|Sfb 288 Differential Geometry and Quantum Physics|
Abstract for Sfb Preprint No. 606
A note on twistor spinors with zeros in Lorentzian geometry
We show in this note that if a twistor spinor has a zero on a Lorentzian spin manifold $M$ of arbitrary dimension then the twistor is almost everywhere on $M$ locally conformally equivalent to a parallel spinor.
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