2017
DOI: 10.1112/topo.12032
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The generalized slices of Hermitian K ‐theory

Abstract: We compute the generalized slices (as defined by Spitzweck-Østvaer) of the motivic spectrum KO (representing Hermitian K-theory) in terms of motivic cohomology and (a version of) generalized motivic cohomology, obtaining good agreement with the situation in classical topology and the results predicted by Markett-Schlichting. As an application, we compute the homotopy sheaves of (this version of) generalized motivic cohomology, which establishes a version of a conjecture of Morel. 1125which is (at best) conside… Show more

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Cited by 32 publications
(84 citation statements)
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“…Since the odd slices of Re(E) are contractible, it is even by definition, and by Proposition 5.4 we must have π 2q−1,q Re(E) = 0. This proves (2).…”
Section: Betti Realization and Slicessupporting
confidence: 53%
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“…Since the odd slices of Re(E) are contractible, it is even by definition, and by Proposition 5.4 we must have π 2q−1,q Re(E) = 0. This proves (2).…”
Section: Betti Realization and Slicessupporting
confidence: 53%
“…To deal with the localizations we appeal to work of Levine It is remarked in [37], and then proved in detail in [2] that the very effective slice filtration is the positive part of a t-structure on the very effective motivic stable homotopy category. In the case that S is the spectrum of a perfect field F , Bachmann used the homotopy t-structure to give a description of the very effective motivic category in terms of homotopy sheaves.…”
Section: As In the Previous Section We Can Define A Cellular Version mentioning
confidence: 99%
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“…The slice computation is slightly more complicated for the motivic spectrum KQ representing hermitian K-theory. For comparison purposes, the case of kq, the very effective cover of KQ [1], [2], is more convenient. Set kq nh := kq ∧ C nh , and similarly cKW nh := cKW ∧ C nh = cKW ∨ Σ 1,0 cKW.…”
Section: Slices Of Motivic Moore Spectramentioning
confidence: 99%
“…Theorem 2.1 implies that for every motivic spectrum E and for every integer s, π s+(⋆) E is a graded K MW -module. As a first instance besides the motivic sphere spectrum 1, consider the very effective cover kq → KQ of the motivic spectrum representing hermitian K-theory [1], [2]. Using kq instead of the effective cover f 0 KQ → KQ leads to a slight improvement on the computation [21, Theorem 5.5].…”
Section: Introductionmentioning
confidence: 99%