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1.
Edward J. Allen 《随机分析与应用》2013,31(2):357-378
Abstract A procedure is explained for deriving stochastic partial differential equations from basic principles. A discrete stochastic model is first constructed. Then, a stochastic differential equation system is derived, which leads to a certain stochastic partial differential equation. To illustrate the procedure, a representative problem is first studied in detail. Exact solutions, available for the representative problem, show that the resulting stochastic partial differential equation is accurate. Next, stochastic partial differential equations are derived for a one-dimensional vibrating string, for energy-dependent neutron transport, and for cotton-fiber breakage. Several computational comparisons are made. 相似文献
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The Averaging Principle for Stochastic Fractional Partial Differential Equations with Fractional Noises 
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下载免费PDF全文 The purpose of this paper is to establish an averaging principle for stochastic fractional partial differential equation of order α > 1 driven by a fractional noise.
We prove the existence and uniqueness of the global mild solution for the considered
equation by the fixed point principle. The solutions for SPDEs with fractional noises
can be approximated by the solution for the averaged stochastic systems in the sense
of p-moment under some suitable assumptions. 相似文献
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Yanzhao Cao & Li Yin 《高等学校计算数学学报(英文版)》2011,4(1):38-52
This paper is concerned with the numerical approximations of
semi-linear stochastic partial differential equations of elliptic
type in multi-dimensions. Convergence analysis and error estimates
are presented for the numerical solutions based on the spectral
method. Numerical results demonstrate the good performance of the
spectral method. 相似文献
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本文研究了混合时滞的随机微分方程的稳定性,利用Lyapunov函数方法和半鞅收敛定理得到了p阶矩指数稳定和几乎必然指数稳定的判定定理.M矩阵技巧的使用使所得结果更便于应用.最后举例说明了结果的实用性. 相似文献
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Abstract In this article, we investigate the strong convergence of the Euler–Maruyama method and stochastic theta method for stochastic differential delay equations with jumps. Under a global Lipschitz condition, we not only prove the strong convergence, but also obtain the rate of convergence. We show strong convergence under a local Lipschitz condition and a linear growth condition. Moreover, it is the first time that we obtain the rate of the strong convergence under a local Lipschitz condition and a linear growth condition, i.e., if the local Lipschitz constants for balls of radius R are supposed to grow not faster than log R. 相似文献
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We prove the existence and uniqueness of Stratonovich stochastic differential equations where the coefficients and the initial
condition may depend on the whole path of the driving Wiener process. Our main hypothesis is that the diffusion coefficient
satisfies the Frobenius condition. The solution is given in terms of solutions of ordinary differential equations and the
Wiener process. We use this representation to study properties of the solution.
Accepted 3 April 1996 相似文献
9.
Tetsuya Misawa 《Annals of the Institute of Statistical Mathematics》1999,51(4):779-802
The present article focuses on the three topics related to the notions of "conserved quantities" and "symmetries" in stochastic dynamical systems described by stochastic differential equations of Stratonovich type. The first topic is concerned with the relation between conserved quantities and symmetries in stochastic Hamilton dynamical systems, which is established in a way analogous to that in the deterministic Hamilton dynamical theory. In contrast with this, the second topic is devoted to investigate the procedures to derive conserved quantities from symmetries of stochastic dynamical systems without using either the Lagrangian or Hamiltonian structure. The results in these topics indicate that the notion of symmetries is useful for finding conserved quantities in various stochastic dynamical systems. As a further important application of symmetries, the third topic treats the similarity method to stochastic dynamical systems. That is, it is shown that the order of a stochastic system can be reduced, if the system admits symmetries. In each topic, some illustrative examples for stochastic dynamical systems and their conserved quantities and symmetries are given. 相似文献
10.
Qiang Han & Shaolin Ji 《计算数学(英文版)》2023,41(2):287-304
In this paper, a stochastic linear two-step scheme has been presented to approximate backward stochastic differential equations (BSDEs). A necessary and sufficient condition is given to judge the $\mathbb{L}_2$-stability of our numerical schemes. This stochastic linear two-step method possesses a family of $3$-order convergence schemes in the sense of strong stability. The coefficients in the numerical methods are inferred based on the constraints of strong stability and $n$-order accuracy ($n\in\mathbb{N}^+$). Numerical experiments illustrate that the scheme is an efficient probabilistic numerical method. 相似文献
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ABSTRACT The stochastic theta method is a family of implicit Euler methods for approximating solutions to Itô stochastic differential equations. It is proved that the weak error for the stochastic theta numerical method is of the correct form to apply Richardson extrapolation. Several computational examples illustrate the improvement in accuracy of the approximations when applying extrapolation. 相似文献
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设{Wt.Ft.t∈[0.T]}为概率空间(Ω,P)上的标准α维Brown运动,为由它生成的自然σ-代数流.本文讨论了如下随机微分方程终值问题弱解的存在性:其中ξ∈L2(Ω,P;Rn),g:[0,T」×Rn×Rnd→Rn为有界可测函数.此外,还讨论了它在金融市场期权定价问题中的应用. 相似文献
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提出了随机微分方程的离散型波形松弛方法,证明了它是几乎必然收敛的.此外,通过数值实验验证了所得结果. 相似文献
18.
Andreas Rößler 《随机分析与应用》2013,31(1):97-134
Abstract A general class of stochastic Runge-Kutta methods for the weak approximation of Itô and Stratonovich stochastic differential equations with a multi-dimensional Wiener process is introduced. Colored rooted trees are used to derive an expansion of the solution process and of the approximation process calculated with the stochastic Runge-Kutta method. A theorem on general order conditions for the coefficients and the random variables of the stochastic Runge-Kutta method is proved by rooted tree analysis. This theorem can be applied for the derivation of stochastic Runge-Kutta methods converging with an arbitrarily high order. 相似文献
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The conditional law of an unobservable component x(t) of a diffusion (x(t),y(t)) given the observations {y(s):s[0,t]} is investigated when x(t) lives on a submanifold
of
. The existence of the conditional density with respect to a given measure on
is shown under fairly general conditions, and the analytical properties of this density are characterized in terms of the Sobolev spaces used in the first part of this series. 相似文献
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Abstract In this article, we discuss the successive approximations problem for the solutions of the semilinear stochastic differential equations in Hilbert spaces with cylindrical Wiener processes under some conditions which are weaker than the Lipschitz one. We establish the existence and the uniqueness of the solution and additionally, in our framework we consider a limiting problem for the mild solution. It is shown that the mild solution tends to the solution of the stochastic differential equation of Itô type in finite dimensional space. 相似文献