A descent principle for compactly supported extensions of functors
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Publication:6046969
DOI10.2140/akt.2023.8.489arXiv2204.08968OpenAlexW4386202963MaRDI QIDQ6046969
Publication date: 6 September 2023
Published in: Annals of \(K\)-Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2204.08968
Applied homological algebra and category theory in algebraic topology (55U99) Motivic cohomology; motivic homotopy theory (14F42) Grothendieck topologies and Grothendieck topoi (18F10)
Cites Work
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- The \(K\)-theory of assemblers
- The \(K\)-groups of a blow-up scheme and an excess intersection formula
- Algebraic \(K\)-theory and cubical descent
- Sheaves in geometry and logic: a first introduction to topos theory
- Enhancing the filtered derived category
- Riemann-Roch for homotopy invariant \(K\)-theory and Gysin morphisms
- Descent properties of homotopy \(K\)-theory
- An extension criterion for functors defined on smooth schemes
- Homotopy theory of simplicial sheaves in completely decomposable topologies
- Unstable motivic homotopy categories in Nisnevich and cdh-topologies
- Affine representability results in \(\mathbb{A}^1\)-homotopy theory. I: Vector bundles.
- Théorie de Hodge. III
- Hypercovers and simplicial presheaves
- The universal Euler characteristic for varieties of characteristic zero
- Descent, motives and K-theory.
- Differential graded motives: weight complex, weight filtrations and spectral sequences for realizations; Voevodsky versus Hanamura
- The $K$-theory spectrum of varieties
- Higher Topos Theory (AM-170)
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