Quadratic forms and Genus Theory : a link with 2-descent and an application to non-trivial specializations of ideal classes

Author name not available (Why is that?)

Abstract: Genus Theory is a classical feature of integral binary quadratic forms. Using the author's generalization of the well-known correspondence between quadratic form classes and ideal classes of quadratic algebras, we extend it to the case when quadratic forms are twisted and have coefficients in any PID

R

. When

R = m a t h b b K [X]

, we show that the Genus Theory map is the quadratic form version of the

2

-descent map on a certain hyperelliptic curve. As an application, we make a contribution to a question of Agboola and Pappas regarding a specialization problem of divisor classes on hyperelliptic curves. Under suitable assumptions, we prove that the set of non-trivial specializations has density

1

.

Mathematics Subject Classification ID

No records found.

This page was built for publication: Quadratic forms and Genus Theory : a link with 2-descent and an application to non-trivial specializations of ideal classes

Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6506865)