Segre Embedding of P1 × P1: Exercises and Explanations
Authors/Creators
Description
In this paper, we explore the Segre embedding of P1 × P1 into projec-
tive space P3. We provide a detailed examination of its algebraic structure
and geometric properties, showing how this embedding produces a quadric
hypersurface defined by the relation X0X3 = X1X2. We extend this clas-
sical construction to the setting of Berkovich spaces over non-Archimedean
fields, allowing for analytical interpretations in p-adic contexts. Further-
more, we introduce θ-slopes as a tool for analyzing stability conditions and
establish connections to Connes-Kreimer algebra through tree structures
and filtrations. This synthesis of algebraic geometry, non-Archimedean
analysis, and representation theory offers new insights into the geometry
of projective varieties and their analytical counterparts
Files
main.pdf
Files
(277.5 kB)
| Name | Size | Download all |
|---|---|---|
|
md5:20aff754ac72a29f878c9c3b164858a6
|
277.5 kB | Preview Download |
Additional details
Related works
- Continues
- Preprint: 10.5281/zenodo.15094922 (DOI)
Software
- Repository URL
- https://bitbucket.org/oreno-ie/zariskiinthetropics/src/coq/