On the Witt group of the punctured spectrum of a regular semilocal ring
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Publication:6658772
DOI10.1112/JLMS.70042MaRDI QIDQ6658772
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Publication date: 8 January 2025
Published in: Journal of the London Mathematical Society. Second Series (Search for Journal in Brave)
(K)-theory of quadratic and Hermitian forms (11E70) Algebraic theory of quadratic forms; Witt groups and rings (11E81)
Cites Work
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- A Hermitian analog of a quadratic form theorem of Springer
- Quadratic forms over semilocal rings
- Homotopy invariance of coherent Witt groups
- Vanishing and nilpotence of locally trivial symmetric spaces over regular schemes
- Triangular Witt groups. I: The 12-term localization exact sequence
- The Gersten conjecture for Witt groups in the equicharacteristic case
- Pairings in triangular Witt theory
- On coherent Hermitian Witt groups
- On the ubiquity of Gorenstein rings
- A zero theorem for the transfer of coherent Witt groups
- A Gersten–Witt complex for hermitian Witt groups of coherent algebras over schemes, I: Involution of the first kind
- A Gersten-Witt complex for hermitian Witt groups of coherent algebras over schemes II: Involution of the second kind
- The Map of the Witt Ring of a Domain into the Witt Ring of its Field of Fractions
- A transfer morphism for Witt groups
- NON-INJECTIVITY OF THE MAP FROM THE WITT GROUP OF A VARIETY TO THE WITT GROUP OF ITS FUNCTION FIELD
- A Gersten–Witt spectral sequence for regular schemes
- Koszul complexes and symmetric forms over the punctured affine space
- Triangular Witt groups. II: From usual to derived
- On Witt groups with support
- On the Gersten conjecture for hermitian Witt groups
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