Abstract:
In this article, we study two families of quantum homogeneous spaces, namely, SOq(2n+1)/SOq(2n−1), and SOq(2n)/SOq(2n−2). By applying a two-step Zhelobenko branching rule, we show that the C∗-algebras C(SOq(2n+1)/SOq(2n−1)), and C(SOq(2n)/SOq(2n−2)) are generated by the entries of the first and the last rows of the fundamental matrix of the quantum groups SOq(2n+1), and SOq(2n), respectively. We then construct a chain of short exact sequences, and using that, we compute K-groups of these spaces with explicit generators. Invoking homogeneous C∗-extension theory, we show q-independence of some intermediate C∗-algebras arising as the middle C∗-algebra of these short exact sequences. As a consequence, we get the q-invariance of SOq(5)/SOq(3) and SOq(6)/SOq(4).