2019
DOI: 10.1093/imrn/rny303
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Arithmetic of Rational Points and Zero-cycles on Products of Kummer Varieties and K3 Surfaces

Abstract: Let k be a number field. In the spirit of a result by Yongqi Liang, we relate the arithmetic of rational points over finite extensions of k to that of zero-cycles over k for Kummer varieties over k. For example, for any Kummer variety X over k, we show that if the Brauer-Manin obstruction is the only obstruction to the Hasse principle for rational points on X over all finite extensions of k, then the (2-primary) Brauer-Manin obstruction is the only obstruction to the Hasse principle for zero-cycles of any give… Show more

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Cited by 8 publications
(3 citation statements)
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“…In this short note we refine the arguments appearing in [I] by using some recent results of Cadoret and Charles about uniform boundedness of Brauer groups [CC], in order to generalise the main results of [I] and [BN]. In particular, besides having somewhat wider applicability our results allow us to remove the restriction that δ is odd that appears in [BN,Thm. 1.1].…”
Section: Introductionmentioning
confidence: 72%
See 1 more Smart Citation
“…In this short note we refine the arguments appearing in [I] by using some recent results of Cadoret and Charles about uniform boundedness of Brauer groups [CC], in order to generalise the main results of [I] and [BN]. In particular, besides having somewhat wider applicability our results allow us to remove the restriction that δ is odd that appears in [BN,Thm. 1.1].…”
Section: Introductionmentioning
confidence: 72%
“…It suffices to show that Γ k and Γ k ′ have the same image in Aut(Br(X)[ℓ m ]) for any ℓ dividing n and any integer m. Fix ℓ dividing n. Since k ′ is linearly disjoint from M, it follows that Γ k and Γ k ′ have the same image in Aut(Br(X) [n]) and so a fortiori in Aut(Br(X) [ℓ]). We can now proceed as in the last part of the proof of [BN,Lem. 4.2], once we justify that ker(Aut(Br(X)[ℓ m ]) → Aut(Br(X)[ℓ])) is an ℓ-group.…”
Section: Remarkmentioning
confidence: 98%
“…Remark 5.7. By using [BN21], one can also consider the more general case of torsors under arbitrary finite products of (twisted) Kummer varieties, K3 surfaces, and geometrically rationally connected varieties over some number field.…”
Section: (Twisted) Kummer Varieties As Torsorsmentioning
confidence: 99%