共查询到16条相似文献,搜索用时 62 毫秒
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俞励超 《数学年刊A辑(中文版)》2019,40(4):417-426
研究了Poisson随机测度驱动的线性随机微分方程的近似能控性,通过对偶方法,得到了近似能控性的一个代数判据:由方程系数决定的某种不变空间V是退化空间{0}.此外,还给出了有限步计算验证该判据的程序算法. 相似文献
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1引言对于大多数的工程实际问题,一般都是采用确定性微分方程来描述和研究的.然而在工程实际中,含有随机因素是不可避免的.如果仍然采用确定性微分方程来研究,那么只有对相应的微分方程进行摄动,或者其它的近似方法来分析.要想更加准确地研究含随机现象的工程实际问题,还是要对建立的确定性模型引入随机项,进而建立相应的随机微分方程,并进行求解.但是除了极少数类型的线性方程可以得到解析解.绝大多数的随机微 相似文献
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本文给出并分析了Poisson随机跳测度驱动的带分数Brown运动的随机比例方程半隐式Euler法的数值解,在局部Lipschitz条件下,证明了在均方意义下半隐式Euler数值解收敛到精确解. 相似文献
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熟知当随机微分方程的系数不满足Lipschitz条件,而仅满足单调性条件时,我们无法用Picard迭代法证明其解的存在性. Krylov为此对Brown运动驱动的此类方程用Euler折线逼近法证明了解的存在性.本文将Krylov的结果推广到带跳的随机微分方程,证明了Euler折线逼近的收敛性.这一结果是研究带跳的随机发展方程的基础,且对随机微分方程的数值计算有用. 相似文献
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中立型随机比例延迟微分方程平衡半隐式Euler方法的均方收敛性 总被引:1,自引:0,他引:1
本文讨论求解刚性中立型随机比例延迟微分方程的平衡半隐式Euler方法。证明了中立型随机比例延迟微分方程的平衡半隐式Euler方法是1/2阶均方收敛的。 相似文献
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非线性变延迟微分方程隐式Euler方法的数值稳定性 总被引:4,自引:0,他引:4
在减弱对非线性刚性变延迟微分方程初值问题本身的约束条件的前提下 ,将已有的文献中隐式Euler方法数值稳定性的结论由常延迟的情形推广到了变延迟的情形 ,证明了隐式Euler方法是稳定的 相似文献
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In this paper, we will present some strong convergence results for sequences of ψ-mixing random variables. The results for sequences of ψ-mixing random variables generalize the corresponding results for independent random variable sequences without any extra conditions. 相似文献
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主要研究了带跳的随机比例微分方程dX(t)=f((X(t),X(qt))dt+g(X(t),X(qt))dW(t)+∫nh(X(t),X(qt),u)N(dt,du),0≤t≤T,X(0)=X0,给出了此方程的Euler数值解,并在局部Lipschitzs条件下,证明了数值解依均方和概率测度意义下收敛于精确解. 相似文献
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Backward doubly stochastic differential equations driven by Brownian motions and Poisson process(BDSDEP) with non-Lipschitz coeffcients on random time interval are studied.The probabilistic interpretation for the solutions to a class of quasilinear stochastic partial differential-integral equations(SPDIEs) is treated with BDSDEP.Under non-Lipschitz conditions,the existence and uniqueness results for measurable solutions to BDSDEP are established via the smoothing technique.Then,the continuous dependence for solutions to BDSDEP is derived.Finally,the probabilistic interpretation for the solutions to a class of quasilinear SPDIEs is given. 相似文献
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采用改进的欧拉格式求解随机微分方程,当方程的偏移系数和扩散系数均满足全局Lipschitz条件和线性增长条件时,证明改进格式的强收敛的阶是1/2. 相似文献
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In this paper, we deal with the strong convergence of numerical methods for stochastic differential equations with piecewise continuous arguments (SEPCAs) with at most polynomially growing drift coefficients and global Lipschitz continuous diffusion coefficients. An explicit and time-saving tamed Euler method is used to solve this type of SEPCAs. We show that the tamed Euler method is bounded in pth moment. And then the convergence of the tamed Euler method is proved. Moreover, the convergence order is one-half. Several numerical simulations are shown to verify the convergence of this method. 相似文献
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随机微分方程欧拉格式算法分析 总被引:3,自引:0,他引:3
首先给出了线性随机微分方程的欧拉格式算法,然后给出了非线性随机微分方程变步长的欧拉格式算法,接着讨论了其对初值的连续依赖性和收敛性. 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