Mathematics – Differential Geometry
Scientific paper
2007-08-14
Annali Matematica Pura ed Applicata, Volume 188, Number 3, July 2009, pp. 429-443
Mathematics
Differential Geometry
20 pages, title changed since v2, accepted in AMPA today
Scientific paper
10.1007/s10231-008-0082-5
We consider some classical fibre bundles furnished with almost complex structures of twistor type, deduce their integrability in some cases and study \textit{self-holomorphic} sections of a \textit{symplectic} twistor space. With these we define a moduli space of $\omega$-compatible complex structures. We recall the theory of flag manifolds in order to study the Siegel domain and other domains alike, which is the fibre of the referred twistor space. Finally the structure equations for the twistor of a Riemann surface with the canonical symplectic-metric connection are deduced, based on a given conformal coordinate on the surface. We then relate with the moduli space defined previously.
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