An equivariant pullback structure of trimmable graph C*-algebras
Abstract: We prove that the graph C*-algebra $C*(E)$ of a trimmable graph $E$ is $U(1)$-equivariantly isomorphic to a pullback C*-algebra of a subgraph C*-algebra $C*(E'')$ and the C*-algebra of functions on a circle tensored with another subgraph C*-algebra $C*(E')$. This allows us to unravel the structure and K-theory of the fixed-point subalgebra $C*(E){U(1)}$ through the (typically simpler) C*-algebras $C*(E')$, $C*(E'')$ and $C*(E''){U(1)}$. As examples of trimmable graphs, we consider one-loop extensions of the standard graphs encoding respectively the Cuntz algebra $\mathcal{O}_2$ and the Toeplitz algebra $\mathcal{T}$. Then we analyze equivariant pullback structures of trimmable graphs yielding the C*-algebras of the Vaksman-Soibelman quantum sphere $S{2n+1}_q$ and the quantum lens space $L_q3(l; 1,l)$, respectively.
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