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Naomi Sweeting - On the Bloch–Kato Conjecture for some four-dimensional symplectic Galois (...)
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Classroom Contents
Arithmetic and Diophantine Geometry via Ergodic Theory and O-Minimality
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- 1 Yunqing Tang - The Arithmetic of Power Series and Applications to Irrationality
- 2 François Charles - Integral points and affineness in Arakelov geometry
- 3 Javier Fresán - Infinitely Many Non-hypergeometric Local Systems
- 4 Philipp Habegger - The Dynamical Schinzel-Zassenhaus Conjecture and the Transfinite Diameter (...)
- 5 Laura Demarco - Elliptic surfaces, Equidistribution, and Bifurcations
- 6 Benjamin Bakker - Baily-Borel Compactifications of Period Images and the b-semiampleness Conjecture
- 7 David Urbanik - Applications of Unlikely Intersections to Integral Geometry
- 8 Gregorio Baldi - A Tribute to Emmanuel's Contributions to the Zilber–Pink Conjecture
- 9 Hee Oh - Determinant Values on Irrational Lattices
- 10 Uri Bader - Higher property T, Banach Representations and Applications
- 11 Yves Benoist - Convolution and Square on Abelian Groups
- 12 Xinyi Yuan - A Quantitative Version of the Uniform Mordell Conjecture
- 13 Shouwu Zhang - Heights of Ceresa and Gross-Schoen Cycles
- 14 Wei Zhang - Proportionality and the arithmetic volumes of Shimura varieties and the moduli of (...)
- 15 Naomi Sweeting - On the Bloch–Kato Conjecture for some four-dimensional symplectic Galois (...)
- 16 Fabrizio Andreatta - On two mod p period maps: Ekedahl--Oort and fine Deligne--Lusztig (...)
- 17 Anna Cadoret - Tate locus - conjectures and results
- 18 Philippe Michel - A split version of the mixing conjecture and applications
- 19 Laura Demarco - Elliptic surfaces, Equidistribution, and Bifurcations
