# Spectral stability of small amplitude solitary waves of the Dirac   equation with the Soler-type nonlinearity

**Authors:** Nabile Boussaid, Andrew Comech

arXiv: 1705.05481 · 2019-08-13

## TL;DR

This paper investigates the spectral stability of small amplitude solitary waves in the nonlinear Dirac equation with Soler-type nonlinearity, establishing stability conditions in the non-relativistic limit for various nonlinear regimes.

## Contribution

It introduces a new family of exact bi-frequency solitary wave solutions and uses them to analyze eigenvalue multiplicities and stability in the nonlinear Dirac model.

## Key findings

- Spectral stability for charge-subcritical cases $k
ot	o 2/n$
- Absence of bifurcations from embedded threshold points
- Characterization of eigenvalues via nonlinear eigenvalue analysis

## Abstract

We study the point spectrum of the linearization at a solitary wave solution $\phi_\omega(x)e^{-\mathrm{i}\omega t}$ to the nonlinear Dirac equation in $\mathbb{R}^n$, $n\ge 1$, with the nonlinear term given by $f(\psi^*\beta\psi)\beta\psi$ (known as the Soler model). We focus on the spectral stability, that is, the absence of eigenvalues with nonzero real part, in the non-relativistic limit $\omega\lesssim m$, in the case when $f\in C^1(\mathbb{R}\setminus\{0\})$, $f(\tau)=|\tau|^k+O(|\tau|^K)$ for $\tau\to 0$, with $0<k<K$. For $n\ge 1$, we prove the spectral stability of small amplitude solitary waves ($\omega\lesssim m$) for the charge-subcritical cases $k\lesssim 2/n$ ($1<k\le 2$ when $n=1$) and for the "charge-critical case" $k=2/n$, $K>4/n$.   An important part of the stability analysis is the proof of the absence of bifurcations of nonzero-real-part eigenvalues from the embedded threshold points at $\pm 2m\mathrm{i}$. Our approach is based on constructing a new family of exact bi-frequency solitary wave solutions in the Soler model, using this family to determine the multiplicity of $\pm 2\omega\mathrm{i}$ eigenvalues of the linearized operator, and the analysis of the behaviour of "nonlinear eigenvalues" (characteristic roots of holomorphic operator-valued functions).

## Full text

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## Figures

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## References

108 references — full list in the complete paper: https://tomesphere.com/paper/1705.05481/full.md

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