NB. *All lectures will take place in Amphithéâtre Hermite.
MONDAY
10h00-11h00 Café and Registration
11h00-12h00 János Kollár: A local version of the Kawamata-Viehweg vanishing theorem.
Lunch
14h00-15h00 Jun-Muk Hwang: Deformation of the space of lines on the 5-dimensional hyperquadric.
15h15-16h15 Christian Peskine: The k-secant lemma, a vanishing theorem, and related conjectures
Coffee
16h45-17h45 Frédéric Campana: Birational stability of the cotangent bundle, and orbifold rational curves.
TUESDAY
09h30-10h30 Brendan Hasset: Constructing rational curves on K3 surfaces.
Coffee
11h00-12h00 Patrick Brosnan: Zero loci of admissible normal functions.
Lunch
14h00-15h00 Christian Pauly: On the monodromy of the Hitchin connection.
15h15-16h15 Jason Starr: Families of abelian varieties over a higher-dimensional base.
Coffee
16h45-17h45 Tomaso de Fernex: The valuation space of an isolated normal singularity.
WEDNESDAY
09h30-10h30 Jean-Pierre Demailly: Holomorphic Morse inequalities and the Green-Griffiths-Lang conjecture.
Coffee
11h00-12h00 Rahul Pandharipande: Algebraic cobordism of varieties and bundles.
Lunch
14h00-15h00 Yongbin Ruan: Landau-Ginzburg/Calabi-Yau Correspondence.
15h15-16h15 Davesh Maulik: Quantum cohomology of framed sheaves.
Coffee
16h45-17h45 Radu Laza: Notes on the compactification of the moduli space of polarized K3 surfaces.
THURSDAY
09h30-10h30 Michel Brion: Homogeneous bundles over abelian varieties
Coffee
11h00-12h00 Lucia Caporaso: Tropical and algebraic curves: comparing their moduli spaces.
Lunch
14h00-15h00 Nicolas Perrin: On the quantum K-theory of homogeneous spaces.
15h15-16h15 Pierre-Emmanuel Chaput: Littlewood-Richardson rule for minuscule Schubert calculus.
Coffee
16h45-17h45 Ravi Vakil: The ring of invariants of n points on the projective line.
18h15 Reception
FRIDAY
9h15-10h15 Robert Lazarsfeld: Positivity of cycles on abelian varieties.
Coffee
10h45-11h45 Mihai Paun: Skoda division theorem and metrics with minimal singularities
12h-13h Fabrizio Catanese: A characterization of varieties whose universal cover is a polydisk or a bounded symmetric domain of tube type