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Sfb 288 Differential Geometry and Quantum Physics |
Abstract for Sfb Preprint No. 441
Conformal Geometry of Surfaces in $S^4$ and Quaternions F. Burstall, D. Ferus, K. Leschke, F. Pedit, U. Pinkall
This is the first comprehensive introduction to the authors' recent attempts toward a better understanding of the global concepts behind spinor representations of surfaces in 3-space. The important new aspect is a quaternionic-valued function theory, whose "meromorphic functions" are conformal maps into quaternions, which extends the classical complex function theory on Riemann surfaces. The first results along these lines were presented at the ICM 98 in Berlin. An important new invariant of the quaternionic holomorphic theory is the Willmore energy. For quaternionic holomorphic curves in the quaternionic projective line, i.e., the conformal 4-sphere, this energy is the classical Willmore energy of conformal surfaces. Using these new techniques, the article discusses the mean curvature sphere of conformal surfaces in the 4-sphere, Willmore surfaces in the 4-sphere, Baecklund tranformations of Willmore surfaces, super-conformal surfaces and twistor projections, and a duality between Willmore surfaces in the 3-sphere and minimal surfaces in hyperbolic 3-space. Finally, a new proof of Montiel's recent classification of Willmore 2-spheres in the 4-sphere is given.
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