THE GROUP $ K_3$ FOR A FIELD
From MaRDI portal
Publication:5203216
DOI10.1070/IM1991v036n03ABEH002034zbMath0725.19003MaRDI QIDQ5203216
Andrei A. Suslin, Alexander S. Merkurjev
Publication date: 1991
Published in: Mathematics of the USSR-Izvestiya (Search for Journal in Brave)
Witt ringtorsionGalois extensionChern classescotorsionMilnor K-groupsrelative K-theoryQuillen K-groupsSeveri-Brauer schemesHilbert 90 theoremMilnor's canonical epimorphism
(K)-theory of quadratic and Hermitian forms (11E70) Separable extensions, Galois theory (12F10) Algebraic theory of quadratic forms; Witt groups and rings (11E81) (K)-theory of global fields (11R70) Algebraic (K)-theory and (L)-theory (category-theoretic aspects) (18F25) Higher symbols, Milnor (K)-theory (19D45)
Related Items
Analogues supérieurs du noyau sauvage, The homology of \(SL_2\) of discrete valuation rings, The weight two \(K\)-theory of fields, Cohomological invariants for central simple algebras of degree 8 and exponent 2, Third homology of \({\mathrm{SL}}_2\) and the indecomposable \(K_3\), Galois co-descent for étale wild kernels and capitulation, Applications of the Bloch-Kato conjecture to cohomological invariants and symbol length, A commutative regulator map into Deligne-Beilinson cohomology, Relative Milnor \(K\)-theory, The mathematics of Andrei Suslin, On universal norms in \(\mathbb{Z}_ p\)-extensions, Twisted \(S\)-units, \(p\)-adic class number formulas, and the Lichtenbaum conjectures, $E_8$, the most exceptional group, Équivalences rationnelle et numérique sur certaines variétés de type abélien sur un corps fini, Periodicity in \(K\)-groups of certain fields, Nonexcellence of the function field of the product of two conics
