Add to ORKGIn these lectures, I will firstly discuss diverse properties of the invariant h0θ and of its extensions to certain infinite dimensional generalizations of Euclidean lattices. Then I will present applications of this formalism to transcendence theory and to algebraization theorems in Diophantine geometry
This volume offers an introduction, in the form of four extensive lectures, to some recent developme...
Inter-universal Teichmüller theory may be described as a sort of arithmetic version of Teichmüller...
Inter-universal Teichmüller theory may be described as a sort of arithmetic version of Teichmüller...
In the classical analogy between number fields and function fields, an Euclidean lattice (E,∥.∥) may...
: La théorie géométrique des invariants constitue un domaine central de la géométrie algébrique d'au...
This book presents the most up-to-date and sophisticated account of the theory of Euclidean lattices...
Geometric invariant theory is a central subject in nowadays' algebraic geometry : developed by Mumfo...
Abstract: We show that the Ashtekar-Isham extension j// ^ of the configuration space of Yang-Mills t...
This is an introductory expository lecture of elementary level. We start with a brief overview of so...
I argue that the complete partition function of 3D quantum gravity is given by a path integral over ...
We construct generalised diffeomorphisms for E9 exceptional field theory. The trans- formations, whi...
In 1984 Jones discovered a polynomial invariant of knots, which resembled none of the formerly known...
We construct generalised diffeomorphisms for E9 exceptional field theory. The trans- formations, whi...
Invariants topologiques quantiques non semi-simples. La théorie des nœuds (courbes simples plongées ...
Invariants topologiques quantiques non semi-simples. La théorie des nœuds (courbes simples plongées ...
This volume offers an introduction, in the form of four extensive lectures, to some recent developme...
Inter-universal Teichmüller theory may be described as a sort of arithmetic version of Teichmüller...
Inter-universal Teichmüller theory may be described as a sort of arithmetic version of Teichmüller...
In the classical analogy between number fields and function fields, an Euclidean lattice (E,∥.∥) may...
: La théorie géométrique des invariants constitue un domaine central de la géométrie algébrique d'au...
This book presents the most up-to-date and sophisticated account of the theory of Euclidean lattices...
Geometric invariant theory is a central subject in nowadays' algebraic geometry : developed by Mumfo...
Abstract: We show that the Ashtekar-Isham extension j// ^ of the configuration space of Yang-Mills t...
This is an introductory expository lecture of elementary level. We start with a brief overview of so...
I argue that the complete partition function of 3D quantum gravity is given by a path integral over ...
We construct generalised diffeomorphisms for E9 exceptional field theory. The trans- formations, whi...
In 1984 Jones discovered a polynomial invariant of knots, which resembled none of the formerly known...
We construct generalised diffeomorphisms for E9 exceptional field theory. The trans- formations, whi...
Invariants topologiques quantiques non semi-simples. La théorie des nœuds (courbes simples plongées ...
Invariants topologiques quantiques non semi-simples. La théorie des nœuds (courbes simples plongées ...
This volume offers an introduction, in the form of four extensive lectures, to some recent developme...
Inter-universal Teichmüller theory may be described as a sort of arithmetic version of Teichmüller...
Inter-universal Teichmüller theory may be described as a sort of arithmetic version of Teichmüller...