References/sources on C*-algebras of Locally Compact Hausdorff Étale Groupoids
I am currently studying Groupoid C*-algebras in the context of amenability, but I still have a long way to go.
Would anyone be able to provide me a clear reference that provides a comprehensive but simple look on how to build C*-algebras of Locally Compact Hausdorff Étale Groupoids? Starting from the convolution algebra, and then building the reduced and full C* algebras in a very detailed manner, so I could really get it? I am reading this one, but a lot of details seem to be omitted for brevity.
Thanks in advance! I would be able to provide a tip if necessary.
Ssvnormandysr98
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The given equation is x² - 2mx + 2m - 1=0
Determine m. - Let $(X, ||\cdot||)$ be a normed space. Let $\{x_n\}$ and $\{y_n\}$ be two Cauchy sequences in X. Show that the seqience Show that the sequence $λ_n = ||x_n − y_n|| $ converges.
This is not my area of expertise, but I suggest offering a bounty if you are willing to tip as users do not get email notifications for Pro bono questions. So your question may not get enough view by expert users.
Got it. Thank you!