Abstract
We completely determine the range of Sobolev regularity for the Dirac- Klein-Gordon system, the quadratic nonlinear Dirac equations, and the wave-map equation to be well posed locally in time on the real line. For the Dirac-Klein-Gordon system, we can continue those local solutions in nonnegative Sobolev spaces by the charge conservation. In particular, we obtain global well-posedness in the space where both the spinor and scalar fields are only in . Outside the range for well-posedness, we show either that some solutions exit the Sobolev space instantly or that the solution map is not twice differentiable at zero.
Citation
Shuji Machihara. Kenji Nakanishi. Kotaro Tsugawa. "Well-posedness for nonlinear Dirac equations in one dimension." Kyoto J. Math. 50 (2) 403 - 451, Summer 2010. https://doi.org/10.1215/0023608X-2009-018
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