Let $\mathcal{A}$ be a semisimple $\mathbb{C}$-algebra. By the Artin-Wedderburn theorem, it is isomorphic to a direct product of matrix algebras: $$ \mathcal{A} = \prod_{i=1}^m M_{n_i}(\mathbb{C})$$
Under what conditions on $m,\,n_i$ can we say that $\mathcal{A} \simeq \mathbb{C}[G]$ for some finite group $G$?. This amounts to finding a group $G$ which has exactly $\#\{i \vert \, n_i = k \}$ non-isomorphic complex irreducible representations of dimension $k$, for each $k \in \mathbb{N}$. Note that we must ask for $n_i \vert \sum_{i=1}^m n_i^2$, since the dimensions of irreps divide the order of a group.
Of course, one can also phrase this in terms of "which finite dimensional $C^*$ algebras arise as group $C^*$ algebras?", so one can also consider the question for arbitrary unital $C^*$ algebras, asking under what sufficient conditions does it come from a discrete group?
Any idea or reference will be greatly appreciated.
