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The lower algebraic $K$-theory of virtua...

Guaschi, John...

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The lower algebraic $K$-theory of virtually cyclic subgroups of the braid groups of the sphere and of $\mathbb{Z}[B\_4(\mathbb{S}^2)]$ by Guaschi, John ( Author )

Content Provider	Lemonjar Open Access
Publisher	Australian National University
Publication Date	27-07-2023
Summary	We study $K$-theoretical aspects of the braid groups $B\_n(\mathbb{S}^{2})$ on $n$ strings of the $2$-sphere, which by results of the second two authors, are known to satisfy the Farrell-Jones fibred isomorphism conjecture~\cite{JM}. In light of this, in order to determine the algebraic $K$-theory of the group ring $\mathbb{Z}[B\_n(\mathbb{S}^{2})]$, one should first compute that of its virtually cyclic subgroups, which were classified by D.~L.~Gon{\c c}alves and the first author. We calculate the Whitehead and $K\_{-1}$-groups of the group rings of the finite subgroups (dicyclic and binary polyhedral) of $B\_n(\mathbb{S}^{2})$ for all $4\leq n\leq 11$. Some new phenomena occur, such as the appearance of torsion for the $K\_{-1}$-groups. We then go on to study the case $n=4$ in detail, which is the smallest value of $n$ for which $B\_n(\mathbb{S}^{2})$ is infinite. We show that $B\_n(\mathbb{S}^{2})$ is an amalgamated product of two finite groups, from which we are able to determine a universal space for proper actions of the group $B\_n(\mathbb{S}^{2})$. We also calculate the algebraic $K$-theory of the infinite virtually cyclic subgroups of $B\_n(\mathbb{S}^{2})$, including the Nil groups of the quaternion group of order $8$. This enables us to determine the lower algebraic $K$-theory of $\mathbb{Z}[B\_n(\mathbb{S}^{2})]$.
ISBN	-
Item Type	Article
File Type	pdf
File Size	29.34 KB
Language	English
Subjects	-
Unlimited	MYR 0.01
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URL	http://arxiv.org/abs/1209.4791

Citation

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AMA 11th EditionReferences

Guaschi, John. The lower algebraic $K$-theory of virtually cyclic subgroups of the braid groups of the sphere and of $\mathbb{Z}[B\_4(\mathbb{S}^2)]$. Australian National University. July 27, 2023. Accessed September 20, 2024. https://online.provdatabase.com/cite/5631

APA 7th EditionReferences

Guaschi, John. (2023). The lower algebraic $K$-theory of virtually cyclic subgroups of the braid groups of the sphere and of $\mathbb{Z}[B\_4(\mathbb{S}^2)]$. Australian National University. https://online.provdatabase.com/cite/5631

Chicago 17th EditionReferences

HarvardReferences

Guaschi, John. (2023). The lower algebraic $K$-theory of virtually cyclic subgroups of the braid groups of the sphere and of $\mathbb{Z}[B\_4(\mathbb{S}^2)]$. [Online]. Australian National University. Available from: https://online.provdatabase.com/cite/5631. (Accessed 20 September 2024).

Harvard AustraliaReferences

Guaschi, John, 2023, The lower algebraic $K$-theory of virtually cyclic subgroups of the braid groups of the sphere and of $\mathbb{Z}[B\_4(\mathbb{S}^2)]$, Australian National University, viewed 20 September 2024, <https://online.provdatabase.com/cite/5631>

MLA 9th EditionWorks Cited

Guaschi, John. The lower algebraic $K$-theory of virtually cyclic subgroups of the braid groups of the sphere and of $\mathbb{Z}[B\_4(\mathbb{S}^2)]$. Australian National University, 2023. PROV Database, https://online.provdatabase.com/cite/5631.

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