TRAVELING WAVES FOR SOME NONLOCAL 1D GROSS-PITAEVSKII EQUATIONS WITH NONZERO CONDITIONS AT INFINITY

ANDRE DE LAIRE; PIERRE MENNUNI

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TRAVELING WAVES FOR SOME NONLOCAL 1D GROSS-PITAEVSKII EQUATIONS WITH NONZERO CONDITIONS AT INFINITY

机译：对于一些非局部1D GITOEVSKII方程的行驶波，无限位于非零条件

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摘要

We consider a nonlocal family of Gross-Pitaevskii equations with nonzero conditions at infinity in dimension one. We provide conditions on the nonlocal interaction such that there is a branch of traveling waves solutions with nonvanishing conditions at infinity. Moreover, we show that the branch is orbitally stable. In this manner, this result generalizes known properties for the contact interaction given by a Dirac delta function. Our proof relies on the minimization of the energy at fixed momentum. As a by-product of our analysis, we provide a simple condition to ensure that the solution to the Cauchy problem is global in time.

机译：我们考虑一个非局部Pitaevskii方程式，在维度一维附属物中具有非零条件。我们提供了非本周相互作用的条件，使得在无限远处具有非丹化条件的行驶波解决方案的分支。此外，我们表明该分支是甘露出稳定的。以这种方式，该结果概括了DIRAC DELTA函数给出的接触交互的已知属性。我们的证据依赖于固定动量的最小化能量。作为我们分析的副产品，我们提供了一个简单的条件，以确保Cauchy问题的解决方案是全球性的。

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来源
《Discrete and continuous dynamical systems》 |2020年第1期|635-682|共48页
作者
ANDRE DE LAIRE; PIERRE MENNUNI;
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Universite de Lille CNRS Inria UMR 8524 Laboratoire Paul Painleve F-59000 Lille France;

Universite de Lille CNRS Inria UMR 8524 Laboratoire Paul Painleve F-59000 Lille France;

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正文语种 eng
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关键词
Nonlocal Schrodinger equation; Gross-Pitaevskii equation; traveling waves; dark solitons; orbital stability; nonzero conditions at infinity;

机译：非本球薛定林方程式;gitos-pitaevskii方程;旅行波;黑暗孤子;轨道稳定;无穷大的非零条件;

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1. Traveling Waves for Nonlinear Schrodinger Equations with Nonzero Conditions at Infinity [J] . Chiron David, Maris Mihai Archive for Rational Mechanics and Analysis . 2017,第1期

机译：非单线条件的非线性Schrodinger方程的行驶波
2. Stability of Traveling Waves of Nonlinear Schrodinger Equation with Nonzero Condition at Infinity [J] . Lin Zhiwu, Wang Zhengping, Zeng Chongchun Archive for Rational Mechanics and Analysis . 2016,第1期

机译：无限大条件下具有非零条件的非线性Schrodinger方程的行波稳定性
3. LIMIT AT INFINITY AND NONEXISTENCE RESULTS FOR SONIC TRAVELLING WAVES IN THE GROSS-PITAEVSKII EQUATION [J] . Philippe Gravejat Differential and integral equations . 2004,第11a12期

机译：格-Pitaevskii方程中声波行波的无限性极限和不存在结果
4. Existence, uniqueness, and asymptotic stability of traveling waves in nonlocal evolution equations [C] . Xinfu Chen US-Chinese Conference on Differential Equations and Applications held in Hangzhou, June 24-29, 1996 . 1996

机译：非局部演化方程中行波的存在性，唯一性和渐近稳定性
5. Existence of traveling wave solutions for a nonlocal reaction-diffusion equation. [D] . Rivera, Joaquin. 2007

机译：非局部反应扩散方程行波解的存在性。
6. Rogue waves in the two dimensional nonlocal nonlinear Schrödinger equation and nonlocal Klein-Gordon equation [O] . Wei Liu, Jing Zhang, Xiliang Li 2012

机译：二维非局部非线性Schrödinger方程和非局部Klein-Gordon方程中的无赖波
7. Traveling waves for some nonlocal 1D Gross–Pitaevskii equations with nonzero conditions at infinity [O] . André de Laire, Pierre Mennuni 2020

机译：对于一些非局部1D GITOEVSKII方程的行驶波，无限位于非零条件
8. Hamiltonians and Wave Equations for Particles of Spin 0 and Spin 1/2 with Nonzero Mass [R] . Arunasalam, V. 1969

机译：具有非零质量的自旋0和自旋1/2粒子的Hamiltonian和波动方程

TRAVELING WAVES FOR SOME NONLOCAL 1D GROSS-PITAEVSKII EQUATIONS WITH NONZERO CONDITIONS AT INFINITY

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