Enriques varieties have been defined as higher–dimensional generalizations of Enriques surfaces. Bloch’s conjecture implies that Enriques varieties should have trivial Chow group of zero–cycles. We prove this is the case for all known examples of irreducible Enriques varieties of index larger than 2. The proof is based on results concerning the Chow motive of generalized Kummer varieties
This paper develops families of complex Enriques surfaces whose Brauer groups pull back identically ...
International audienceOn a hyperkähler fourfold X, Bloch's conjecture predicts that any involution a...
Abstract. Let X be a smooth projective variety which is defined over a number field. Beilinson and B...
AbstractWe define Enriques varieties as a higher dimensional generalization of Enriques surfaces and...
We prove an unconditional (but slightly weakened) version of the main result of [13], which was, sta...
We prove an unconditional (but slightly weakened) version of the main result of our earlier paper wi...
In this paper we prove a formula, conjectured by Bloch and Srinivas [S2], which describes the Chow g...
One of the main results of this article is a proof of the rank-one case of an existence conjecture o...
Abstract. In this paper, we compute the Chow group of zero cycles for the quotient of certain Calabi...
To appear in Journal of Differential GeometryInternational audienceCatanese surfaces are regular sur...
We prove that two general Enriques surfaces defined over an algebraically closed field of characteri...
This paper is dedicated to the memory of Kunihiko Kodaira, on the occasion of his centenary Abstract...
We prove that there exists a pencil of Enriques surfaces defined over Q with non-algebraic integral ...
We examine the tangent groups at the identity, and more generally the formal completions at the iden...
The Bloch–Beilinson–Murre conjectures predict the existence of a descending filtration on Chow group...
This paper develops families of complex Enriques surfaces whose Brauer groups pull back identically ...
International audienceOn a hyperkähler fourfold X, Bloch's conjecture predicts that any involution a...
Abstract. Let X be a smooth projective variety which is defined over a number field. Beilinson and B...
AbstractWe define Enriques varieties as a higher dimensional generalization of Enriques surfaces and...
We prove an unconditional (but slightly weakened) version of the main result of [13], which was, sta...
We prove an unconditional (but slightly weakened) version of the main result of our earlier paper wi...
In this paper we prove a formula, conjectured by Bloch and Srinivas [S2], which describes the Chow g...
One of the main results of this article is a proof of the rank-one case of an existence conjecture o...
Abstract. In this paper, we compute the Chow group of zero cycles for the quotient of certain Calabi...
To appear in Journal of Differential GeometryInternational audienceCatanese surfaces are regular sur...
We prove that two general Enriques surfaces defined over an algebraically closed field of characteri...
This paper is dedicated to the memory of Kunihiko Kodaira, on the occasion of his centenary Abstract...
We prove that there exists a pencil of Enriques surfaces defined over Q with non-algebraic integral ...
We examine the tangent groups at the identity, and more generally the formal completions at the iden...
The Bloch–Beilinson–Murre conjectures predict the existence of a descending filtration on Chow group...
This paper develops families of complex Enriques surfaces whose Brauer groups pull back identically ...
International audienceOn a hyperkähler fourfold X, Bloch's conjecture predicts that any involution a...
Abstract. Let X be a smooth projective variety which is defined over a number field. Beilinson and B...
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