Sharp ill-posedness for the Maxwell-Dirac equations in one space dimension

Abstract

The Maxwell-Dirac equations in one space dimension are proved to be well posed in the charge class, that is, with L2 data for the spinor. We also prove that this result is sharp, in the sense that well-posedness fails for spinor data in Hs with s<0, as well as in Lp with 1 p < 2. More precisely, we give an explicit example of such data for which no local solution can exist. Our proof of well-posedness applies to a class of systems which includes also the Dirac-Klein-Gordon system, but it does not require any null structure in the system.