附有选择性服务与无等待能力的M/G/1排队系统算子的性质

研究了附有选择性服务与无等待能力的M/G/1排队系统.运用C₀半群的理论,证明了系统算子是稠定的预解正算子,得出了系统算子的共轭算子及其定义域,并证明了系统算子的增长界为0.最后运用了预解正算子中共尾的概念及相关理论,证明了系统算子的谱上界也是0.     

附有不可靠服务台和无等待能力的M/G/1/1排队模型时间依赖解的渐近性分析[英文]

本文研究附有不可靠服务台和无等待能力的M/G/1/1排队模型时间依赖解的渐近行为.首先利用强连续算子半群理论证明此排队系统模型正时间依赖解的存在唯一性.然后通过研究该模型相应主算子的谱,分别得到0是其主算子及其共轭算子的几何重数为1的特征值与虚轴上除了0外其他所有点都属于该模型主算子的豫解集.最后将上述结果结合在一起推出该模型的时间依赖解强收敛于其稳态解.     

工作休假和休假中止的M/M/1排队系统时间依赖解的渐进性质

研究工作休假和休假中止的M/M/1排队系统时间依赖解的渐近性质.通过研究该模型主算子的共轭算子的豫解集得到在虚轴上除了0点外其它所有点都属于该主算子的豫解集,并得到0是主算子及其共轭算子几何重数为1的特征值,由此推出当时刻t趋向于无穷时模型的时间依赖解收敛于其稳态解.     

具有工作休假及休假中止的$M/M/1$排队模型的主算子的点谱

本文考虑具有工作休假及休假中止的$M/M/1$排队模型的主算子的点谱. 证明该模型主算子在左半轴有不可数无穷多个特征值. 此结果描述了主算子的点谱. 然后证明该主算子生成的$C_0$-半群的本质增长界为0,由此推出该$C_0$-半群不是紧算子、它的本质谱半径等于1. 此外,这些结果蕴含该模型的时间依赖解不可能指数收敛于其稳态解.     

关于M/M/n排队模型的动态解及稳定性

文章讨论动态 M/M/n排队模型 ,运用算子半群理论证明了该模型动态正解的存在唯一性 .并进一步表明零点是系统的一个本征值 ,相应的本征函数为系统的一个定态正解 ,系统的动态正解强稳定到定态解     

可变输入率M/M/n模型的动态解及其渐近稳定性

本文运用有界线性算子半群理论讨论了可变输入率M/M/n排队模型,证明模型主算子生成C0半群,并运用一定的技巧证明动态解渐近稳定到其定态解.     

一个C0-半群的特征值到本质增长界

本文证明第二种服务可选的M/M/1排队模型的主算子的点谱包含一个区间（-α,0）,α>0.此结果表明该主算子生成的C₀-半群不是紧算子,甚至不是最终紧算子.本文的结果与我们以前的结果合并后得到:（i）该C₀-半群的本质增长界为0.从而,该C₀-半群不是拟紧算子.（ii）该模型的时间依赖解不可能指数收敛于其稳态解.（iii）该C₀-半群的本质谱半径等于1.     

M/M/1排队模型的l~1动态解及其稳定性

运用算子半群理论证明了 M/M/1排队模型的 l1动态解的稳定性和正等距性 .     

服务中断的M/M/1重试排队模型的稳态解

研究服务中断的M/M/1重试排队模型的稳态解,证明当α+μ>λ时0不足该模型主算子的特征值.由此推出该模型不存在稳态解.     

