非线性Schr(o)dinger方程的正规化解

由于非线性Schr(o)dinger方程在众多物理问题中有着十分重要的应用,其正规化解问题在近年来逐渐引起大批学者的关注:{-△u+λu=g(u),x∈RN,u∈H1(RN),∫RN|u|2=c,其中正规化条件c∈R+是给定的,而Lagrange乘子λ是未知的.本文首先介绍单个方程在不同条件下正规化解的存在性、多解性及...     

高阶非线性Schr(o)dinger方程的自相似解

研究非线性项的形式为|u|pu,p>0的2m阶非线性Schr(o)dinger方程的自相似解.利用scaling和压缩映象原理证明了当初值满足一定条件时Cauchy问题解的整体存在性,据此给出了当初值的形式为U(x/|x|)|x|-2m/p时,自相似解的存在性.     

一类非线性Schr(o)dinger方程的整体自相似解

本文应用调和分析的方法研究了一类非线性Sehrodinger方程Cauchy问题整体自相似解的存在唯—性．     

非线性Schr(o)dinger方程的整体吸引子

本文讨论了一类带调和势|x|2的非线性Schr(o)dinger方程解的长时间行为,证明了整体吸引子的存在性.     

非椭圆非线性Schr(o)dinger方程Hs整体解

对含L2次临界指数非线性项的非椭圆型Schr(o)dinger方程柯西问题进行了讨论,用Strichartz不等式和压缩映像原理证明了方程有Hs局部解,由L2守恒律得到方程的Hs整体解.     

一类拟线性Schr(o)dinger方程

在二维空间中讨论一类拟线性Schr(o)dinger方程,该方程在物理学上描述了吸引玻色-爱因斯坦凝聚.通过建立这个方程的性质,运用能量方法,证明了该方程所对应的初值问题的解在一定条件下爆破.同时利用变分方法,也得到了整体解存在的一个充分条件,该条件与一个经典的椭圆方程的基态有关.     

高阶非线性Schr(o)dinger方程的整体适定性

本文研究了一类非线性高阶Schr(o)dinger方程Cauchy问题的整体适定性.利用不动点定理,获得了整体解的存在唯一性及解关于初值的连续依赖性和解具有较强的衰减估计.推广了文献[4]中的结果.     

(2+1)维非线性Schr(o)dinger型方程的同宿轨道

研究了几类(2 1)维非线性Schr(o)dinger型方程同宿轨道的问题.利用Hirota双线性算子方法, 通过给出的相关变换, 得到了包括(2 1)维的长短波相互作用方程, 广义Zakharov方程, Mel'nikov方程和g-Schr(o)dinger方程的同宿轨道解的显式解析表达式,从而讨论了这些方程的同宿轨道.     

一类KdV非线性Schr(o)dinger组合微分方程组时间周期解的存在性

本文研究了一类KdV非线性Schr(o)dinger组合微分方程组时间周期解的问题,首先利用Galerkin方法构造近似时间周期解序列,然后利用先验估计和Leray-Schauder不动点原理,证明近似时间周期解序列的收敛性,从而得到该问题时间周期解的存在性.     

广义拟线性Schr(o)dinger方程正解的存在性

本文利用扰动法和变分法研究一类拟线性Schr(o)dinger方程正解的存在性.本文的新颖性在于对权函数在远离原点处的光滑性不作要求.     

KAM tori for higher dimensional beam equation with a fixed constant potential

In this paper, we consider the higher dimensional nonlinear beam equation:utt + △2u + σu + f(u)=0 with periodic boundary conditions, where the nonlinearity f(u) is a real-analytic function of the form f(u)=u3+ h.o.t near u=0 and σ is a positive constant. It is proved that for any fixed σ>0, the above equation admits a family of small-amplitude, linearly stable quasi-periodic solutions corresponding to finite dimensional invariant tori of an associated infinite dimensional dynamical system.     

Almost periodic invariant tori for the NLS on the circle

In this paper we study the existence and linear stability of almost periodic solutions for a NLS equation on the circle with external parameters. Starting from the seminal result of Bourgain in [15] on the quintic NLS, we propose a novel approach allowing to prove in a unified framework the persistence of finite and infinite dimensional invariant tori, which are the support of the desired solutions. The persistence result is given through a rather abstract “counter-term theorem” à la Herman, directly in the original elliptic variables without passing to action-angle ones. Our framework allows us to find “many more” almost periodic solutions with respect to the existing literature and consider also non-translation invariant PDEs.     

Invariant tori for asymptotically linear impact oscillators

The existence of invariant tori and quasi-periodic solutions for asymptotically linear impact oscillators is proved by using the successor map and some generalized versions of the Moser's twist theorem.     

On invariant tori of full dimension for 1D periodic NLS

Consider the NLS with periodic boundary conditions in 1D

(0.1)     

Analytic intermediate dimensional elliptic tori for the planetary many-body problem

In our context,the planetary many-body problem consists of studying the motion of(n+1)-bodies under the mutual attraction of gravitation,where n planets move around a massive central body,the Sun.We establish the existence of real analytic lower dimensional elliptic invariant tori with intermediate dimension N lies between n and 3n-1 for the spatial planetary many-body problem.Based on a degenerate KolmogorovArnold-Moser(abbr.KAM)theorem proved by Bambusi et al.(2011),Berti and Biasco(2011),we manage to handle the difficulties caused by the degeneracy of this real analytic system.     

Regularity of viscosity solutions near KAM torus

In this paper, we give weak regularity theorems on P of u~ε(x, P), where u~ε(x, P)is the viscosity solution of the cell problem H_ε(P D_xu~ε, x)=H_ε(P).     

KAM theorems and open problems for infinite-dimensional Hamiltonian with short range

We introduce several KAM theorems for infinite-dimensional Hamiltonian with short range and discuss the relationship between spectra of linearized operator and invariant tori.Especially,we introduce a KAM theorem by Yuan published in CMP(2002),which shows that there are rich KAM tori for a class of Hamiltonian with short range and with linearized operator of pure point spectra.We also present several open problems.     

Completely degenerate lower-dimensional invariant tori for Hamiltonian system

We study the persistence of lower-dimensional invariant tori for a nearly integrable completely degenerate Hamiltonian system. It is shown that the majority of unperturbed invariant tori can survive from the perturbations which are only assumed the smallness and smoothness.     

Lower dimensional invariant tori with prescribed frequency for nonlinear wave equation

In this paper, one-dimensional (1D) nonlinear wave equation utt−uxx+mu+u³=0, subject to Dirichlet boundary conditions is considered. We show that for each given m>0, and each prescribed integer b>1, the above equation admits a Whitney smooth family of small-amplitude quasi-periodic solutions with b-dimensional Diophantine frequencies, which correspond to b-dimensional invariant tori of an associated infinite-dimensional dynamical system. In particular, these Diophantine frequencies are the small dilation of a prescribed Diophantine vector. The proof is based on a partial Birkhoff normal form reduction and an improved KAM method.     

Orthogonality and quintic functional equations

Using the fixed point method, we prove the Hyers Ulam stability of an orthogonally quintic functional equation in Banach spaces and in non-Archimedean Banach spaces.