• Tags
  • #arithmetic-geometry
• Refs:
  • chrome-extension://ieepebpjnkhaiioojkepfniodjmjjihl/data/pdf.js/web/viewer.html?file=http%3A%2F%2Findividual.utoronto.ca%2Fgroechenig%2Farithmetic_techniques.pdf #resources/notes/lectures #resources/full-courses
  • https://people.maths.ox.ac.uk/brantner/p-adic.pdf #resources/notes
  • p-adic Lie groups:
    • https://link.springer.com/book/10.1007/978-3-642-21147-8 #resources/books
    • Lazard (in French!!) https://mathweb.ucsd.edu/~csorense/teaching/math299_LieB/lazard.pdf #resources/papers
    • Banach space reps: https://mathweb.ucsd.edu/~csorense/teaching/math299_LieB/banach_iwasawa.pdf #resources/course-notes
• Links:
  • rational point
  • Hodge decomposition
  • p-adic Hodge theory
  • spreading out
  • Unsorted/section conjecture
  • spec Z as a curve
  • Unsorted/number field function field analogy
  • Unsorted/roots of unity
  • Unsorted/separably generated
  • Unsorted/local to global
  • Unsorted/Frobenius twist

arithmetic geometry

Idea: study schemes of finite type $X\in {\mathsf{Sch}}^{\mathrm{ft}}_{/ {S}} $ over \(S = \operatorname{Spec}{\mathcal{O}}_K\) the ring of integers of a number field.

Standard setup:

Main topics

• Finding rational points on curves.
• Using p-adic,
• The Hasse-Minkowski theorem,
• The Riemann-Roch theorem for curves.\
• Mordell’s theorem,
• The Weil conjectures,
• Jacobian varieties,
• Faltings theorem: \({\sharp}X({\mathbf{Q}})< \infty\)
• Hodge theory MOC, more specifically p-adic Hodge theory
• rigid analytic geometry
• formal schemes

Rational Points

• Faltings height
• Northcott property
• Jacobian
• Mordell conjecture
• Vojta’s inequality
• Mumford’s inequality
• Mordell-Lang coonjecture

Cohomology

• etale cohomology
• Crystalline cohomology
• algebraic de Rham cohomology
• prismatic cohomology
• Hodge-Tate cohomology