Talk

This is the first of the two talks that will be given in this seminar. It is an attempt to understand the work of
Bhargav Bhatt and Peter Scholze.  We will discuss the motivations and give an overview of p-adic Hodge
theory. In the process, we will introduce some of the basic notions such as delta-rings, Witt vectors, 
prisms and prismatic site.
 

Compact translation surfaces are intimately linked to the geometry
of Teichmüller spaces and the billiard dynamics in rational polygons.
During this is two week mini-course (4 x 2h30) our aim is to introduce
translation surfaces of infinite type (that is non-compact) both through
geometric and dynamical points of view.

We will first present several examples that motivate the study of
translation surfaces of infinite type, in particular several models
of billiards. The next lectures will go through the topological,

Compact translation surfaces are intimately linked to the geometry
of Teichmüller spaces and the billiard dynamics in rational polygons.
During this is two week mini-course (4 x 2h30) our aim is to introduce
translation surfaces of infinite type (that is non-compact) both through
geometric and dynamical points of view.

We will first present several examples that motivate the study of
translation surfaces of infinite type, in particular several models
of billiards. The next lectures will go through the topological,

One powerful tool in the study of rational solutions to equations comes from various theories of fundamental groups of varieties, most notably the etale fundamental group developed by Alexander Grothendieck. In this talk, we will outline how one can apply such algebro-topological tools to the determination of solutions to equations, both in terms of Grothendieck's famous Section Conjecture and (time permitting) the non-abelian Chabauty method of Minhyong Kim.

In 1986, Kato and Kuzumaki stated a set of conjectures which aimed at giving a Diophantine characterization of the cohomological dimension of fields in terms of Milnor K-theory and points on projective hypersurfaces of small degree. Those conjectures are known to be wrong in general.
In this talk, we will prove a variant of Kato and Kuzumaki's conjectures in which projective hypersurfaces of small degree are replaced by homogeneous spaces. This is joint work with Giancarlo Lucchini Arteche.