# On the cubic Dirac equation with potential and the Lochak--Majorana   condition

**Authors:** Piero D'Ancona, Mamoru Okamoto

arXiv: 1706.06479 · 2019-07-25

## TL;DR

This paper proves global existence and scattering for a cubic Dirac equation with potential, including large data under certain conditions, using endpoint Strichartz estimates and covering spherically symmetric cases.

## Contribution

It establishes global well-posedness and scattering results for the cubic Dirac equation with large potentials and data, extending previous results to include the Lochak--Majorana condition.

## Key findings

- Global existence and scattering for small initial data in H^1.
- Extension to large initial data with small chiral component.
- Applicability to spherically symmetric data with small H^1 norm.

## Abstract

We study a cubic Dirac equation on $\mathbb{R}\times\mathbb{R}^{3}$ \begin{equation*}   i \partial _t u + \mathcal{D} u + V(x) u =   \langle \beta u,u \rangle \beta u   \end{equation*} perturbed by a large potential with almost critical regularity. We prove global existence and scattering for small initial data in $H^{1}$ with additional angular regularity. The main tool is an endpoint Strichartz estimate for the perturbed Dirac flow. In particular, the result covers the case of spherically symmetric data with small $H^{1}$ norm.   When the potential $V$ has a suitable structure, we prove global existence and scattering for \emph{large} initial data having a small chiral component, related to the Lochak--Majorana condition.

## Full text

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## References

22 references — full list in the complete paper: https://tomesphere.com/paper/1706.06479/full.md

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Source: https://tomesphere.com/paper/1706.06479