Hyperkaehler Marriage of the two sphere with the hyperbolic space
Abstract
The Eguchi-Hanson metric is a natural metric on the total space of the cotangent bundle T*CP(1) of the complex projective line CP(1) S2, which extends the Fubini-Study metric of CP(1). By virtue of the Mostow decomposition theorem, T*CP(1) is isomorphic, as SU(2)-equivariant fiber bundle over CP(1), to a complex (co-)adjoint orbit of SL(2, C). In fact, this complex (co-)adjoint orbit is fibered over CP(1) S2 with each fiber isomorphic to the hyperbolic disc H2. In this paper, we are interested in the complex structure inherited on the hyperbolic disc H2 by the hyperk\"ahler extension of the 2-sphere. Contrary to what is generally believed, we show that it differs from the natural complex structure of H2⊂ C inherited from its embedding in C. In other words, the embedding of H2 with its Hermitian-symmetric structure into the hyperk\"ahler manifold T*CP(1) is not holomorphic.
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