Nonlinear stability for the Maxwell-Born-Infeld system on a Schwarzschild background
Federico Pasqualotto

TL;DR
This paper proves the global existence of small solutions to the nonlinear Maxwell-Born-Infeld system on Schwarzschild spacetime, utilizing a novel transformation to linear equations and decay estimates.
Contribution
It introduces a first-order differential transformation that linearizes the extreme components of the MBI system, enabling decay analysis on a black hole background.
Findings
Established nonlinear decay estimates for the MBI system.
Extended linear techniques to a nonlinear tensorial setting.
Demonstrated global existence for small data solutions.
Abstract
In this paper we prove small data global existence for solutions to the Maxwell-Born-Infeld (MBI) system on a fixed Schwarzschild background. This system has appeared in the context of string theory and can be seen as a nonlinear model problem for the stability of the background metric itself, due to its tensorial and quasilinear nature. The MBI system models nonlinear electromagnetism and does not display birefringence. The key element in our proof lies in the observation that there exists a first-order differential transformation which brings solutions of the spin Teukolsky equations, satisfied by the extreme components of the field, into solutions of a "good" equation (the Fackerell-Ipser Equation). This strategy was established in [F. Pasqualotto, The spin Teukolsky equations and the Maxwell system on Schwarzschild, Annales Henri Poincar\'e, 20(4):1263-1323, 2019,…
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