An Indefinite Kaehler Metric on the Space of Oriented Lines
Abstract
The total space of the tangent bundle of a K\"ahler manifold admits a canonical K\"ahler structure. Parallel translation identifies the space T of oriented affine lines in R3 with the tangent bundle of S2. Thus, the round metric on S2 induces a K\"ahler structure on T which turns out to have a metric of neutral signature. It is shown that the isometry group of this metric is isomorphic to the isometry group of the Euclidean metric on R3. The geodesics of this metric are either planes or helicoids in R3. The signature of the metric induced on a surface in T is determined by the degree of twisting of the associated line congruence in R3, and we show that, for Lagrangian, the metric is either Lorentz or totally null. For such surfaces it is proven that the Keller-Maslov index counts the number of isolated complex points of J inside a closed curve on .
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