时标上右端函数为两项和的集值微分方程解的平方收敛性

本文讨论了一类时标上右端函数为两项和的集值微分方程解的收敛性问题.首先引入时标上集值函数的Hukuhara导数意义下的Δ偏导数概念,并给出了时标上集值微分系统的比较原理.对于所构造的迭代序列,通过利用广义拟线性化方法和分析技巧,得到了上述问题近似解的平方收敛结果.     

具有比率型功能反应的时标动力学系统的周期解

研究了一类具有比率型功能反应的食物链时标动力学系统,利用重合度理论中的延拓定理讨论了此系统周期解的存在性问题,得到了保证周期解存在的充分条件,从而使这一类系统的连续与离散情形:微分方程和差分方程的周期解存在性问题得到了统一研究.     

一类时滞依赖状态的集值抽象积分微分方程的可解性

本文研究了一类时滞依赖状态的集值抽象积分微分方程的可解性问题.利用集值映射不动点定理结合分析预解算子理论的方法,证明了上述微分方程温和解的存在性,推广了现有集值微分方程的结果.     

时标上一类非自治捕食系统的周期解(英文)

本文在时标上运用迭合度理论中的Gaines和Mawhin连续性定理研究了一类非自治捕食系统的周期解的存在性,得到了此模型周期解存在的充分条件,该方法可将证明连续和离散微分方程的周期解的存在性统一起来.     

脉冲集值微分方程解的存在性

利用Leray-Schauder不动点定理,证明一类一阶脉冲集值微分方程解的存在性.     

非利普希茨条件下连续局部鞅驱动的集值随机微分方程

研究了非利普希茨条件下连续局郎鞅驱动的集值随机微分方程.这样的方程在一类随机现象的结果是多值的随机系统建模中是有用的.进而在非利普希茨条件下,集值随机微分方程解的存在唯一性得以证明.还探讨了集值随机微分方程解的稳定性.     

具有最大项的集值微分方程初边值问题的平均法

本文研究了具有最大项的集值微分方程初边值问题解的渐近性.我们通过引入Hausdorff度量和半离差度量的概念,应用平均法分别讨论了当方程右端函数平均极限存在和不存在两种情况下,原方程与平均方程解之间的渐近关系.     

高校应用数学学报第20卷(2005年)B辑(英文版)第1期目次和提要

三阶微分方程解的增长性陈宗煊 (华南师范大学数学系 )得到一类三阶齐次和非齐次线性微分方程解的级和超级的精确估计 .改进了 M.Ozawa,G.Gundersen和 J.K.Langley的结果 .代数微分方程的代数解高凌云 (暨南大学数学系 )利用 Nevanlinna值分布理论和技巧 ,讨论了二阶微分方程的代数体解的存在性问题 ,一些例子表明所得结果是精确的 .具 p-Laplacian算子型奇异泛函微分方程边值问题正解的存在性宋常修 ,翁佩萱 (华南师范大学数学系 )讨论了一类具 p-Laplacian算子型奇异泛函微分方程边值问题正解的存在性 .通过使用锥上的不动点定理 ,在…     

时标上具时滞积分-微分方程正解的存在性与稳定性（英文）

本文研究时标上一类具时滞积分-微分方程的正解的存在性与稳定性.运用Schauder不动点定理和时标上动力学方程分析理论,分别得到方程存在正δ_±移位周期解和正解的充分条件,及正解指数稳定的充分条件.最后,通过两个数值例子来说明结果的可行性.     

时标上具有阶段结构的三种群捕食系统的周期解

研究了时标上具有阶段结构的三种群捕食系统.运用时标上连续拓扑度定理,得到了系统存在周期解的充分条件.其研究方法使系统的连续时间情形和离散时间情形的周期解问题得到了统一,被广泛地应用来研究微分方程和差分方程的周期解的存在问题.     

Phase spaces and periodic solutions of set functional dynamic equations with infinite delay

Very recently, a new theory known as set dynamic equations on time scales has been built. In this paper, a phase space is built for set functional dynamic equations with infinite delay on time scales and sufficient criteria are established for the existence of periodic solutions of such equations, which generalize and incorporate as special cases some known results for set differential equations and for set difference equations when the time scale is the real number set or the integer set, respectively, moreover, for differential inclusions and difference inclusions if the variable under consideration is a single valued mapping. Our results show that one can unify the study of some continuous or discrete problems in the sense of (set) dynamic equations on general time scales.     

