Qualitative analysis on logarithmic Schrödinger equation with general potential
Abstract
In this paper, we study the existence, uniqueness, nondegeneracy and some qualitative properties of positive solutions for the logarithmic Schrödinger equations: \[ -\Delta u+ V(|x|) u=u\log u^2, u\in H^1(\mathbb R^N). \] Here $N\geq 2$ and $V\in C^2((0,+\infty))$ is allowed to be singular at $0$ and repulsive at infinity (i.e., $V(r)\to-\infty$ as ${r\to\infty}$). Under some general assumptions, we show the existence, uniqueness and nondegeneracy of this equation in the radial setting.Specifically, these results apply to singular potentials such as $V(r)=\alpha_{1}\log r+\alpha_2 r^{\alpha_3}+\alpha_4$ with $\alpha_1>1-N$, $\alpha_2, \alpha_3\geq 0$ and $\alpha_4\in\mathbb R$, which is repulsive for $\alpha_1<0$ and $\alpha_2=0$. We also investigate the connection between some power-law nonlinear Schrödinger equation with a critical frequency potential and the logarithmic-law Schrödinger equation with $V(r)=\alpha\log r$, $\alpha>1-N$, proving convergence of the unique positive radial solution from the power type problem to the logarithmic type problem. Under a further assumption, we also derive the uniqueness and nondegeneracy results in $H^1(\mathbb R^N)$ by showing the radial symmetry of solutions.
- Publication:
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arXiv e-prints
- Pub Date:
- September 2021
- DOI:
- 10.48550/arXiv.2109.14858
- arXiv:
- arXiv:2109.14858
- Bibcode:
- 2021arXiv210914858Z
- Keywords:
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- Mathematics - Analysis of PDEs