The Quantum Faedo-Galerkin Equation: Evolution Operator and Time Discretization

Time dependent quantum systems have become indispensable in science and nanotechnology. Disciplines including chemical physics and electrical engineering have used approximate evolution operators to solve these systems for targeted physical quantities. Here, we discuss the approximation of closed time dependent quantum systems on bounded domains via evolution operators. The work builds upon the use of weak solutions, which includes a framework for the evolution operator based upon dual spaces. We are able to derive the corresponding Faedo-Galerkin equation as well as its time discretization, yielding a fully discrete theory. We obtain corresponding approximation estimates. These estimates make no regularity assumptions on the weak solutions, other than their inherent properties. Of necessity, the estimates are in the dual norm, which is natural for weak solutions. This appears to be a novel aspect of this approach.     

谱问题、发展方程族及Lax表示的等价性

讨论了四对谱问题、相应的保谱方程族以及它们Ｌａｘ表示的等价住，并利用这种等价关系可导出一些方程的Ｌａｘ表示．     

一类非线性演化方程新的行波解

利用双函数法和吴消元法,得到了一类非线性演化方程在不同情况下的一系列显示精确解.Sinh-Gordon方程及Klein-Gordon方程作为该方程的特例也得到了相应的行波解.     

Analyticity and exponential stability of semigroups for the elastic systems with structural damping in Banach spaces

In this paper, we consider a second order evolution equation in a Banach space, which can model an elastic system with structural damping. New forms of the corresponding first order evolution equation are introduced, and their well-posed property is proved by means of the operator semigroup theory. We give sufficient conditions for analyticity and exponential stability of the associated semigroups.     

Construction of time-inhomogeneous Markov processes via evolution equations using pseudo-differential operators

For a pseudo-differential operator with symbol which is time-and space-dependent, elliptic and continuous negative definite,the corresponding evolution equation is solved. Further, itis shown that the solution defines a Markov process. In general,this will be a time- and spaceinhomogeneous jump process. Tosolve the evolution equation, we combine a fixed-point methodwith the symbolic calculus for negative definite symbols developedby Hoh. The properties of the fundamental solution which ensurethe existence of a corresponding Markov process are proved alongthe lines of Eidelman, Ivasyshen and Kochubei. However, insteadof hyper-singular integral representations, we use the pseudo-differentialoperator representation together with the positive maximum principleto obtain the required properties.     

On some dynamic thermal non clamped contact problems

We study a class of dynamic thermal sub-differential contact problems with friction, for long memory visco-elastic materials, without the clamped condition, which can be put into a general model of system defined by a second order evolution inequality, coupled with a first order evolution equation. We present and establish an existence and uniqueness result, by using general results on first order evolution inequality, with monotone operators and fixed point methods. Finally a fully discrete scheme for numerical approximations is provided, and corresponding various numerical computations in dimension two will be given.     

基于随机Petri网的震后次生灾害演化模型研究

针对震后次生灾害的演化问题,本文采用多案例分析方法提取地震及其次生灾害事件的属性,从属性层次按照“事件类型、关键属性、从属属性、环境属性和危害评估属性”对其进行结构化描述,分析震后次生灾害事件的属性特征,绘出了震后次生灾害演化Petri网模型。在此基础上,以渐变型次生灾害事件——震后瘟疫为例,根据随机Petri网与马尔科夫链的同构关系,构建了震后瘟疫事件演化系统随机Petri网模型。最后,通过马尔科夫链及相关数学方法对震后瘟疫事件演化系统进行了评估,分析其中的均衡状态及其变动规律,验证了模型的有效性,为应对地震次生灾害事件提供科学的应急决策支持。     

Modeling general laws of spatial–temporal evolution of society: hyperbolic growth and historical cycles

The article investigates a distributed model of global evolution of humanity. The model utilizes a onedimensional quasilinear heat equation with a volume source and a nonlinear thermal conductivity coefficient. The model is applied to describe cyclic processes that unfolded over the entire span of human evolution against the backdrop of general population growth with blowup. The model parameters are chosen so that they satisfy the following requirements: the space integral (total population size) increases hyperbolically; the evolution of the system goes through 11 stages corresponding to the main historical epochs in accepted classification and matches actual quantitative indicators.     

Approximate controllability of evolution systems with nonlocal conditions

We study the approximate controllability for the abstract evolution equations with nonlocal conditions in Hilbert spaces. Assuming the approximate controllability of the corresponding linearized equation we obtain sufficient conditions for the approximate controllability of the semilinear evolution equation. The results we obtained are a generalization and continuation of the recent results on this issue. At the end, an example is given to show the application of our result.     

