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# Previous Ateliers:
[2015 (Bordeaux)](Atelier%202015),
[2016 (Grenoble)](Atelier%202016),
[2017 (Lyon)](Atelier%202017)
[2017b (Clermont-Ferrand)](Atelier%202017b)
[2017c (Oujda)](Atelier%202017c)
[2018 (Besançon)](Atelier%202018)
[2018b (Roma)](Atelier%202018b)
[2019 (Bordeaux)](Atelier%202019)
[2019b (Roma)](Atelier%202019b)
[2020 (Grenoble)](Atelier%202020)
[2021b (Oujda)](Atelier%202021b)
[2022 (Besançon)](Atelier%202022)
[2023 (CIRM)](Atelier%202023)
[2024 (Lyon)](Atelier%202024)

# [Welcome to Atelier PARI/GP 2024 (Lyon)](http://pari.math.u-bordeaux.fr/Events/PARI2024/)

[Doctesting](doc2024)
# [Welcome to Atelier PARI/GP 2024b (Lyon)](http://pari.math.u-bordeaux.fr/Events/PARI2024b/)

- François: modular abelian varieties, Q-curves associated to newforms
- Bernadette: algebraic number theory
- Fabrice: fast computation of class groups
- Pierrick: doctesting
- Arthur: tutorials
- Wessel: CVP, lattice reduction
- Jean: Picard group of curves
- Nicolas: algebraic curves libpari
- Andreas: partial ECPP certificates, class polynomials by CRT
- Olivier: doctesting, lattices
- Sophie: tutorials algebraic number theory, finite fields
- Rob: curves of low genus or hyperell, p-adic extensions
- Pascal: mf package (bug)
- Henri: Riemann-Siegel formula, continued fractions, Monsky's mock Heegner points
- Abbas: tutorials
- Benjamin: central simple algebras
- Alice: lattices and norm relations
- Leo: p-adic field extensions
- Francesco: facto and resultants of polys
- Thibaut: basic GP
- Mickaël: central simple algebras, bugs
- Marine: doctesting
- Xavier: debugging
- Jean-Robert: abelian fields, doctesting
- Ayoub: capitulation problems
- Rafik: tutorials
- Bill: helping around
- Aurel: helping around, lattice algorithms
- Lorenzo: Exercises, continued fractions
- Bernadette: Exercices (algebraic number theory), Thue equations
- Federico: Exercises (ANT, Galois theory)
- Pip: Exercises (ANT), class field theory, modular forms
- Jessica: Exercises (ANT, Galois theory), elliptic curves
- Safia: Algebraic number theory, Polya quadratic fields, subgroups of class
  groups
- Suman: Algebraic number theory, exercises (ANT, ramification)
- Roslan: Linear algebra, algebraic number theory, class field theory (future:
  S-class groups)
- Luca,Nicola,Francesco: Weil height for projective spaces: implemented! (need
  tests, reduce factorisation)