Teaching
Intro to non-abelian Hodge correspondence Master reading Bonn 2022
Lecture Notes
Individual chapters:
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Lecture 1:Character varieties and flat connections
Lecture 2&3:Symplectic geometry and Hamiltonian reduction
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Lecture 4:Atiyah-Bott reduction
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Lecture 5:GIT quotients
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Lecture 6:Stable bundles and Narasimhan-Seshadri theorem
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Lecture 7:Higgs bundles
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Lecture 8&9:Harmonic bundles (and here arehandwritten notes)
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Lecture 10:Hyperkähler geometry
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Lecture 11:Applications and generalizations
Previous teachings
- 2019-2020: L2 exercises for "Differential calculation in R^n", Strasbourg math circle
- 2018-2019: L2 exercises for "Functions of several variables", Strasbourg math circle
- 2017-2018: L1, lecture + exercises "Logic, sets and combinatorics", Strasbourg math circle
- 2016-2017: oral exams at Lycée Kléber in Strasbourg
- 2013-2016: interventions at the discrete mathematics club in Lyon (subjects: elementary and advanced geometry, conics, inequalities, functional equations)