The C*-algebras of locally finite undirected graphs: A complete description of their K-theory
Abstract
We study the C*-algebra C*(Γ) of a locally finite undirected (Serre) graph Γ and compute its K-theory. The algebra is defined intrinsically, as the graph-of-groups algebra with all groups trivial, and is shown to be independent of the choice of orientation. Its structure is accessed through a passage to directed graphs: for every locally finite Γ there is a row-finite directed graph EΓ with C*(Γ) C*(EΓ), and for essential Γ this identifies C*(Γ) with the Cuntz--Krieger algebra of the Bass--Hashimoto (non-backtracking) matrix TΓ. This makes the whole directed-graph K-theory machinery available and, unlike the directed case, produces K-groups that read off the geometry of Γ: for a finite essential graph of genus g 2 one has K0(C*(Γ))g/(g-1)Z and K1(C*(Γ)) H1(Γ)g, and in general K is governed by the genus, the number of ends and the number of dead-ends. We record the resulting classification by genus: the algebras are finite-dimensional or AF at genus 0, AT precisely for finite graphs at genus 1, and unital Kirchberg algebras for finite essential graphs of genus 2.
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