Add to ORKGIn despair, as Deligne (2000) put it, of proving the Hodge and Tate conjectures, we can try to find substitutes. For abelian varieties in characteristic zero, Deligne (1982) constructed a theory of Hodge classes having many of the properties that the algebraic classes would have if the Hodge conjecture were known. In this article I investigate whether there exists a theory of “rational Tate classes ” on varieties over finite fields having the properties that the algebraic classes would have if the Hodge and Tate conjectures were known. In particular, I prove that there exists at most one “good ” such theory
Abstract. We construct a family of abelian varieties of CM-type such that the Hodge conjecture holds...
A few typos correctedWe study for rationally connected varieties $X$ the group of degree 2 integral ...
We study base field extensions of ordinary abelian varieties defined over finite fields using the mo...
In this note we discuss some examples of non torsion and non algebraic cohomology classes for variet...
A Lefschetz class on a smooth projective variety is an element of the Q-algebra generated by divisor...
LatexSummary: The Hodge conjecture asks whether rational Hodge classes on a smooth projective manifo...
We survey the history of the Tate conjecture on algebraic cycles. The conjecture is closely related ...
This paper addresses several questions related to the Hodge conjecture. First of all we consider the...
The aim of global class field theory is the description of abelian extensions of a finitely generate...
AbstractThe Hodge conjecture implies decidability of the question whether a given topological cycle ...
One of the main results of this article is a proof of the rank-one case of an existence conjecture o...
Abstract. We prove the existence of rational points on singular varieties over finite fields aris-in...
We combine Deligne's global invariant cycle theorem, and the algebraicity theorem of Cattani, Delign...
In this seminar we will prove one theorem: Theorem [HT] (T. Honda and J. Tate). Fix a finite field K...
Various questions related to birational properties of algebraic varieties are concerned. Rationally ...
Abstract. We construct a family of abelian varieties of CM-type such that the Hodge conjecture holds...
A few typos correctedWe study for rationally connected varieties $X$ the group of degree 2 integral ...
We study base field extensions of ordinary abelian varieties defined over finite fields using the mo...
In this note we discuss some examples of non torsion and non algebraic cohomology classes for variet...
A Lefschetz class on a smooth projective variety is an element of the Q-algebra generated by divisor...
LatexSummary: The Hodge conjecture asks whether rational Hodge classes on a smooth projective manifo...
We survey the history of the Tate conjecture on algebraic cycles. The conjecture is closely related ...
This paper addresses several questions related to the Hodge conjecture. First of all we consider the...
The aim of global class field theory is the description of abelian extensions of a finitely generate...
AbstractThe Hodge conjecture implies decidability of the question whether a given topological cycle ...
One of the main results of this article is a proof of the rank-one case of an existence conjecture o...
Abstract. We prove the existence of rational points on singular varieties over finite fields aris-in...
We combine Deligne's global invariant cycle theorem, and the algebraicity theorem of Cattani, Delign...
In this seminar we will prove one theorem: Theorem [HT] (T. Honda and J. Tate). Fix a finite field K...
Various questions related to birational properties of algebraic varieties are concerned. Rationally ...
Abstract. We construct a family of abelian varieties of CM-type such that the Hodge conjecture holds...
A few typos correctedWe study for rationally connected varieties $X$ the group of degree 2 integral ...
We study base field extensions of ordinary abelian varieties defined over finite fields using the mo...