Zero-cycles on self-products of surfaces: some new examples verifying Voisin’s conjecture

Laterveer, Robert

doi:10.1007/s12215-018-0367-5

Cited by 5 publications

(4 citation statements)

References 39 publications

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“…(of Corollary 1.3.) As Voisin had already remarked [28, Corollary 3.5.1], this is implied by the truth of Conjecture 1.1 for X (the implication can be seen using the Bloch-Srinivas argument [4]; this is explained in detail in [18,Corollary 2.7]).…”

Section: The Proofmentioning

confidence: 75%

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Zero-cycles on self-products of varieties: some elementary examples verifying Voisin's conjecture

Laterveer

2020

Preprint

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Section: The Proofmentioning

confidence: 75%

“…Examples of surfaces of geometric genus 1 verifying the conjecture (or a variant conjecture) are given in [28], [12], [14], [15], [30]. Examples of other varieties verifying the conjecture are given in [28], [18], [13], [16], [17], [19], [2], [20], [27], [5].…”

Section: Introductionmentioning

confidence: 99%

Zero-cycles on self-products of varieties: some elementary examples verifying Voisin's conjecture

Laterveer

2020

Preprint

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“…There are few examples in which Conjecture 1 has been verified (see [Voi96], [Lat16c], [Lat18b], [Lat16a]), but it is still open for a general K3 surface. There are some examples in which a generalization of this conjecture for surfaces with geometric genus greater than one is true (see [Lat18a], [Lat19]). There is also an analogous version of the conjecture for higher dimensional varieties, which is studied in [Voi96], [Lat16b], [Lat17], [Lat18c], [BLP17], [LV17], [Via18], [Bur18].…”

Section: Introductionmentioning

confidence: 99%

Algebraic cycles on Todorov surfaces of type $(2,12)$

Zangani¹

2019

Preprint

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We focus on Voisin's conjecture on 0-cycles on the self-product of surfaces of geometric genus one, which arises in the context of the Bloch-Beilinson filtration conjecture. We verify this conjecture for the family of Todorov surfaces of type (2, 12), giving an explicit description of this family as quotient surfaces of the complete intersection of four quadrics in P 6 . We give some motivic applications.

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“…As for geometric genus 1, Voisin's conjecture is still open for a general K3 surface; examples of surfaces of geometric genus 1 verifying the conjecture are given in [33], [15], [17], [18]. Examples of surfaces with geometric genus strictly larger than 1 verifying the conjecture are given in [21]. One can also formulate versions of conjecture 1.1 for higher-dimensional varieties; this is studied in [33], [16], [19], [20], [3], [22], [32], [6].…”

Section: Introductionmentioning

confidence: 99%