Add to ORKGWe discuss a range of ways, extending existing methods, to demonstrate violations of the Hasse principle on curves. Of particular interest are curves which contain a rational divisor class of degree 1, even though they contain no rational point. For such curves we construct new types of examples of violations of the Hasse principle which are due to the Brauer-Manin obstruction, subject to the conjecture that the Tate-Shafarevich group of the Jacobian is finite
Given a smooth projective geometrically connected variety X over a number field k, we say that X fai...
Let F be a finite field and C, D smooth, geometrically irreducible, proper curves over F and set K ...
International audienceA powerful method pioneered by Swinnerton-Dyer allows one to study rational po...
We discuss a range of ways, extending existing methods, to demonstrate violations of the Hasse princ...
In this thesis, we study the Hasse principle for curves and K3 surfaces. We give several sufficient ...
In [19], Manin introduced a way to explain the failure of the Hasse principle for algebraic varietie...
We wish to give a short elementary proof of S. Saito\u27s result that the Brauer-Manin obstruction f...
We wish to give a short elementary proof of S. Saito's result that the Brauer-Manin obstruction for ...
Abstract. We conjecture that if C is a curve of genus> 1 over a number field k such that C(k) = ...
Borrowing from a classical construction for counterexamples to the Hasse principle, we show that for...
After fixing numerical invariants such as dimension, it is natural to ask which birational classes o...
17 pagesInternational audienceWe construct a smooth and projective surface over an arbitrary number ...
17 pagesInternational audienceWe construct a smooth and projective surface over an arbitrary number ...
After fixing numerical invariants such as dimension, it is natural to ask which birational classes o...
The existence of rational points on the Kummer variety associated to a 22-covering of an abelian var...
Given a smooth projective geometrically connected variety X over a number field k, we say that X fai...
Let F be a finite field and C, D smooth, geometrically irreducible, proper curves over F and set K ...
International audienceA powerful method pioneered by Swinnerton-Dyer allows one to study rational po...
We discuss a range of ways, extending existing methods, to demonstrate violations of the Hasse princ...
In this thesis, we study the Hasse principle for curves and K3 surfaces. We give several sufficient ...
In [19], Manin introduced a way to explain the failure of the Hasse principle for algebraic varietie...
We wish to give a short elementary proof of S. Saito\u27s result that the Brauer-Manin obstruction f...
We wish to give a short elementary proof of S. Saito's result that the Brauer-Manin obstruction for ...
Abstract. We conjecture that if C is a curve of genus> 1 over a number field k such that C(k) = ...
Borrowing from a classical construction for counterexamples to the Hasse principle, we show that for...
After fixing numerical invariants such as dimension, it is natural to ask which birational classes o...
17 pagesInternational audienceWe construct a smooth and projective surface over an arbitrary number ...
17 pagesInternational audienceWe construct a smooth and projective surface over an arbitrary number ...
After fixing numerical invariants such as dimension, it is natural to ask which birational classes o...
The existence of rational points on the Kummer variety associated to a 22-covering of an abelian var...
Given a smooth projective geometrically connected variety X over a number field k, we say that X fai...
Let F be a finite field and C, D smooth, geometrically irreducible, proper curves over F and set K ...
International audienceA powerful method pioneered by Swinnerton-Dyer allows one to study rational po...