Sigmund Selberg
Published 2017-07-10Version 1
We prove global well-posedness for the coupled Maxwell-Dirac-Thirring-Gross-Neveu equations in one space dimension, with data for the Dirac spinor in the critical space $L^2(\R)$. In particular, we recover earlier results of Candy and Huh for the Thirring and Gross-Neveu models, respectively, without the coupling to the electromagnetic field, but the function spaces we introduce allow for a greatly simplified proof. We also apply our method to prove local well-posedness in $L^2(\R)$ for a quadratic Dirac equation, improving an earlier result of Tesfahun and the author.
On the Global Existence and Blowup Phenomena of Schrödinger Equations with Multiple Nonlinearities
Global existence versus blow up for some models of interacting particles
Global Existence of Strong Solutions to Incompressible MHD
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