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Algebras of operators on Hilbert space, $C^*-$algebras, von Neumann algebras, non-commutative geometry
3
votes
2
answers
356
views
Elements of the minimal tensor product of a finite dimensional operator system and a $C^*$-a...
I am trying to prove something that seemed simple to me at first sight but apparently it is giving me a hard time. Here is the same question on MSE.
Let $E\subset A$ be a finite dimensional operator s …
2
votes
1
answer
436
views
The maximal tensor product is a continuous functor
I am trying to prove continuity of the maximal tensor product functor. I have a problem in the proof that I cannot see how to handle; If anyone could give me a clue on how to go on from here, I would …
1
vote
About the quotient norm in the Calkin algebra
Another way to see this: If $A$ is a $C^*$-algebra and $I$ is an ideal in $A$, then if $(e_\lambda)$ is any approximate unit of $I$, we have that the quotient norm satisfies $$\|a+I\|=\lim_{\lambda}\| …
4
votes
0
answers
246
views
Inflating the double dual of a C*-algebra (matrix algebra of double dual)
in this post I would like to discuss the fact that If $A$ is a $C^*$-algebra, then $M_n(A^{**})\cong M_n(A)^{**}$, as mentioned in Brown and Ozawa. I can't really see it. Actually, it is enough for me …
4
votes
1
answer
322
views
Normal linear functionals on bicommutants of C*-algebras
I am going through the proof of the Sherman-Takeda theorem and Fillmore's book "A User's Guide on Operator Algebras" seems to have a nice approach, but something seems off to me:
We need to prove that …
8
votes
1
answer
324
views
The double dual of the unitization of a $C^*$-algebra
I am studying the proof that if $A$ is a $C^*$-algebra such that $A^{**}$ is a semidiscrete vN algebra, then $A$ has the completely positive approximation property (CPAP). I was able to handle the uni …