Exponential stability for set dynamic equations on time scales

A new theory known as set dynamic equations on time scales has been built. The criteria for the equistability, equiasymptotic stability, uniform and uniformly asymptotic stability were developed in Hong (2010) [1]. In this paper, we consider the exponential stability, exponentially asymptotic stability, uniform and uniformly exponentially asymptotic stability for the trivial solution of set dynamic equations on time scales by using Lyapunov-like functions.     

A Survey on Existence Results for Boundary Value Problems of Nonlinear Fractional Differential Equations and Inclusions

In this survey paper, we shall establish sufficient conditions for the existence and uniqueness of solutions for various classes of initial and boundary value problem for fractional differential equations and inclusions involving the Caputo fractional derivative. The both cases of convex and nonconvex valued right hand side are considered. The topological structure of the set of solutions is also considered.     

Convex extensions of the convex set valued maps

In this article the existence of the convex extension of convex set valued map is considered. Conditions are obtained, based on the notion of the derivative of set valued maps, which guarantee the existence of convex extension. The conditions are given, when the convex set valued map has no convex extension. The convex set valued map is specified, which is the maximal convex extension of the given convex set valued map and includes all other convex extensions. The connection between Lipschitz continuity and existence of convex extension of the given convex set valued map is studied.     

Ulam-type stability for differential equations driven by measures

Based on a notion of Stieltjes derivative of a function with respect to another function, we provide Ulam–Hyers type stability results for nonlinear differential equations driven by measures on compact or on unbounded intervals, in the lack of Lipschitz continuity assumptions. In particular, one can deduce stability results for generalized differential equations, dynamic equations on time scales or impulsive differential equations (including the case of an infinite number of impulses that accumulate in the considered interval, thus allowing the study of Zeno hybrid systems).     

关于多正解问题的某些研究

本文以ｆｐ 同伦方法为工具，借助于一些适当的变换，研究有序的（Ｂ）空间中的集值映象方程的多正解问题；在文中的有关工作中，还使用了集值映象的拟导数的某些性质．     

Smooth factorizations of matrix valued functions and their derivatives

Summary In this paper we study the numerical factorization of matrix valued functions in order to apply them in the numerical solution of differential algebraic equations with time varying coefficients. The main difficulty is to obtain smoothness of the factors and a numerically accessible form of their derivatives. We show how this can be achieved without numerical differentiation if the derivative of the given matrix valued function is known. These results are then applied in the numerical solution of differential algebraic Riccati equations. For this a numerical algorithm is given and its properties are demonstrated by a numerical example.     

Periodic solutions of functional dynamic equations with infinite delay

In this paper, sufficient criteria are established for the existence of periodic solutions of some functional dynamic equations with infinite delays on time scales, which generalize and incorporate as special cases many known results for differential equations and for difference equations when the time scale is the set of the real numbers or the integers, respectively. The approach is mainly based on the Krasnosel’ski? fixed point theorem, which has been extensively applied in studying existence problems in differential equations and difference equations but rarely applied in studying dynamic equations on time scales. This study shows that one can unify such existence studies in the sense of dynamic equations on general time scales.     

Reynold''s Transport Theorem for Differential Inclusions

The well-known Reynold's Transport Theorem deals with the integral over a time-dependent set (that is evolving along a smooth vector field) and specifies its semiderivative with respect to time. Here reachable sets of differential inclusions are considered instead. Dispensing with any assumptions about the regularity of the compact initial set, we give sufficient conditions on the differential inclusion for the absolute continuity (of the integral) with respect to time and its weak derivative is formulated as a Hausdorff integral over the topological boundary.     

Reynold's Transport Theorem for Differential Inclusions

The well-known Reynold's Transport Theorem deals with the integral over a time-dependent set (that is evolving along a smooth vector field) and specifies its semiderivative with respect to time. Here reachable sets of differential inclusions are considered instead. Dispensing with any assumptions about the regularity of the compact initial set, we give sufficient conditions on the differential inclusion for the absolute continuity (of the integral) with respect to time and its weak derivative is formulated as a Hausdorff integral over the topological boundary.