$K$-Theory and $K$-Homology of $C^*$-Algebras for Row-Finite Graphs

“…which we view as a chain complex A * (G) concentrated in degrees 1 and 0. Theorem 2.1 [6,8,17,20,26]. The chain complex A * (G) computes the K-theory of C * (G):…”

“…The latter requirement was removed in [8]. The assumption of Condition (L) was avoided in [26], using a method quite different from that of Cuntz and Krieger, although the argument would appear to be incomplete as regards odd K-homology (the proof of [26,Lemma 3.11] asserts that K 1 (C * (E)) embeds in Hom(K 1 (C * (E)), Z), which is true only if K 1 (C * (E)) is torsion-free).…”

“…The latter requirement was removed in [DT02]. The assumption of Condition (L) was avoided in [Yi07], using an argument quite different to that of Cuntz and Krieger. In Section 1 we present the formulas deriving from [CK80], [Cun81] and [Tom03]. The only novelty of our presentation is the translation from the language of extensions to that of Fredholm modules, and the removal of the assumption of Condition (L).…”

Fredholm Modules Over Graph -Algebras

“…which we view as a chain complex A * (G) concentrated in degrees 1 and 0. Theorem 2.1 [6,8,17,20,26]. The chain complex A * (G) computes the K-theory of C * (G):…”

“…The latter requirement was removed in [8]. The assumption of Condition (L) was avoided in [26], using a method quite different from that of Cuntz and Krieger, although the argument would appear to be incomplete as regards odd K-homology (the proof of [26,Lemma 3.11] asserts that K 1 (C * (E)) embeds in Hom(K 1 (C * (E)), Z), which is true only if K 1 (C * (E)) is torsion-free).…”

“…The latter requirement was removed in [DT02]. The assumption of Condition (L) was avoided in [Yi07], using an argument quite different to that of Cuntz and Krieger. In Section 1 we present the formulas deriving from [CK80], [Cun81] and [Tom03]. The only novelty of our presentation is the translation from the language of extensions to that of Fredholm modules, and the removal of the assumption of Condition (L).…”

Fredholm Modules Over Graph -Algebras

“…Cuntz proved that the K-theory groups of the C * -algebra of a finite directed graph E with no sources and with {0, 1}-valued adjacency matrix A E are the cokernel and kernel of the matrix 1 − A t E regarded as an endomorphism of the free abelian group ZE 0 (see [7,Proposition 3.1]). This was generalised to row-finite directed graphs E with no sources in [24], and later (with appropriate adjustments made to the domain and the codomain of A t E in each case) to all row-finite directed graphs E in [28], and to arbitrary graphs in [1,10] (see also [13,27,32,33,36]).…”

“…It is less of an automatic reaction to compute K-homology for C * -algebras, but, for example, Cuntz and Krieger computed (in [6,Theorem 5.3]) the Ext-group (that is, the odd K-homology group) of the Cuntz-Krieger algebra O A of A ∈ M n (Z + ) as the cokernel of 1 − A regarded as an endomorphism of Z n . The computation was later generalised to graph C * -algebras in [10,35] (see also [5,36]).…”

Graded $K$-theory and $K$-homology of relative Cuntz-Pimsner algebras and graph $C^*$-algebras

Graded K-theory and K-homology of relative Cuntz–Pimsner algebras and graph C⁎-algebras