Alexandru Scorpan
Published 2002-10-27, updated 2003-04-11Version 2
We show that, on a 4-manifold M endowed with a spin^c structure induced by an almost-complex structure, a self-dual (= positive) spinor field \phi \in \Gamma(W^+) is the same as a bundle morphism \phi: TM \to TM acting on the fiber by self-dual conformal transformations, such that the Clifford multiplication is just the evaluation of \phi on tangent vectors, and that the squaring map \sigma: W^+ \to \Lambda^+ acts by pulling-back the fundamental form of the almost-complex structure. We use this to detect Kahler and symplectic structures.
Comments: 19 pages, 1 LaTeX figure. Minor revision, one figure added. To appear in Transaction of the AMS
Journal: Trans. Amer. Math. Soc., vol. 356 (2004), mo. 5, pp. 2049-2066
Geometric structures on the tangent bundle of the Einstein spacetime
Sprays and Connections on the Tangent Bundle of Order Two
Totally geodesic submanifolds in the tangent bundle of a Riemannian 2-manifold
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