Ytukyg

I want to know enough examples of norm separable $C^{*}$-algebras which are neither finite dimensional nor commutative.

Your desire is somewhat vague since you do not write down your motivation.

Did you already browse through K. R. Davidson's book
$,C^*$-Algebras by Example ? (*)

It's worthwhile!

At least kinda start of a list, with
$mathsf H$ being an infinite-dimensional separable Hilbert space:

• Compact operators $:mathcal K(mathsf H)$




• Cuntz algebras $:mathcal O_n$ with $,nin{2,3,dots,42,dots ,infty}$




• $dots$

_{* Fields Institute Monograph Volume 6, American Mathematical Society, 1996}

Any C$^*$-algebra which is generated by a finite or a countable set will be separable. Including the examples by Hanno, here is a very incomplete list:

• $K(H)$




• Cuntz and Cuntz-Krieger algebras




• For any countable non-abelian group $Gamma$, the reduced C$^*$-algebra of the group, $C_r^*(G)$ (namely the norm closure of the span of $lambda(G)subset B(ell^2(G))$, where $lambda$ is the left regular representation). This includes for instance $C_r^*(mathbb F_n)$, where $mathbb F_n$ are the free groups.




• For any countable non-abelian group $Gamma$, the universal C$^*$-algebra of the group, $C^*(G)$. This differs from the above whenever $G$ is non-amenable.




• Irrational rotation algebras ($A_theta$ is the universal C$^*$-algebra generated by unitaries $u,v$ such that $uv=e^{2pi itheta}vu$)




• AF C$^*$-algebras. That is, direct limits of finite-dimensional C$^*$-algebras. This class is huge, as can be seen by considering their Bratelli diagrams




• Tensor products of the above




• Reduced free products of the above




• $c_0$-sums of the above




• C$^*$-subalgebras of the above