关于一类Schrdinger方程的驻波解

给出了一类描述ＢｏｓｅＥｉｎｓｔｅｉｎ 凝聚的非线性Ｓｃｈｒｄｉｎｇｅｒ

能量临界分数阶非线性Schrodinger方程的整体弱解

利用紧性方法给出能量临界分数阶非线性Schr9dinger方程Cauchy问题解的存在性,并证明Cauchy问题存在整体解.通过构造逼近方程,对满足逼近方程的解序列取极限,得到的极限函数即为能量临界分数阶非线性Schr9dinger方程的整体弱解,并证明该弱解满足能量不等式和质量守恒性质.

带有非局部Laplace算子的饱和Schrödinger-Klein-Gordon方程的概自守动力学

迄今为止,几乎没有学者研究Schrödinger或Klein-Gordon方程的概自守动力学.该文结合Galerkin方法、Laplace变换、Fourier级数和Picard迭代研究了带有非局部Laplace算子饱和Schrödinger-Klein-Gordon方程的概自守弱解的一些结果.此外,还考虑了该方程的全局指数收敛性.

Numerical Investigations on the Resonance Errors of Multiscale Discontinuous Galerkin Methods for One-Dimensional Stationary Schrödinger Equation

In this paper,numerical experiments are carried out to investigate the impact of penalty parameters in the numerical traces on the resonance errors of high-order multiscale discontinuous Galerkin(DG)methods(Dong et al.in J Sci Comput 66:321–345,2016;Dong and Wang in J Comput Appl Math 380:1–11,2020)for a one-dimensional stationary Schrödinger equation.Previous work showed that penalty parameters were required to be positive in error analysis,but the methods with zero penalty parameters worked fine in numerical simulations on coarse meshes.In this work,by performing extensive numerical experiments,we discover that zero penalty parameters lead to resonance errors in the multiscale DG methods,and taking positive penalty parameters can effectively reduce resonance errors and make the matrix in the global linear system have better condition numbers.

带导数耦合SchrÖdinger方程组的适定性

带导数非线性Schrödinger方程描述了极化Alfvén波在恒定磁场下磁化等离子体的传播。本文研究带导数耦合Schrödinger方程组的Cauchy问题。利用傅里叶限制范数方法,得到了初始值在Hs(R)×Hs(R)(s>12)中的局部适定性。

Existence and Stability of Standing Waves for the Nonlinear Schrödinger Equation with Combined Nonlinearities and a Partial Harmonic Potential

In this paper, we study the existence of standing waves for the nonlinear Schrödinger equation with combined power-type nonlinearities and a partial harmonic potential. In the L2-supercritical case, we obtain the existence and stability of standing waves. Our results are complements to the results of Carles and Il’yasov’s artical, where orbital stability of standing waves have been studied for the 2D Schrödinger equation with combined nonlinearities and harmonic potential.

基于变限积分法的非线性Schr dinger方程的数值格式

首先,利用变限积分法和四阶Runge-Kutta法分别离散含五次项的非线性Schr dinger方程的空间和时间变量,并构造初边值问题的全离散格式;其次,在理论上证明其数值解的有界性、存在唯一性以及收敛阶;最后,用数值模拟验证理论分析的有效性.

非线性Schrödinger方程的算子分裂配点格式

采用算子分裂格式结合重心Lagrange插值配点法求解非线性Schrödinger方程.首先,将非线性Schrödinger方程分解为线性部分和非线性部分,线性部分在空间方向上采用重心Lagrange插值配点格式进行离散,在时间方向上采用Crank-Nicolson格式进行离散,非线性部分采用解析求解;然后,对线性子问题空间半离散技术进行相容性分析.最后,采用数值算例进行验证.结果表明:算子分裂配点格式具有高精度,且满足离散的质量守恒和能量守恒.

一类非线性Schrodinger方程变号解的存在性

研究了一类非线性Schr dinger方程:-Δu+V x u=f x,u,x∈RN,其中f的原函数满足的超二次条件比(AR)条件更弱.利用下降流不变集方法,证明了该方程存在变号解.

一类Kirchhoff-Schr dinger-Poisson方程的非平凡解

-a+b∫R 3 u 2 d xΔu+u+λ∅u=a(x)u p-2 u,u∈H(R 3)-Δ∅=u 2,∅∈D 1,2(R 3)为一类非自治的Kirchhoff-Schr dinger-Poisson方程,其中,a>0,λ>0,b≥0,4<p<6,a(x)∈C(R 3)且a(x)为变号。对a(x)赋予适当的条件,通过变分法、山路定理和一些分析技巧,给出了该方程的非平凡解的存在性定理,并利用强极值原理得到了它的正解。

具三次和五次非线性项的非线性Schrödinger方程的爆破条件

主要研究一类具有三次和五次双非线性项的非线性Schrödinger方程在任意大的初始能量情形下爆破解存在的条件.利用Cauchy-Schwartz不等式和不确定性原理,借助粒子在势垒场中运动的力学类比,得到该方程解的爆破条件.进而,利用插值不等式和力学分析得到此方程一个新的爆破条件.

含临界指标的周期渐近的分数阶Schr dinger-Poisson系统正解的存在性

主要考察含临界非局部项的周期渐近的分数阶Schr dinger-Poisson系统解的存在性,通过运用山路定理和集中紧性原理,最终得到了正解的存在性.

