Algebraic K-theory of quadratic forms
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Publication:1113995
DOI10.1007/BF01676869zbMath0663.18007MaRDI QIDQ1113995
Publication date: 1989
Published in: Journal of Soviet Mathematics (Search for Journal in Brave)
Applied homological algebra and category theory in algebraic topology (55U99) Algebraic (K)-theory and (L)-theory (category-theoretic aspects) (18F25) Forms and linear algebraic groups (11E99) Research exposition (monographs, survey articles) pertaining to category theory (18-02)
Cites Work
- The geometric realization of a semi-simplicial complex
- The Witt ring of a full ring
- Wu invariants of Hermitian forms
- Some exact sequences in the theory of Hermitian forms
- The reduced theory of quadratic forms
- The surgery obstruction groups for finite 2-groups
- On Novikov's conjecture for non-positively curved manifolds. I
- The computation of odd dimensional projective surgery groups of finite groups
- Théorie de Quillen et homologie du groupe orthogonal
- Le théorème fondamental de la K-théorie hermitienne
- A splitting theorem for quadratic forms
- Quadratic forms over polynomial extensions of rings of dimension one
- On connected sums of manifolds
- L\(_3\) of finite Abelian groups
- Algebraic \(L\)-theory. IV: Polynomial extension rings
- Quadratic forms under algebraic extensions
- Witt's theorem for noncommutative semilocal rings
- Cohomologische Invarianten quadratischer Formen
- L-theory and the Arf invariant
- Odd dimension surgery groups of odd torsion groups vanish
- Classification of Hermitian forms. VI: Group rings
- Bilinear and quadratic forms on torsion modules
- Homological surgery
- An invariant determining the Witt class of a unitary transformation over a semisimple ring
- Rational L-groups of Bieberbach groups
- Computation of the surgery obstruction groups \(L_{4k}(1;\mathbb{Z}_p)\)
- On the algebraic \(L\)-theory of semisimple rings
- Characterizing reduced Witt rings of fields
- Characterizing reduced Witt rings. II
- The orthogonal group over a full ring
- Quadratic forms over semilocal rings
- Homology surgery theory and perfect groups
- Frobenius algebras and hermitian forms
- Arf's theorem for trace Noetherian and other rings
- Some hybrid symplectic group phenomena
- Computations of Witt groups of finite groups
- Delooping classifying spaces in algebraic K-theory
- Linking numbers and surgery
- On the classification of Hermitian forms. IV: Adele rings
- On the classification of Hermitian forms. V: Global rings
- The codimension two placement problem and homology equivalent manifolds
- Grothendieck and Witt groups of orders and finite groups
- Surgery on compact manifolds: The bounded even dimensional case
- Unitary Whitehead group of cyclic groups
- On the commutator subgroups of certain unitary groups
- Surgery of non-simply-connected manifolds
- Wall's surgery obstruction groups for GxZ
- Classifying spaces and spectral sequences
- Induction theorems and the structure of the Witt group
- Quadratische Formen über Körpern
- Computation of Wall groups
- The prime ideals of Witt rings
- Frobenius reciprocity of Hermitian forms
- On the normal subgroups of the orthogonal group over a ring with involution.
- On the classification of Hermitian forms. II: Semisimple rings
- Surgery with coefficients in a field
- On the structure of the unitary Steinberg group
- Forms over rings with involution
- Forms over semisimple algebras with involution
- On the classification of Hermitian forms. III: Complete semilocal rings
- On the Witt ring and some arithmetical invariants of quadratic forms
- Hermitesche und orthogonale Operatoren über kommutativen Ringen
- Surgery and bordism invariants
- Failure of a Quadratic Analogue of Serre's Conjecture
- The computation of even dimension surgery groups of odd torsion groups
- K-Theory of Forms. (AM-98)
- Quadratic Forms Over Polynomial Rings Over Dedekind Domains
- The Algebraic Theory of Surgery I. Foundations
- The Algebraic Theory of Surgery II. Applications to Topology
- A remark on the quadratic analogue of the Quillen-Suslin theorem.
- ON UNIVERSALITY FOR GEU UNITARY RINGS
- Zur Theorie quadratischer Formen über Körpern der Charakteristik 2.
- Involutions on orders. I.
- Manifolds with π 1 = G x α T
- Unitary nilpotent groups and Hermitian $K$-theory. I
- Witt classes of integral representations of an Abelian $p$-group
- Localisation de formes quadratiques $I$
- Local surgery and applications to the theory of quadratic forms
- Some Local-Global Principles for Formally Real Fields
- The computation of surgery groups of odd torsion groups
- Clifford Algebras and Spinor Norms Over a Commutative Ring
- Localisation de formes quadratiques. II
- Generic Splitting of Quadratic Forms, I
- Failure of a quadratic analogue of Serre’s conjecture
- Groupes de Witt d'un corps de caractéristique 2.
- On Odd Dimensional Surgery with Finite Fundamental Group
- Grothendieck Groups of Modules and Forms Over Commutative Orders
- Hermitian forms and higher algebraic 𝐾-theory
- Modules and Quadratic Forms over Polynomial Algebras
- A product formula for surgery obstructions
- Local surgery and the exact sequence of a localization for Wall groups
- ON THE WITT GROUP OF A 2-ADIC GROUP RING
- Induction theorems for groups of homotopy manifold structures
- Some relative notions in the theory of Hermitian forms
- Specialization of quadratic and symmetric, bilinear forms, and a norm theorem
- Wall’s surgery obstruction groups for 𝑍×𝐺, for suitable groups 𝐺
- Product formulas for $L_n \left( \pi \right)$
- A splitting theorem for manifolds and surgery groups
- ON THE K-THEORY OF UNIMODULAR FORMS OVER RINGS OF ALGEBRAIC INTEGERS
- 𝐵_{(𝑇𝑂𝑃_{𝑛})^{∼}} and the surgery obstruction
- Some Witt Cancellation Theorems
- Unitary Whitehead group of cyclic groups
- Some 𝐿 groups of finite groups
- Algebraic L -Theory, I: Foundations
- Surgery with coefficients
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