It is always true that whenever $\mathfrak{U}$ and $\mathfrak{B}$ are isomorphic $C^\ast$-algebras then $\mathfrak{M}_2 \otimes \mathfrak{U}$ and $\mathfrak{M}_2 ...

If P is a linearly ordered set of projections on a Hilbert space and H is the ideal of compact operators, then $\operatorname{Alg}\mathfrak{P} + \mathfrak{H}$ is the quasitriangular algebra associated ...