Noncommutative Complex Structures for the Full Quantum Flag Manifold of Quantum SU(3)
Abstract
In recent work, Lusztig's positive root vectors (with respect to a distinguished choice of reduced decomposition of the longest element of the Weyl group) were shown to give a quantum tangent space for every A-series Drinfeld--Jimbo full quantum flag manifold Oq(Fn). Moreover, the associated differential calculus (0,)q(Fn) was shown to have classical dimension, giving a direct q-deformation of the classical anti-holomorphic Dolbeault complex of Fn. Here we examine in detail the rank two case, namely the full quantum flag manifold of Oq(SU3). In particular, we examine the *-differential calculus associated to (0,)q(F3) and its non-commutative complex geometry. We find that the number of almost-complex structures reduces from 8 (that is 2 to the power of the number of positive roots of sl3) to 4 (that is 2 to the power of the number of simple roots of sl3). Moreover, we show that each of these almost-complex structures is integrable, which is to say, each of them is a complex structure. Finally, we observe that, due to non-centrality of all the non-degenerate coinvariant 2-forms, none of these complex structures admits a left Oq(SU3)-covariant noncommutative K\"ahler structure.
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