一类四阶周期边值问题的可解性

本文在两参数非共振条件下研究一类四阶周期边值问题的可解性。     

Poincaré非线性振动理论在连续介质力学中的推广(Ⅰ)——基本理论与方法*

本文将离散介质的Poincaré非线性振动理论[1]向连续介质力学推广,做了初步尝试。首先讨论在非共振与共振情况下,连续介质线性强迫振动周期解,及其周期解存在条件。进而运用线性理论结果,将Poincaré理论中的主要结论推广到连续介质非线性振动问题中去。此外,本文提出并建议用偏微分方程直接摄动与加权积分方法,计算共振区内的周期解。     

高维电报方程的对称周期解

讨论n维电报方程的对称周期解．利用Schauder不动点定理，在非共振条件下给出了一个存在性定理．     

一类渐近线性对称Hamilton方程组多个周期解的存在

本文利用对称性,将一类偶对称渐近线性Hamilton方程组归为Amann-Zehnder所建立的在∞处非共振渐近线性算子方程的约化理论框架之下,由此给出了多个非平凡周期解存在的一个充分性条件。     

Poincaré非线性振动理论在连续介质力学中的推广(Ⅱ)——若干应用

文本是文[1]的继续.文[1]中,提出和建议使用非线性偏微分方程直接摄动与加权积分方程法,计算连续介质系统的共振与非共振周期解.本文中,应用该方法计算了定跨度弹性梁在各种常见边界条件下强迫振动的共振与非共振周期解,方板在集中周期荷载作用下的共振周期解.指出了,非主振型对非线性振动周期解的影响及静荷载对幅频特性曲线的影响.     

三维系统余维二分支中周期轨道与不变环面的存在性

本文研究具余维二奇点的三维系统在双参数扰动下周期轨道与不变环面的分支，给出了存在不变环面的最佳条件     

二阶共振周期边值问题多解的存在性

借助于与给定共振的非线性周期边值问题相关的非共振的线性边值问题来构造算子,利用范数形式的锥拉伸-压缩不动点定理,得到了非线性周期边值问题非负解的存在性定理.     

R~3中一类Kolmogorov系统的空间周期解

本文对一类具有相同增长率的三种群广义的Ｋｏｌｍｏｇｏｒｏｖ系统的空间周期解 存在条件进行研究,得到存在非常数空间周期解的判定条件．     

高维同宿环扭曲分支与稳定性

利用沿同宿环的线性变分方程的线性独立解作为在同宿环的小管状邻域内的局部坐标系来建立Poincaré映射,研究了高维系统扭曲同宿环的分支问题．在非共振条件和共振条件下,获得了1-同宿环、 1-周期轨道、 2-同宿环、 2-周期轨道和两重2-同期轨道的存在性、 存在个数和存在区域．给出了相关的分支曲面的近似表示．同时,研究了高维系统同宿环和平面系统非扭曲同宿环的稳定性．     

抽象泛函微分方程——Liapunov泛函与周期解的存在性

本文结合Liapunov泛函和逼近法,证明了一类抽象泛函微分方程在非共振情形下周期解的存在性和唯一性.     

INVARIANT 3-TORUS BIFURCATIONS FROM PERIODIC MANIFOLDS

1IntroductionTheproblems0finvarianttorusbifurcationforplanarHamilt0niansy-stemshavebeenextensivelystudiedandmanyresultshavebeen0btained(see[l-4]andthereferencestherein).However,theresultsconcernedwiththeinvarianttorusbifurcati0n0fhigherdimensi0nalsystemsarestillrelativelyfew.Recentlyann-dimensi0nalsystem,whichhasanormallyhyperbolicin-variantmanif0ldconsistingentirely0fclosedorbits,wasconsidered,andtheexistenceandthenormalhyperbolicityoftheinvariantt0rusweregivenin[5].Paper[6]extendedthesystem…     

Backward errors of periodic invariant subspaces for regular periodic matrix pairs

In this paper, the backward error of periodic invariant subspaces for regular periodic pairs is defined and its explicit expression is derived. In particular, we also present the expression of the backward error of generalized invariant subspaces for the regular matrix pair. The results are illustrated by two numerical examples.     

Invariant measures for certain linear fractional transformations mod 1

Explicit invariant measures are derived for a family of finite-to-one, ergodic transformations of the unit interval having indifferent periodic orbits.

     

一类三维系统的次调和解与不变环面的分支

讨论一类三维自治系统的闭轨在周期扰动下的分支问题.利用Poincare映射与积分流形定理,得到扰动系统存在次调和解和不变环面的条件,以及次调和解的鞍结点分支.     

Decomposition of weighted pseudo-almost periodic functions

First, we show by constructing two counterexamples that the decomposition of weighted pseudo-almost periodic functions is not unique in general. Then we prove that the decomposition of such functions is unique if PAP₀(X,ρ) is translation invariant, but not necessarily unique without the assumption. Moreover, we give an example to show that the mean value under a certain weight ρ may not exist for all almost periodic functions. With these results, we answer some fundamental questions on weighted pseudo-almost periodic functions.     

Homoclinic orbits for a perturbed quintic-cubic nonlinear Schrödinger equation

The existence of homoclinic orbits for a perturbed cubic-quintic nonlinear Schrödinger equation with even periodic boundary conditions under the generalized parameters conditions is established. We combined geometric singular perturbation theory, Melnikov analysis, and integrable theory to prove the persistence of homoclinic orbits.     

Homoclinic orbits for a perturbed quintic-cubic nonlinear Schrdinger equation

IntroductionIn recent years, there have been extensive studies on the existence of homoclinic orbit5 fOrnear integrable Hamiltonbo partial fferential equations, which are closely related to chaosI1--7].In this work, we consider a perturbed quintic-cubic nonlinear Schr5dinger (NLS) equationwhere q is 27-Periodic and even in x, D is a bounded dissipative operator and is assumed totake the formDq = --aq + jBqfor posititre constants cr and J. Here B is a Fourier truncation of the differentia…     

三维系统中一族闭轨在周期扰动下的分支

讨论一类三维系统在周期扰动下的分支问题.假设此三维系统有一族闭轨,利用 Poincar\'e映射及积分流形定理,得到了在周期扰动下由这族闭轨产生次调和解和不变环面的条件,并讨论了次调和解的鞍结点分支.     

Liouvillian and analytic integrability of the quadratic vector fields having an invariant ellipse

We characterize the Liouvillian and analytic integrability of the quadratic polynomial vector fields in R2 having an invariant ellipse.More precisely,a quadratic system having an invariant ellipse can be written into the form x=x2＋y2-1＋y（ax＋by＋c）,y=x（ax＋by＋c）,and the ellipse becomes x2＋y2=1.We prove that（i） this quadratic system is analytic integrable if and only if a=0;（ii） if x2＋y2=1 is a periodic orbit,then this quadratic system is Liouvillian integrable if and only if x2＋y2=1 is not a limit cycle;and（iii） if x2＋y2=1 is not a periodic orbit,then this quadratic system is Liouvilian integrable if and only if a=0.