A local to global principle for higher zero-cycles
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Publication:2212668
DOI10.1016/j.jnt.2020.06.011zbMath1460.14016arXiv1903.05184OpenAlexW3042445943MaRDI QIDQ2212668
Publication date: 24 November 2020
Published in: Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1903.05184
Cites Work
- A restriction isomorphism for cycles of relative dimension zero
- Zero cycles on fibrations over a curve of arbitrary genus
- Duality via cycle complexes
- On motivic cohomology with \(\mathbb{Z}/l\)-coefficients
- A restriction isomorphism for zero-cycles with coefficients in Milnor \(K\)-theory
- Cohomological Hasse principle and motivic cohomology for arithmetic schemes
- Motivic cohomology over Dedekind rings
- Motivic homology and class field theory over \(p\)-adic fields
- Some observations on motivic cohomology of arithmetic schemes
- \(\ell \)-adic class field theory for regular local rings
- Torsion dans le groupe de Chow de codimension deux
- Unramified class field theory of arithmetical schemes
- Algebraic cycles and higher K-theory
- On the Chow groups of certain rational surfaces: a sequel to a paper of S. Bloch
- Milnor \(K\)-theory is the simplest part of algebraic \(K\)-theory
- Kato homology of arithmetic schemes and higher class field theory over local fields
- Algebraic K-theory and classfield theory for arithmetic surfaces
- The arithmetic of the Chow group of zero-cycles
- Unramified class field theory of arithmetical surfaces
- Algebraization for zero-cycles and the \(p\)-adic cycle class map
- Étale duality for constructible sheaves on arithmetic schemes
- Seminar of algebraic geometry du Bois-Marie 1963--1964. Topos theory and étale cohomology of schemes (SGA 4). Vol. 1: Topos theory. Exp. I--IV
- Bertini theorems and Lefschetz pencils over discrete valuation rings, with applications to higher class field theory
- Poitou–Tate duality for arithmetic schemes
- Milnor 𝐾-theory of local rings with finite residue fields
- A Hasse principle for two dimensional global fields.
- HIGHER IDELES AND CLASS FIELD THEORY
- p-adic étale Tate twists and arithmetic duality☆
- Hasse principles for higher-dimensional fields
- On the fibration method for zero-cycles and rational points
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