Surfaces of type K3 over number fields and the Mumford-Tate conjecture. II
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Publication:4399932
DOI10.1070/IM1995v059n03ABEH000026zbMath0895.14011OpenAlexW2046264931WikidataQ123269208 ScholiaQ123269208MaRDI QIDQ4399932
Publication date: 30 July 1998
Published in: Izvestiya: Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1070/im1995v059n03abeh000026
(K3) surfaces and Enriques surfaces (14J28) Varieties over global fields (11G35) Arithmetic ground fields for abelian varieties (14K15)
Related Items (10)
Exceptional jumps of Picard ranks of reductions of K3 surfaces over number fields ⋮ On the distribution of the Picard ranks of the reductions of a \(K3\) surface ⋮ Families of motives and the Mumford-Tate conjecture ⋮ Unnamed Item ⋮ INTEGRAL AND ADELIC ASPECTS OF THE MUMFORD–TATE CONJECTURE ⋮ Explicit families of \(K3\) surfaces having real multiplication ⋮ On the component group of the algebraic monodromy group of a \(K3\) surface ⋮ Finiteness theorems for K3 surfaces and abelian varieties of CM type ⋮ Reduction of Brauer classes on K3 surfaces, rationality and derived equivalence ⋮ On uniformity conjectures for abelian varieties and K3 surfaces
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