一类带双临界指数的凹凸非线性分数阶Schrodinger-Poisson系统的两个正解

本文研究如下带双临界指数的凹凸非线性分数阶Schrodinger-Poisson系统{(-Δ)^(s) u-∅u^(2*)_(s-3) u=u^(2*_(s)-2) u+λh(x)u^(q-2) u,x∈R^(3),(-Δ)^(s)∅=u^(2*)_(s)-1,x∈R^(3),式中:1<q<2;s∈(0,1);λ>0是实参数;h为满足一定条件的函数。利用变分法和山路定理,本文证明存在λ^(*)>0,使得当λ∈(0,λ^(*))时,该系统在D^(s,2)(R^(3))中存在1个具有负能量的局部极小正解和1个具有正能量的山路解。

具有变号位势Kirchhoff-Schrödinger-Poisson系统解的存在性

利用变分法将证明方程解的存在性转化为求方程对应的能量泛函的临界点,得到了Kirchhoff-Schrödinger-Poisson系统无穷多个非平凡解的存在性.

Quantitative analysis of soliton interactions based on the exact solutions of the nonlinear Schr?dinger equation

We make a quantitative study on the soliton interactions in the nonlinear Schro¨dinger equation(NLSE) and its variable–coefficient(vc) counterpart. For the regular two-soliton and double-pole solutions of the NLSE, we employ the asymptotic analysis method to obtain the expressions of asymptotic solitons, and analyze the interaction properties based on the soliton physical quantities(especially the soliton accelerations and interaction forces);whereas for the bounded two-soliton solution, we numerically calculate the soliton center positions and accelerations, and discuss the soliton interaction scenarios in three typical bounded cases. Via some variable transformations, we also obtain the inhomogeneous regular two-soliton and double-pole solutions for the vcNLSE with an integrable condition. Based on the expressions of asymptotic solitons, we quantitatively study the two-soliton interactions with some inhomogeneous dispersion profiles,particularly discuss the influence of the variable dispersion function f(t) on the soliton interaction dynamics.

Soliton propagation for a coupled Schrödinger equation describing Rossby waves

We study a coupled Schrödinger equation which is started from the Boussinesq equation of atmospheric gravity waves by using multiscale analysis and reduced perturbation method.For the coupled Schrödinger equation,we obtain the Manakov model of all-focusing,all-defocusing and mixed types by setting parameters value and apply the Hirota bilinear approach to provide the two-soliton and three-soliton solutions.Especially,we find that the all-defocusing type Manakov model admits bright-bright soliton solutions.Furthermore,we find that the all-defocusing type Manakov model admits bright-bright-bright soliton solutions.Therefrom,we go over how the free parameters affect the Manakov model’s allfocusing type’s two-soliton and three-soliton solutions’collision locations,propagation directions,and wave amplitudes.These findings are useful for setting a simulation scene in Rossby waves research.The answers we have found are helpful for studying physical properties of the equation in Rossby waves.

POSITIVE SOLUTIONS WITH HIGH ENERGY FOR FRACTIONAL SCHRODINGER EQUATIONS

In this paper, we study the Schrodinger equations (-△)^(s)u + V(x)u = a(x)|u|^(p-2)u + b(x)|u|^(q-2)u, x∈R^(N),where 0 < s < 1, 2 < q < p < 2_(s)^(*), 2_(s)^(*) is the fractional Sobolev critical exponent. Under suitable assumptions on V, a and b for which there may be no ground state solution, the existence of positive solutions are obtained via variational methods.

Breather and its interaction with rogue wave of the coupled modified nonlinear Schrodinger equation

We investigate the coupled modified nonlinear Schr?dinger equation.Breather solutions are constructed through the traditional Darboux transformation with nonzero plane-wave solutions.To obtain the higher-order localized wave solution,the N-fold generalized Darboux transformation is given.Under the condition that the characteristic equation admits a double-root,we present the expression of the first-order interactional solution.Then we graphically analyze the dynamics of the breather and rogue wave.Due to the simultaneous existence of nonlinear and self-steepening terms in the equation,different profiles in two components for the breathers are presented.

带部分调和势的非齐次非线性Schrödinger方程的爆破解

该文致力于研究带部分调和势的非齐次非线性Schrödinger方程的Cauchy问题.该方程是玻色-爱因斯坦凝聚中的一个重要模型.结合非线性椭圆方程基态解的变分特征及质量和能量守恒,首先得到了该问题整体解的存在性,并利用尺度变换技巧证明了该方程在一些特殊初值情形下存在爆破解.其次讨论了爆破解的L^(2)集中现象.最后利用与上述基态解相关的变分结论研究了L^(2)最小质量爆破解的动力学性质,即具有最小质量的爆破解的极限profile、精细质量集中和爆破速率.该文将Zhang^([35])的全局存在性和爆破结果推广到带非齐次非线性项的情形,并将Pan和Zhang^([24])的部分结果改进到空间维数N≥2且非线性项为非齐次的情形.

Nondegenerate solitons of the(2+1)-dimensional coupled nonlinear Schrodinger equations with variable coefficients in nonlinear optical fibers

We derive the multi-hump nondegenerate solitons for the(2+1)-dimensional coupled nonlinear Schrodinger equations with propagation distance dependent diffraction,nonlinearity and gain(loss)using the developing Hirota bilinear method,and analyze the dynamical behaviors of these nondegenerate solitons.The results show that the shapes of the nondegenerate solitons are controllable by selecting different wave numbers,varying diffraction and nonlinearity parameters.In addition,when all the variable coefficients are chosen to be constant,the solutions obtained in this study reduce to the shape-preserving nondegenerate solitons.Finally,it is found that the nondegenerate two-soliton solutions can be bounded to form a double-hump two-soliton molecule after making the velocity of one double-hump soliton resonate with that of the other one.