arXiv:math/0201311 Abstract

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On the nonexistence of certain curves of genus two

Published 2002-01-31Version 1

We prove that if q is a power of an odd prime then there is no genus-2 curve over F_q whose Jacobian has characteristic polynomial of Frobenius equal to x^4 + (2-2q)x^2 + q^2. Our proof uses the Brauer relations in a biquadratic extension of Q to show that every principally polarized abelian surface over F_q with the given characteristic polynomial splits over F_{q^2} as a product of polarized elliptic curves.

Comments: LaTeX, 13 pages

Journal: Compos. Math. 140 (2004) 581--592

DOI: 10.1112/S0010437X03000757

Categories: math.NT, math.AG

Subjects: 11G20, 11G10, 11R65, 14G15, 14H25

Keywords: nonexistence, characteristic polynomial splits, polarized elliptic curves, frobenius equal, principally polarized abelian surface

Tags: journal article

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On the nonexistence of certain curves of genus two

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On the nonexistence of certain curves of genus two

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