The Complex Structures on S2n

Abstract

Let J(S2n) be the set of orthogonal complex structures on TS2n. We show that the twistor space J(S2n) is a Kaehler manifold. Then we show that an orthogonal almost complex structure Jf on S2n is integrable if and only if the corresponding section f\; S2n J(S2n) is holomorphic. These shows there is no integrable orthogonal complex structure on the sphere S2n for n>1. We also show that there is no complex structure in a neighborhood of the space J(S2n). The method is to study the first Chern class of T(1,0)S2n.

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