Based on the conjugate code technique, a mesoscale adjoint model is constructed, and the lateral boundary conditions of the model is discussed.
使用共轭码技术,构造了中尺度模式的伴随模式,研究了模式侧边界条件。
The shallow water tide wave model and its adjoint model are used to make the optimization test for the initial fields of current velocity and water level.
利用浅水潮波模式及其共轭模式进行了流速和水位的初始场优化试验。
Emphasis is placed on the sensitivity analysis and the design of targeted observations based on the adjoint model. Some discussions and Suggestions are presented.
重点讨论基于伴随模式的敏感性分析与目标观测设计及其相关的一些问题。
The results indicate that the adding of conventional and non-conventional observations into adjoint model system can improve the quality of initial field, thereof improve the result of forecasting.
试验表明:在伴随模式同化系统中加入常规和非常规资料,可以改进初始场,从而改善预报场。
A new method based on adjoint system and minus system to compute unstable equilibrium points on the stability boundary of power system classical model is proposed.
提出一种基于伴随系统和变号系统的求解电力系统经典模型稳定边界上不稳定平衡点的方法。
In this paper, we research that the induced series of this model is geometrically ergodicity Markov chain and this model is adjoint geometrically ergodic.
在这篇文章中,讨论了由这个模型确定的导出序列的遍历性以及该模型的伴随几何遍历性。
The example of a numerical prediction model shows the basic method of developing adjoint assimilation system of numeric predict model.
而后以一个数值预报模式为例,说明了构造伴随模式同化系统的基本方法。
Considering that the model is traditionally supposed to be exact and only initial data fields are amended in Adjoint Assimilation System (AAS).
鉴于传统的四维资料伴随模式同化系统都是假设模式完全正确仅对初始场进行修正。
The objective function was described by artificial spring model and dummy load method and the sensitivity was analyzed by the adjoint sensitivity analysis method.
通过人工弹簧模型和虚拟载荷法描述柔性机构设计的目标函数,采用伴随敏度分析法进行了敏度分析。
For continuous case, the continuous adjoint equations and boundary conditions are derived for a 2-D model.
对于二维连续模型,获得了连续形式的伴随方程及其边界条件。
The adjoint equation of the sea temperature is derived based on the modern global ocean dynamical model.
在现今海洋基本动力方程基础上导出了球坐标系下的海水温度共轭方程。
For discrete case, the discrete adjoint equations and boundary conditions are obtained for a 3-d model.
对于三维情形,获得了离散的伴随方程和边界条件。
For solving this model, an adjoint equation approach is presented, which can overcome the difficulty of computer storage. Finally, an algorithm and a flow chart are given.
针对模型求解上存在的困难,建立了一类伴随方程方法,解决了大规模地下水管理问题在内存上的困难,最后给出了一个算法和计算框图。
For solving this model, an adjoint equation approach is presented, which can overcome the difficulty of computer storage. Finally, an algorithm and a flow chart are given.
针对模型求解上存在的困难,建立了一类伴随方程方法,解决了大规模地下水管理问题在内存上的困难,最后给出了一个算法和计算框图。
应用推荐