An elliptic proof of the splitting theorems from Lorentzian geometry

An elliptic proof of the splitting theorems from Lorentzian geometry

We provide a new proof of the splitting theorems from Lorentzian geometry, in which simplicity is gained by sacrificing linearity of the d'Alembertian to recover ellipticity. We exploit a negative homogeneity (non-uniformly) elliptic $p$-d'Alembert operator for this purpose. This allows us...

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Hauptverfasser: Braun, Mathias, Gigli, Nicola, McCann, Robert J, Ohanyan, Argam, Sämann, Clemens
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Analysis of PDEs
Mathematics - Differential Geometry
Mathematics - Mathematical Physics
Mathematics - Metric Geometry
Physics - Mathematical Physics
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Zusammenfassung:We provide a new proof of the splitting theorems from Lorentzian geometry, in which simplicity is gained by sacrificing linearity of the d'Alembertian to recover ellipticity. We exploit a negative homogeneity (non-uniformly) elliptic $p$-d'Alembert operator for this purpose. This allows us to bring the Eschenburg, Galloway, and Newman Lorentzian splitting theorems into a framework closer to the Cheeger-Gromoll splitting theorem from Riemannian geometry.
DOI:10.48550/arxiv.2410.12632