1996
DOI: 10.1215/s0012-7094-96-08412-4
|View full text |Cite
|
Sign up to set email alerts
|

A universal multicoefficient theorem for the Kasparov groups

Abstract: Let K(A) denote the sum of all the K-theory groups of a C*-algebra A in all degrees and with all cyclic coefficient groups. The Bockstein operations (which generate a category Λ) act on K(A). We establish a universal coefficient exact sequence 0 → Pext(K * (A), K * (B)) δ − → KK(A, B) Γ − → Hom Λ (K(A), K(B)) → 0. that holds in the same generality as the universal coefficient theorem of Rosenberg and Schochet. There are advantages, in some circumstances, to using Hom Λ (K(A), K(B)) in place of KK(A, B). These … Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1
1

Citation Types

0
111
0

Year Published

1999
1999
2020
2020

Publication Types

Select...
4
2

Relationship

1
5

Authors

Journals

citations
Cited by 111 publications
(111 citation statements)
references
References 18 publications
0
111
0
Order By: Relevance
“…We have, by the definition of z 0 , for a ⊗ c ∈ F (see also (12) in the proof of [90]), Ad z ′′ 0 ((ϕ [1,2,4] )(a ⊗ 1 Zp,q ) ⊗ (θ • ̺km • κ 2km ) [3] (c)) (e 14.13) = (ϕ [1,2,4] ⊗ id…”
Section: Asymptotically Unitary Equivalencementioning
confidence: 99%
See 4 more Smart Citations
“…We have, by the definition of z 0 , for a ⊗ c ∈ F (see also (12) in the proof of [90]), Ad z ′′ 0 ((ϕ [1,2,4] )(a ⊗ 1 Zp,q ) ⊗ (θ • ̺km • κ 2km ) [3] (c)) (e 14.13) = (ϕ [1,2,4] ⊗ id…”
Section: Asymptotically Unitary Equivalencementioning
confidence: 99%
“…there exists a unital When K * (A) is finitely generated, Hom Λ (K(A), K(B)) is determined by a finitely generated subgroup of K(A) (see [12]). Let P be a finite subset which generates this subgroup.…”
Section: So We Have An Injective Homomorphismmentioning
confidence: 99%
See 3 more Smart Citations