EULER CLASSES: SIX-FUNCTORS FORMALISM, DUALITIES, INTEGRALITY AND LINEAR SUBSPACES OF COMPLETE INTERSECTIONS
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Publication:5882457
DOI10.1017/S147474802100027XMaRDI QIDQ5882457
Tom Bachmann, Kirsten Wickelgren
Publication date: 16 March 2023
Published in: Journal of the Institute of Mathematics of Jussieu (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2002.01848
Homology of classifying spaces and characteristic classes in algebraic topology (55R40) Motivic cohomology; motivic homotopy theory (14F42) Algebraic cycles and motivic cohomology ((K)-theoretic aspects) (19E15)
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Arithmetic inflection formulae for linear series on hyperelliptic curves ⋮ Euler characteristics of homogeneous and weighted-homogeneous hypersurfaces ⋮ On quadratically enriched excess and residual intersections ⋮ Bézoutians and the \(\mathbb{A}^1\)-degree ⋮ Computing \(\mathbb{A}^1\)-Euler numbers with Macaulay2 ⋮ Conics meeting eight lines over perfect fields ⋮ Trace maps in motivic homotopy and local terms
Uses Software
Cites Work
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- The six operations in equivariant motivic homotopy theory
- \(\mathbb A^1\)-algebraic topology over a field
- Abundance of 3-planes on real projective hypersurfaces
- Push-forwards for Witt groups of schemes
- Trivial Witt groups of flag varieties
- Fundamental classes in motivic homotopy theory
- The moment map and equivariant cohomology
- An algebraic formula for the degree of a \(C^\infty\) map germ. Sur une inegalite a la Minkowski pour les multiplicites
- On the variety of linear spaces contained in a complete intersection
- Localization of virtual classes
- Grothendieck duality and base change
- Enhancing the filtered derived category
- Some remarks on units in Grothendieck-Witt rings
- The class of Eisenbud-Khimshiashvili-Levine is the local \(\mathbb{A}^1\)-Brouwer degree
- \(A^1\)-representability of hermitian \(K\)-theory and Witt groups
- On the integral Hodge conjecture for real varieties. I
- Hermitian K-theory for stable \(\infty\)-categories. I: Foundations
- Motivic Gauss-Bonnet formulas
- The trace of the local \(\mathbb{A}^1\)-degree
- Aspects of enumerative geometry with quadratic forms
- An arithmetic enrichment of Bézout's theorem
- Motivic infinite loop spaces
- Real cohomology and the powers of the fundamental ideal in the Witt ring
- Intrinsic signs and lower bounds in real algebraic geometry
- The stable \(\mathbb{A}^1\)-connectivity theorems
- Geometric models for higher Grothendieck-Witt groups in \(\mathbb A^1\)-homotopy theory
- Residues and duality. Lecture notes of a seminar on the work of A. Grothendieck, given at Havard 1963/64. Appendix: Cohomology with supports and the construction of the \(f^!\) functor by P. Deligne
- Complexe cotangent et déformations. I. (The cotangent complex and deformations. I.)
- The Mayer-Vietoris principle for Grothendieck-Witt groups of schemes
- 3264 and All That
- Comparing Euler Classes
- The generalized slices of Hermitian K ‐theory
- SL-oriented cohomology theories
- Examples of wild ramification in an enriched Riemann–Hurwitz formula
- Oriented Schubert calculus in Chow–Witt rings of Grassmannians
- Norms in motivic homotopy theory
- An arithmetic count of the lines on a smooth cubic surface
- Tensor-triangulated categories and dualities
- A commutative P1-spectrum representing motivic cohomology over dedekind domains
- The projective bundle theorem for Ij -cohomology
- Groupe de Chow des cycles orientés et classe d'Euler des fibrés vectoriels
- The localization theorem for framed motivic spaces
- Triangulated Categories of Mixed Motives
- Segre Indices and Welschinger Weights as Options for Invariant Count of Real Lines
- Quaternionic Grassmannians and Borel classes in algebraic geometry
- Framed transfers and motivic fundamental classes
- MOTIVIC EULER CHARACTERISTICS AND WITT-VALUED CHARACTERISTIC CLASSES
- Modules over algebraic cobordism
- The special linear version of the projective bundle theorem
- Abundance of Real Lines on Real Projective Hypersurfaces
- An arithmetic count of the lines meeting four lines in 𝐏³
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