Hermitian \(K\)-theory, derived equivalences and Karoubi's fundamental theorem

THE BOREL CHARACTER, Cancellation of vector bundles of rank 3 with trivial Chern classes on smooth affine fourfolds, Group completion in the \(K\)-theory and Grothendieck-Witt theory of proto-exact categories, Algebraic \(K\)-theory and Grothendieck-Witt theory of monoid schemes, Quadratic forms and Clifford algebras on derived stacks, Compactly supported \(\mathbb{A}^1\)-Euler characteristic and the Hochschild complex, The motivic Segal-Becker theorem for algebraic \(K\)-theory, Witt, \(GW\), \(K\)-theory of quasi-projective schemes, Stable operations and cooperations in derived Witt theory with rational coefficients, The Mayer-Vietoris principle for Grothendieck-Witt groups of schemes, The cancellation of projective modules of rank 2 with a trivial determinant, On the rational motivic homotopy category, On the relation of symplectic algebraic cobordism to Hermitian \(K\)-theory, η$\eta$‐Periodic motivic stable homotopy theory over Dedekind domains, L‐theory of C∗$C^*$‐algebras, Matrix factorizations, Reality and Knörrer periodicity, Classifying Leavitt path algebras up to involution preserving homotopy, Finiteness theorems for the shifted Witt and higher Grothendieck-Witt groups of arithmetic schemes, Finite homological dimension and a derived equivalence, The first stable homotopy groups of motivic spheres, Aspects of enumerative geometry with quadratic forms, Witt groups of curves and surfaces, The Witt group of real surfaces, Witt groups of smooth projective quadrics, Cdh descent for homotopy Hermitian \(K\)-theory of rings with involution, Unstable operations on \(K\)-theory for singular schemes, On the motivic commutative ring spectrum $\mathbf {BO}$, Chevalley groups of polynomial rings over Dedekind domains, A generalized Vaserstein symbol, The motivic Hopf map solves the homotopy limit problem for \(K\)-theory, Foxby-morphism and derived equivalences, Geometric models for higher Grothendieck-Witt groups in \(\mathbb A^1\)-homotopy theory, Chow-Witt groups and Grothendieck-Witt groups of regular schemes, The Witt group of real algebraic varieties, The projective bundle formula for Grothendieck-Witt spectra, \(K\)-theory of Hermitian Mackey functors, real traces, and assembly, The excess intersection formula for Grothendieck-Witt groups, A Horrocks-type theorem for even orthogonal \(K_2\), Symplectic and orthogonal \(K\)-groups of the integers, A transfer morphism for Hermitian \(K\)-theory of schemes with involution, HIGHER -THEORY OF FORMS I. FROM RINGS TO EXACT CATEGORIES, Derived Witt group formalism, Hermitian K-theory via oriented Gorenstein algebras, The homotopy fixed point theorem and the Quillen-Lichtenbaum conjecture in Hermitian \(K\)-theory, Hermitian K-theory for stable \(\infty\)-categories. I: Foundations, Homotopy and commutativity principle

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• \(\mathbb A^1\)-algebraic topology over a field
• A cohomological classification of vector bundles on smooth affine threefolds
• On the derived category of a finite-dimensional algebra
• Automorphisms of manifolds and algebraic K-theory. II
• Witt groups of complex cellular varieties
• The \(K\)-groups of a blow-up scheme and an excess intersection formula
• Stabilization of the Witt group
• The general dévissage theorem for Witt groups of schemes
• Chow-Witt groups and Grothendieck-Witt groups of regular schemes
• Le théorème fondamental de la K-théorie hermitienne
• The derived category of an exact category
• Algebraic K-theory of generalized free products. I
• On the cyclic homology of exact categories
• \(K\)-theory, Hermitian \(K\)-theory and the Karoubi tower
• Delooping classifying spaces in algebraic K-theory
• DG quotients of DG categories.
• Triangular Witt groups. I: The 12-term localization exact sequence
• Hermitian \(K\)-theory on a theorem of Giffen
• \(A^1\)-representability of hermitian \(K\)-theory and Witt groups
• Chain complexes and stable categories
• Categories and cohomology theories
• On stably free modules over affine algebras
• The homotopy fixed point theorem and the Quillen-Lichtenbaum conjecture in Hermitian \(K\)-theory
• Cyclic homology, cdh-cohomology and negative \(K\)-theory
• Negative \(K\)-theory of derived categories
• 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
• Coherence in closed categories
• The Mayer-Vietoris principle for Grothendieck-Witt groups of schemes
• Model Categories of Diagram Spectra
• Higher Algebraic K-Theory (After Quillen, Thomason and Others)
• Hermitian K-theory of exact categories
• Vector Bundles and Projective Modules
• Topological Examples of Projective Modules
• K-Theory of Azumaya Algebras
• Higher algebraic K-theory: I
• Classifying spaces and fibrations
• Products and duality in Waldhausen categories
• Symmetric spectra
• The spectral sequence relating algebraic K-theory to motivic cohomology
• The Witt group of real algebraic varieties
• $K$-regularity, $cdh$-fibrant Hochschild homology, and a conjecture of Vorst
• Classifying Spaces and Infinite Symmetric Products
• On the spectrum of algebraic 𝐾-theory
• Hermitian K- theory of the integers
• Idempotent completion of triangulated categories
• Triangular Witt groups. II: From usual to derived
• \(\mathbb{A}^1\)-homotopy theory of schemes
• Witt cohomology, Mayer-Vietoris, homotopy invariance and the Gersten conjecture
• S-modules and symmetric spectra
• Spectra and symmetric spectra in general model categories
• Generalized étale cohomology theories