Smoothed affine Wigner transform

We study a generalization of Husimi function in the context of wavelets. This leads to a nonnegative density on phase-space for which we compute the evolution equation corresponding to a Schrödinger equation.     

Proximal penalty-duality algorithms for mixed optimality conditions

Preconditioned proximal penalty-duality two- and three-field algorithms for mixed optimality conditions, of evolution mixed constrained optimal control problems, are considered. Fixed point existence analysis is performed for corresponding evolution mixed governing variational state systems, in reflexive Banach spaces. Further, convergence analysis of the proximal penalty-duality algorithms is established via fixed point characterizations. In both analysis, a resolvent fixed point variational strategy is applied.     

Composition duality methods for quasistatic evolution elastoviscoplastic variational problems

Composition duality methods for dual quasistatic evolution elastoviscoplastic variational problems are studied. Dual evolution mixed analysis is performed, as well as corresponding primal static mixed analysis. For multi-constitutive modeling and parallel computing, macro-hybrid variational formulations are further considered at the continuous level.     

Stable synthesis of optimal control in stationary extremal problems

We consider optimal control problems for stationary systems whose solutions are unstable singular points of the corresponding evolution equations. We suggest a construction of a feedback control stabilizing the optimal state.     

On a hyperbolic-parabolic system arising in magnetoelasticity

The evolution of a magnetoelastic material is described by a nonlinear hyperbolic-parabolic system. We introduce a simplified but nontrivial model and prove the existence of a unique solution to the corresponding initial boundary value problem.     

Stochastic Vorticity and Associated Filtering Theory

The focus of this work is on a two-dimensional stochastic vorticity equation for an incompressible homogeneous viscous fluid. We consider a signed measure-valued stochastic partial differential equation for a vorticity process based on the Skorohod--Ito evolution of a system of N randomly moving point vortices. A nonlinear filtering problem associated with the evolution of the vorticity is considered and a corresponding Fujisaki--Kallianpur--Kunita stochastic differential equation for the optimal filter is derived.     

Periodic Structure of 2-D Navier-Stokes Equations

We study in this article both the structure and the structural evolution of the solutions of 2-D Navier-Stokes equations with periodic boundary conditions and the evolution of their solutions. First the structure of all eigenvectors of the corresponding Stokes problem is lassified using a block structure, and is linked to the typical structure of the Taylor vortices. Then the structure of the solutions of the Navier-Stokes equations forced either by eigenmodes or by potential forcing is classified.     

ON A SEMILINEAR MRABOLIC EQUATION SYSTEM WITH NONLOCAL AND COUPLED BOUNDARY CONDITIONS

1IntroductionInthestudyofquasi-statethermoelasticity,Deng[1-2]derivedamathemati-calmodelwhichinvolvesalinearparabolicequationwithanonlocalboundarycondition.Thismodelhasbeenextendedtomoregeneralsemilinearparabo-licequationsinhigh-dimensiondomainsbyFriedman[5]andKawohlI6],andmorerecentlybyDeng[3],Yin[13],Paol8-lo]andWang[11],andvariouscomparison,estimateandstabilityresultshavebeenobtained.InhtispaperweextendtheproblemofPao[9]tothefollowingproblemwithmoregeneralcoupledboundaryconditions(PE):w…     

Decay estimates for quasi-linear evolution equations

We consider global strong solutions of the quasi-linear evolution equations (1.1) and (1.2) below, corresponding to sufficiently small initial data, and prove some stability estimates, as t→+∞, that generalize the corresponding estimates in the linear case.     

A variational principle for gradient flows in metric spaces

We present a novel variational approach to gradient-flow evolution in metric spaces. In particular, we advance a functional defined on entire trajectories, whose minimizers converge to curves of maximal slope for geodesically convex energies. The crucial step of the argument is the reformulation of the variational approach in terms of a dynamic programming principle, and the use of the corresponding Hamilton–Jacobi equation. The result is applicable to a large class of nonlinear evolution PDEs including nonlinear drift-diffusion, Fokker–Planck, and heat flows on metric-measure spaces.     

Averaging principle for perturbed random evolution equations and corresponding Dirichlet problems

Summary We continue the study of exit problems for perturbed random evolution equations corresponding to the weakly coupled elliptic PDE systems. In the present paper we consider the cases where the corresponding random evolutions stay in a given domain for ever with probability one, but do not hinder the exit of the perturbed process. We treat such problems by methods based on the averaging principle. In such a way we also study the asymptotic behavior of the solutions of the corresponding perturbed Dirichlet problems.Supported in part by US-Israel BSFSponsored in part by the Landau Center for Mathematical Research in Analysis supported by the Minerva Foundation (Federal Republic of Germany)