This work is a foundation of the study of forward-backward equations.
这是研究正倒向随机微分方程的基础。
Magnetohydrodynamics equations with periodic boundary conditions are considered in this note. The time analyticity of the solutions for the equations is proved and the backward uniqueness is obtained.
考查了周期边界条件下的磁流体方程,证明了它的解关于时间是解析的,由此得到了磁流体方程的解的向后惟一性。
This Paper presents one-dimensional backward analytical solution of diffusion equations and its application to optimization of fuel utilization.
本文介绍一维扩散方程的逆向计算方法,并讨论了该方法在核燃料利用最优化分析上的应用。
We give a discretization method for the viscous terms of the two-dimensional shallow water equations , and the obtained discretized equations are used to solve the backward-facing step flow problem.
对二维浅水方程粘性项给出了一个离散方案,并将其应用于求解后台阶流动问题。
Discusses the Backward Stochastic Differential Equations with Jumps.
对带跳的倒向随机微分方程进行了研究。
The backward stochastic differential equations (BSDEs) can describe a class of investment decision-making process problems, which leads its numerical method to be focused.
倒向随机微分方程从数学上描述了一类投资决策过程,这使得它的数值解计算成为大家关注的焦点之一。
Combining the separation principle with the theory of forward and backward stochastic differential equations, we obtain the explicit observable Nash equilibrium point of this kind of game problem.
结合分离原理和正倒向随机微分方程理论,我们得到了显式的可观测的Nash均衡点。
Combining the separation principle with the theory of forward and backward stochastic differential equations, we obtain the explicit observable Nash equilibrium point of this kind of game problem.
结合分离原理和正倒向随机微分方程理论,我们得到了显式的可观测的Nash均衡点。
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