Survey on global existence in the nonlinear Dirac equations in one dimension

We consider the nonlinear Dirac equations in one dimension and review various results on global existence of solutions in H1. Depending on the character of the nonlinear terms, existence of the large-norm solutions can be extended for all times. Global existence of the small-norm solutions is proved for the most general nonlinear Dirac equations with cubic and higher-order nonlinear terms. Integrability of the massive Thirring model is used to find conditions that no solitons occur in the Cauchy problem with small initial data in a subspace of L2.

💡 Research Summary

The paper provides a comprehensive review and new results on the global‑in‑time existence of solutions to one‑dimensional nonlinear Dirac equations in the Sobolev space (H^{1}(\mathbb{R})). Starting from the general form
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