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Detection of Hermitian connections in wave equations with cubic non-linearity

Xi Chen, Matti Lassas, Lauri Oksanen, Gabriel P. Paternain

2021Journal of the European Mathematical Society33 citationsDOIOpen Access PDF

Abstract

We consider the geometric non-linear inverse problem of recovering a Hermitian connection A from the source-to-solution map of the cubic wave equation \Box_{A}\phi+\kappa |\phi|^{2}\phi=f , where \kappa\neq 0 and \Box_{A} is the connection wave operator in the Minkowski space \mathbb{R}^{1+3} . The equation arises naturally when considering the Yang–Mills–Higgs equations with Mexican hat type potentials. Our proof exploits the microlocal analysis of non-linear wave interactions, but instead of employing information contained in the geometry of the wave front sets as in previous literature, we study the principal symbols of waves generated by suitable interactions. Moreover, our approach relies on inversion of a novel non-abelian broken light ray transform, a result interesting in its own right.

Topics & Concepts

MathematicsHermitian matrixMinkowski spaceWave equationConnection (principal bundle)Mathematical analysisPure mathematicsGeometryNumerical methods for differential equationsNonlinear Waves and Solitons
Detection of Hermitian connections in wave equations with cubic non-linearity | Litcius