Journal article

The group law on the jacobian of a curve of genus 2

Abstract:: An explicit description is given of the group law on the Jacobian of a curve C of genus 2. The Kummer surface provides a useful intermediary stage; bilinear forms relating to the Kummer surface imply that the global group law may be given projectively by biquadratic forms defined over the same ring as the coefficients of C. It is not assumed that C has a rational Weierstrass point, and the theory presented applies over an arbitrary ground field.

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APA Style

Flynn, E. (1993). The group law on the jacobian of a curve of genus 2.

MLA Style

Flynn, E. The Group Law on the Jacobian of a Curve of Genus 2. 1993.

Chicago Style

Flynn, E. 1993. The Group Law on the Jacobian of a Curve of Genus 2.
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+ Flynn, E More by this author

Role:: Author

Publication date:: 1993-01-01

UUID:: uuid:b3948028-34c3-445c-abfe-d093e5fd1d4b
Local pid:: oai:eprints.maths.ox.ac.uk:271
Deposit date:: 2011-05-19
ARK identifier:: ark:/29072/ora_b394802834c3445cabfed093e5fd1d4b

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Copyright date:: 1993

Licence:: Terms and Conditions of Use for Oxford University Research Archive

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