Topological cyclic homology of the integers at two
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Publication:1295681
DOI10.1016/S0022-4049(97)00155-2zbMath0929.19003MaRDI QIDQ1295681
Publication date: 11 January 2000
Published in: Journal of Pure and Applied Algebra (Search for Journal in Brave)
topological cyclic homologytopological Hochschild homologyhomotopy fixed pointsproducts in spectral sequencesTate construction
(K)-theory and homology; cyclic homology and cohomology (19D55) Equivariant homotopy theory in algebraic topology (55P91) Spectral sequences in algebraic topology (55T99) Homotopy groups of special spaces (55Q52)
Related Items (7)
On cyclic fixed points of spectra ⋮ On the de Rham–Witt complex in mixed characteristic ⋮ \(RO(S^{1})\)-graded TR-groups of \(\mathbb F_p\), \(\mathbb Z\) and \(\ell \) ⋮ Boardman's whole-plane obstruction group for Cartan-Eilenberg systems ⋮ On the Whitehead Spectrum of the Circle ⋮ Topological cyclic homology of local fields ⋮ Algebraic \(K\)-theory of the two-adic integers
Cites Work
- Equivariant stable homotopy theory. With contributions by J. E. McClure
- The group \(K_3(Z)\) is cyclic of order forty-eight
- Algebraic \(K\)-theory of the two-adic integers
- The product on topological Hochschild homology of the integers with \(\mod 4\) coefficients
- Trace maps from the algebraic \(K\)-theory of the integers (after Marcel Bökstedt)
- The cyclotomic trace and algebraic K-theory of spaces
- On the \(K\)-theory of finite algebras over Witt vectors of perfect fields
- MULTIPLICATIONS ON THE MOORE SPECTRUM
- Stable real cohomology of arithmetic groups
- Generalized Tate cohomology
- Introduction to Algebraic K-Theory. (AM-72)
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