Abstract
Let k be a field. We extend the main result in Nyman (J. Algebra 434, 90–114, 2015) to show that all homogeneous noncommutative curves of genus zero over k are noncommutative \(\mathbb {P}^{1}\)-bundles over a (possibly) noncommutative base. Using this result, we compute complete isomorphism invariants of homogeneous noncommutative curves of genus zero, allowing us to generalize a theorem of Witt.
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