Abstract:
We consider $\mathcal C^*$-algebras of commutation relations over the fields $\mathbb Q_p$, $p=2,3,5,\dots,\infty$. We describe all the irreducible separable representations of these algebras. We prove that the algebras are not isomorphic at different $p$.
Keywords:commutation relation, $p$-adic topology, irreducible representation, equivalence of representations.
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