The wave resolvent for compactly supported perturbations of static spacetimes

The wave resolvent for compactly supported perturbations of static spacetimes

In this note, we consider the wave operator $\square_g$ in the case of globally hyperbolic, compactly supported perturbations of static spacetimes. We give an elementary proof of the essential self-adjointness of $\square_g$ and of uniform microlocal estimates for the resolvent in this setting. This...

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Hauptverfasser: Wrochna, Michał, Zeitoun, Ruben
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Analysis of PDEs
Mathematics - Mathematical Physics
Physics - Mathematical Physics
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Zusammenfassung:In this note, we consider the wave operator $\square_g$ in the case of globally hyperbolic, compactly supported perturbations of static spacetimes. We give an elementary proof of the essential self-adjointness of $\square_g$ and of uniform microlocal estimates for the resolvent in this setting. This provides a model for studying Lorentzian spectral zeta functions which is particularly simple, yet sufficiently general for locally deriving Einstein equations from a spectral Lagrangian.
DOI:10.48550/arxiv.2204.08767