M/Mk,B/1算子的豫解集

首先运用Phillips定理和Fattorini定理证明M／M^k，^B／1排队模型概率瞬态解的存在唯一性，然后通过研究对应于M／M^k，^B／1排队模型的主算子的共轭算子的豫解集得到该主算子的豫解集：在虚轴上除了零点外其它所有点都属于该主算子的豫解集．     

单调函数在具有可选服务的M/M/1排队模型研究中的应用

运用函数的导数与单调性之间的关系证明具有可选服务的M/M/1排队模型的主算子的豫解集研究中出现的三个不等式.由此推出,在虚轴上除了零外其它所有点都属于该模型的主算子的豫解集.     

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.     

一类人与出租车构成的排队模型主算子的谱特征

运用C0-半群理论研究一类人与出租车构成的排队模型主算子的谱特征.首先证明0是对应于该排队模型的主算子的几何重数为1的特征值,其次证明在虚轴上除了0以外其他所有点都属于该算子的豫解集,然后证明0是该主算子共轭算子的特征值.     

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.     

寿命为爱尔兰分布的可修闭路排队模型时间依赖解的渐近性质

利用C_0-半群理论研究寿命为爱尔兰分布的可修闭路排队系统.首先利用泛函分析中的Hille-Yosida定理,Phillips定理和Fattorini定理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的特征,分别得到虚轴上除了0外其他所有点都属于该模型主算子的豫解集与0是其主算子及其共轭算子的几何重数为1的特征值.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.     

Lipschitz-α算子的M-谱理论

本文运用一个选定的可逆Lip-α算子M作为尺度算子(称为谱尺度),引入两个Banach空间之间的非线性Lip-α算子的M-豫解集、M-谱集、M-谱半径、豫解集、谱集及谱半径,证明了它们的一列系重要性质,给出了M-谱的一个摄动定理,初步建立了Lip-α算子的M-谱理论,使得现有的谱理论成为其特例.     

一类可靠性模型时间依赖解的渐近性质

研究了带无穷多个部件的，由一个可靠机器，一个不可靠机器与一个缓冲库构成的系统解的渐近性质．先讨论了对应于该系统的主算子的谱特征并且得到了在虚轴上除了0点外其它所有点都属于该主算子的豫解集，0是该主算子及其共轭算子几何重数为1的特征值．然后将该结果与作者以前的结果结合起来推出该系统的时间依赖解当时刻趋向于无穷时趋向于该系统的稳态解．     

两同型部件温贮备可修系统解的指数渐近稳定性

运用强连续半群理论研究两同型部件温贮备可修系统解的指数渐近性质,首先证明系统所生成的C0半群T(t)是拟紧的.其次证明0是对应于系统的主算子及其共轭算子的几何重数和代数重数为1的特征值,推出在右半平面和虚轴上除0以外其他所有点都属于该算子的豫解集,由此推出该系统的时间依赖解当时刻趋向于无穷时强收敛于系统的稳态解.     

Banach空间中均衡问题和弱相对非扩展映射的强收敛定理及其应用(英文)

本文在Banach空间中设计了一些新的杂交迭代算法用以逼近一类均衡问题解集和弱相对非扩展映射不动点集或极大单调算子零点集的公共元.得到了一些强收敛的结论,并将它们推广到逼近一类均衡问题解集和有限个弱相对非扩展映射公共不动点集或有限个极大单调算子公共零点集的公共元的情形.最后,展示了本文的迭代算法在最优化问题上的应用.     

M/MGk,B/1算子的预解集

本文证明了M/Gk,B/1算子的预解集含于除原点外的虚轴.     

Remarks on the Convergence of Pseudospectra

We establish the convergence of pseudospectra in Hausdorff distance for closed operators acting in different Hilbert spaces and converging in the generalised norm resolvent sense. As an assumption, we exclude the case that the limiting operator has constant resolvent norm on an open set. We extend the class of operators for which it is known that the latter cannot happen by showing that if the resolvent norm is constant on an open set, then this constant is the global minimum. We present a number of examples exhibiting various resolvent norm behaviours and illustrating the applicability of this characterisation compared to known results.     

