fa.functional analysis - Taylor serie on a Riemannian manifold

Topological secure rank of $C_0(mathbb{Z} instances Okay)$ Answer

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Topological secure rank of $C_0(mathbb{Z} instances Okay)$

I used to be attempting to compute the topological secure rank of $C_0(mathbb{Z} instances Okay)$ the place $Okay$ is Cantor clique. My thought: Since $C_0(mathbb{Z} instances Okay)$ is just not unital if we some how make it unital then $spec (C_0(mathbb{Z} instances Okay))$ is homeomorphic to Cantor clique and $C_0(mathbb{Z} instances Okay)$ grew to become AF-algebra. however I can not make the algebra unital. Does anyone have any thought to make $C_0(mathbb{Z} instances Okay)$ unital?

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