On the classification of Hermitian forms. III: Complete semilocal rings
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Publication:2560300
DOI10.1007/BF01418851zbMath0259.16013OpenAlexW2604718130MaRDI QIDQ2560300
Publication date: 1973
Published in: Inventiones Mathematicae (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/142187
Grothendieck groups, (K)-theory, etc. (16E20) Special types (Cohen-Macaulay, Gorenstein, Buchsbaum, etc.) (13H10) General binary quadratic forms (11E16) Grothendieck groups, (K)-theory and commutative rings (13D15)
Related Items (13)
Lower bounds for \(K_ 2^{top}({\hat {\mathbb{Z}}}_ p\pi)\) and \(K_ 2({\mathbb{Z}}\pi)\) ⋮ Reduction of UNil for finite groups with normal abelian Sylow 2-subgroup ⋮ Algebraic K-theory of quadratic forms ⋮ \(SK_1\) for finite groups rings. I ⋮ On the classification of Hermitian forms. IV: Adele rings ⋮ On the classification of Hermitian forms. V: Global rings ⋮ Mod 2 semi-characteristics and the converse to a theorem of Milnor ⋮ \(K_{1}\) of a \(p\)-adic group ring. I. The determinantal image ⋮ The Group Logarithm Past and Present ⋮ \(\mathrm{K}_1\) of a \(p\)-adic group ring. II: The determinantal kernel \(\mathrm{SK}_1\) ⋮ An invariant determining the Witt class of a unitary transformation over a semisimple ring ⋮ Logarithmic descriptions of \(K'_ 1({\hat {\mathbb{Z}}}_ pG)\) and class- groups of symmetric groups ⋮ Units in Whitehead groups of finite groups
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