Asymptotic and spectral properties of operator‐valued functions generated by aircraft wing model

The present paper is devoted to the asymptotic and spectral analysis of an aircraft wing model in a subsonic air flow. The model is governed by a system of two coupled integro‐differential equations and a two parameter family of boundary conditions modelling the action of the self‐straining actuators. The differential parts of the above equations form a coupled linear hyperbolic system; the integral parts are of the convolution type. The system of equations of motion is equivalent to a single operator evolution–convolution equation in the energy space. The Laplace transform of the solution of this equation can be represented in terms of the so‐called generalized resolvent operator, which is an operator‐valued function of the spectral parameter. More precisely, the generalized resolvent is a finite‐meromorphic function on the complex plane having a branch‐cut along the negative real semi‐axis. Its poles are precisely the aeroelastic modes and the residues at these poles are the projectors on the generalized eigenspaces. The dynamics generator of the differential part of the system has been systematically studied in a series of works by the second author. This generator is a non‐selfadjoint operator in the energy space with a purely discrete spectrum. In the aforementioned series of papers, it has been shown that the set of aeroelastic modes is asymptotically close to the spectrum of the dynamics generator, that this spectrum consists of two branches, and a precise spectral asymptotics with respect to the eigenvalue number has been derived. The asymptotical approximations for the mode shapes have also been obtained. It has also been proven that the set of the generalized eigenvectors of the dynamics generator forms a Riesz basis in the energy space. In the present paper, we consider the entire integro‐differential system which governs the model. Namely, we investigate the properties of the integral convolution‐type part of the original system. We show, in particular, that the set of poles of the adjoint generalized resolvent is asymptotically close to the discrete spectrum of the operator that is adjoint to the dynamics generator corresponding to the differential part. The results of this paper will be important for the reconstruction of the solution of the original initial boundary‐value problem from its Laplace transform and for the analysis of the flutter phenomenon in the forthcoming work. Copyright © 2004 John Wiley & Sons, Ltd.     

Resolvent Tests for Similarity to a Normal Operator

The main result of this paper is the resolvent similarity criterionwhich says that linear growth of the resolvent towards the spectrumis sufficient for a Hilbert space contraction with finite rankdefect operators and spectrum not covering the unit disc tobe similar to a normal operator. Similar results are provedfor operators having a spectral set bounded by a Dini-smoothJordan curve; in particular, a dissipative operator with finiterank imaginary part is similar to a normal operator if and onlyif its resolvent grows linearly towards the spectrum. Relevantresults on the insufficiency of linear resolvent growth notaccompanied by smallness of defect operators are presented.Also it is proved that there is no restriction on the spectrum,other than finiteness, which together with linear resolventgrowth implies similarity to a normal operator. The constructionof corresponding examples depends on a characterization of well-knownAhlfors curves as curves of linear length growth with respectto linear fractional transformations. 1991 Mathematics SubjectClassification: 11D25, 11G05, 14G05.     

Phase Transition in the Mechanics of Continuous Media for Big Loading

In this note a matrix partial differential operator is considered. It is shown that under certain conditions it defines a closed operator with nonempty resolvent set, and its essential spectrum is determined. In the symmetric case G.D. Raikov obtained earlier corresponding results (under slightly different assumptions) for the Friedrichs extension of the operator.     

Minimal extension of a pseudoresolvent

In a Hilbert space we consider a pseudoresolvent whose range is the whole space. We introduce a set of associated operators which are compatible with the pseudoresolvent in the same way that an operator is compatible with its resolvent. For each associated operator we construct an extension whose resolvent is an extension of the pseudoresolvent and is minimal in a certain sense.Translated from Matematicheskie Zametki, Vol. 14, No. 1, pp. 95–99, July, 1973.The author wishes to thank V. É. Lyantse for his attention to this work.     

On the resolvent of singular Sturm-Liouville operators with transmission conditions

In this article, we investigate the resolvent operator of singular Sturm-Liouville problem with transmission conditions. We obtain integral representations for the resolvent of this operator in terms of the spectral function. Later, we discuss some properties of the resolvent operator, such as Hilbert-Schmidt kernel property, compactness. Finally, we give a formula in terms of the spectral function for the Weyl-Titchmarsh function of this problem.