On wave systems with antisymmetric potential in dimension d >= 4 and well-posedness for (half-)wave maps

Abstract

We prove a priori estimates for wave systems of the type \[ ∂tt u - u = · du + F(u) in Rd × R \] where d ≥ 4 and is a suitable antisymmetric potential. We show that the assumptions on are applicable to wave- and half-wave maps, the latter by means of the Krieger-Sire reduction. We thus obtain well-posedness of those equations for small initial data in Hd2(Rd).

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