The C*-algebra of the quantum symplectic sphere
Abstract
The faithful irreducible *-representations of the C*-algebra of the quantum symplectic sphere Sq4n-1, n≥ 2, have been investigated by D'Andrea and Landi. They proved that the first n-1 generators are all zero inside C*(Sq4n-1), for n≥ 2. The result is a generalisation of the case where n=2, which was shown by Mikkelsen and Szyma\'nski. We will show that C*(Sq4n-1), n≥ 2 is isomorphic to a graph C*-algebra. From here it follows that C*(Sq4n-1) is isomorphic to the quantum (2(n+1)-1)-sphere by Vaksman and Soibelman.
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