Almost optimal local well-posedness for the Maxwell-Klein-Gordon system with data in Fourier-Lebesgue spaces

Abstract

We prove a low regularity local well-posedness result for the Maxwell-Klein-Gordon system in three space dimensions for data in Fourier - Lebesgue spaces Hs,r , where \|f\|Hs,r = \| s f()\|Lr' , 1r+1r' = 1 . The assumed regularity for the data is almost optimal with respect to scaling as r 1 . This closes the gap between what is known in the case r=2 , namely s > 34 , and the critical value sc = 12 with respect to scaling.