Quantum Stiefel manifolds
Abstract
Quantum analogs of Stiefel manifolds SUq(n)/SUq(n-m) were introduced by Podkolzin \& Vainerman. The underlying C*-algebra C(SUq(n)/SUq(n-m)) can be described as the C*-subalgebra of C(SUq(n)) generated by elements of last m rows of the fundamental matrix of SUq(n). Using R-matrix of type An-1, one can find certain relations involving elements of last m rows only. In this paper, by analyzing these relations and using a result of Neshveyev \& Tuset, we establish C(SUq(n)/SUq(n-m)) as a universal C*-algbera given by finite sets of generators and relations.
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