Ravi
Karemaker, ValentijnISNI 0000000492896472
Springer, Caleb
West, Mckenzie

Editors

Balakrishnan, Jennifer S.
Elkies, Noam
Hassett, Brendan
Poonen, Bjorn
Sutherland, Andrew
Voight, John

Advisors

Supervisors

Document Type

Part of book
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License

taverne

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.

Keywords

Taverne

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