On the -theory of -algebras arising from integral dynamics

Abstract: We investigate the K-theory of unital UCT Kirchberg algebras Q S arising from families S of relatively prime numbers. It is shown that K * (Q S ) is the direct sum of a free abelian group and a torsion group, each of which is realized by another distinct C * -algebra naturally associated to S. The C * -algebra representing the torsion part is identified with a natural subalgebra A S of Q S . For the K-theory of Q S , the cardinality of S determines the free part and is also relevant for the torsion part, for w… Show more

“…After we finished this paper, Nicolai Stammeier informed us that, using a completely different approach, it was shown in [BOS15] that Q(F + θ ⊲⊳ Z) is nuclear, simple and purely infinite if {n i } k i=1 ⊂ N \ {0, 1} is a pairwise coprime set. So Theorem 5.13 generalizes their results.…”

“…We should mention that F + θ here is not necessary to be right LCM, and so F + θ ⊲⊳ G is not right LCM in general. Therefore, one can not apply the results in the recent works on right LCM semigroups, such as [ABLS16,BOS15,BLS16,BRRW14,Stam16,Star15], to our cases.…”

“…Since then, there has been attracting a lot of attention to the study of semigroup C*-algebras. See, for example, [ABLS16,BOS15,BLS16,BRRW14,Stam16,Star15] and the references therein. In [BRRW14], Brownlowe-Ramagge-Robertson-Whittaker defined a quotient C*-algebra Q(P ) of C * (P ).…”

Boundary Quotient -algebras of Products of Odometers

“…After we finished this paper, Nicolai Stammeier informed us that, using a completely different approach, it was shown in [BOS15] that Q(F + θ ⊲⊳ Z) is nuclear, simple and purely infinite if {n i } k i=1 ⊂ N \ {0, 1} is a pairwise coprime set. So Theorem 5.13 generalizes their results.…”

“…We should mention that F + θ here is not necessary to be right LCM, and so F + θ ⊲⊳ G is not right LCM in general. Therefore, one can not apply the results in the recent works on right LCM semigroups, such as [ABLS16,BOS15,BLS16,BRRW14,Stam16,Star15], to our cases.…”

“…Since then, there has been attracting a lot of attention to the study of semigroup C*-algebras. See, for example, [ABLS16,BOS15,BLS16,BRRW14,Stam16,Star15] and the references therein. In [BRRW14], Brownlowe-Ramagge-Robertson-Whittaker defined a quotient C*-algebra Q(P ) of C * (P ).…”

Boundary Quotient -algebras of Products of Odometers

“…S = N ⋊ P , where P is the free abelian submonoid of N × generated by a family P of relatively prime numbers. For such semigroups, nontrivial partial results emerged in the recent past [LN16,BOS16]. These results lead to intriguing questions and relate to conjectures about C * -algebras of k-graphs, see [BOS16, Conjecture 5.11].…”

“…With regards to the associated C * -algebras, we provide evidence that S ci plays an important role in the quest for the K-theory of Q(S) and Q p (S). This is discussed in Section 5 in the context of integral dynamics [BOS16] and Baumslag-Solitar monoids [Spi12].…”

A boundary quotient diagram for right LCM semigroups

C*-Envelope and Dilation Theory of Semigroup Dynamical Systems