工作休假和休假中止的M/G/1排队模型的适定性

主要研究工作休假和休假中止的M/G/1排队系统,首先将对应于此系统的数学模型转化为抽象Cauchy问题,其次证明对应于此排队模型的主算子生成正压缩C0半群T(t),然后证明T(t)是局部等距的,最后证明此模型存在唯一的非负时间依赖解。     

具有可选服务的M／M／1排队模型的一个特征值及其应用

证明0是具有可选服务的M／M／1排队模型的主算子及其共轭算子的几何重数为1的特征值,由此推出该模型的时间依赖解强收敛于该模型的稳态解．     

Integration of the Continual System of Nonlinear Interaction Waves

We derive the continual system of nonlinear interaction waves from the compatibility of the transport equation on the whole line and the equation governing the time-evolution of the eigenfunctions of the transport operator. The transport equation represents the continual generalization from the n-component system of first-order ordinary differential equations. The continual system describes a nonlinear interaction of waves. We prove that the continual system can be integrated by the inverse scattering method. The method is based on applying the results of the inverse scattering problem for the transport equation to finding the solution of the Cauchy initial-value problem for the continual system. Indeed, the transition operator for the scattering problem admits right and left Volterra factorizations. The intermediate operator for this problem determines the one-to-one correspondence between the preimages of a solution of the transport equation. This operator is related to the transition operator and admits not only right and left Volterra factorizations but also the analytic factorization. By virtue of this fact the potential in the transport equation is uniquely reconstructed in terms of the solutions of the fundamental equations in inverse problem.We introduce the generalized Lax equation. This enables us to derive the time-evolution of the transition operator. Then, the time-dependent intermediate operator is constructed. The solution of the considered Cauchy problem is expressed in terms of solutions of the fundamental equations in inverse problem. This solution is found uniquely from the given initial condition.     

一类非线性算子方程的正解问题

研究算子方程X^s+A^*X^-tA=Q的正算子解的存在性问题,通过构造有效的迭代序列,给出了算子方程X^s+A^*X^-tA=Q有正算子解的一些充分条件和必要条件,同时给出了该方程有极大解和唯一解的条件.     

无界域上一类高阶奇异T算子的Holder连续性及其应用

首先定义了Rⁿ上一类高阶奇异T算子,然后将该算子分为两部分分别讨论得到了该算子在Rⁿ上的Holder连续性,最后给出了这个算子的广义导数并通过导数和正则函数的性质给出了高维空间中的一类广义H_n方程组的解.     

M/G/1排队论系统的渐近稳定性

通过M/G/1算子的谱分析得到了M/G/1排队论系统的渐近稳定性.首先,将系统方程转化为某一合适Banach空间上的抽象Cauchy闻题,从而引入M/G/1算子.其次,分析了M/G/1算子的谱分布,得到了0是M/G/1算子的简单本征值且M/G/1算子的谱分布在左半平面的结果.最后,利用谱分析结果和算子半群理论得到了M/...     

Erratum to: Integration of the Continual System of Nonlinear Interaction Waves

We derive the continual system of nonlinear interaction waves from the compatibility of the transport equation on the whole line and the equation governing the time-evolution of the eigenfunctions of the transport operator. The transport equation represents the continual generalization from the n-component system of first-order ordinary differential equations. The continual system describes a nonlinear interaction of waves. We prove that the continual system can be integrated by the inverse scattering method. The method is based on applying the results of the inverse scattering problem for the transport equation to finding the solution of the Cauchy initial-value problem for the continual system. Indeed, the transition operator for the scattering problem admits right and left Volterra factorizations. The intermediate operator for this problem determines the one-to-one correspondence between the preimages of a solution of the transport equation. This operator is related to the transition operator and admits not only right and left Volterra factorizations but also the analytic factorization. By virtue of this fact the potential in the transport equation is uniquely reconstructed in terms of the solutions of the fundamental equations in inverse problem.     

Integral equation methods for the Yukawa-Beltrami equation on the sphere

An integral equation method for solving the Yukawa-Beltrami equation on a multiply-connected sub-manifold of the unit sphere is presented. A fundamental solution for the Yukawa-Beltrami operator is constructed. This fundamental solution can be represented by conical functions. Using a suitable representation formula, a Fredholm equation of the second kind with a compact integral operator needs to be solved. The discretization of this integral equation leads to a linear system whose condition number is bounded independent of the size of the system. Several numerical examples exploring the properties of this integral equation are presented.