Computing Schneider p-adic heights on hyperelliptic Mumford curves
Enis Kaya
Abstract: There are several definitions of p-adic height pairings on curves in the literature, and algorithms for computing them play a crucial role in, for example, carrying out the quadratic Chabauty method, which is a p-adic method that attempts to determine rational points on curves of genus at least two.
The $p$-adic height pairing constructed by Peter Schneider in $1982$ is particularly important because the corresponding $p$-adic regulator fits into $p$-adic versions of Birch and Swinnerton-Dyer conjecture. In this talk, we present an algorithm to compute the Schneider $p$-adic height pairing on hyperelliptic Mumford curves. We illustrate this algorithm with a numerical example computed in the computer algebra system SageMath.
This talk is based on a joint work in progress with Marc Masdeu, J. Steffen Müller and Marius van der Put.
algebraic geometrynumber theory
Audience: researchers in the topic
Comments: Zoom Meeting ID: 856 1386 0958 Passcode: 513992
FGC-HRI-IPM Number Theory Webinars
Series comments: password is 848084
| Organizers: | Özlem Ejder*, Aprameyo Pal |
| Curator: | Abbas Maarefparvar* |
| *contact for this listing |