Yongqian Zhang, Qin Zhao
Published 2014-07-16Version 1
This paper studies a class of nonlinear Dirac equations with cubic terms in $R^{1+1}$, which include the equations for the massive Thirring model and the massive Gross-Neveu model. Under the assumption that the initial data has bounded $L^2$ norm, the global existence and the uniqueness of the strong solution in $C([0,\infty),L^2(R^1))$ are proved.
Global solution to a cubic nonlinear Dirac equation in 1+1 dimensions
On classes of globally smooth solutions to the Euler equations in several dimensions
Global wellposedness and scattering for the defocusing energy-critical nonlinear Schrodinger equations of fourth order in dimensions $d\geq9$
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