Improved well-posedness results for the Maxwell-Klein-Gordon system in 2D

Abstract

The local well-posedness problem for the Maxwell-Klein-Gordon system in Coulomb gauge as well as Lorenz gauge is treated in two space dimensions for data with minimal regularity assumptions. In the classical case of data in L2-based Sobolev spaces Hs and Hl for the electromagnetic field φ and the potential A, respectively. The minimal regularity assumptions are s > 12 and l > 14 , which leaves a gap of 12 and 14 to the critical regularity with respect to scaling sc = lc =0 . This gap can be reduced for data in Fourier-Lebesgue spaces Hs,r and Hl,r to s> 2116 and l > 98 for r close to 1 , whereas the critical exponents with respect to scaling fulfill sc 1 , lc 1 as r 1 . Here \|f\|Hs,r := \| s f\|Lr'τ \, , \, 1 < r 2 \, , \, 1r+1r' = 1 \, . Thus the gap is reduced for φ as well as A in both gauges.