Local well-posedness for the Maxwell-Dirac system in temporal gauge

Abstract

We consider the low regularity well-posedness problem for the Maxwell-Dirac system in n+1 dimensions in the cases n=3 and n=2 : align* ∂μ Fμ & = - ,α \\ -i αμ ∂μ & = Aμ αμ \, , align* where Fμ = ∂μ A - ∂ Aμ , and αμ are the Dirac matrices. We assume the temporal gauge A0=0 and make use of the fact that some of the nonlinearities fulfill a null condition. Because we work in the temporal gauge we also apply a method, which was used by Tao for the Yang-Mills system in this gauge.

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