时间离散的 meaning in English
time discrete
Examples
- In the fourth section , we obtain the laplace transform of the waiting time of the three queues and the mean waiting time of them by using the results of the second section
第三章考虑的是一个两个队输入的带决策时间的非绝对优先的月b d 1系统,这是一个时间离散的排队系统。 - In this dissertation , finite volume method , explicit runge - kutta time - marching scheme and " dual - time stepping method " are employed to solve the governing equations . both inviscid and viscous steady flows around two - dimensional cylinder , flat - plate and airfoils are simulated , and unsteady flows for airfoil in arbitrary motion are also calculated
控制方程采用中心格式有限体积法进行空间离散,对于定常流动,运用runge - kutta显式多步法进行时间推进求解,非定常流动采用隐式时间离散的“双时间法” ( dual - timesteppingmethod )进行推进求解。 - The mainly objective includes two parts : one is to develop the mathematical m odel t o study t he flow m echanism o f 1 iquid i n t he b ed of tbr , and the other is to study the technology and device to distribute the liquid uniformly . in the first part , some theoretical models were established to simulate the distribution of flow rate of liquid , such as discrete model , differential calculus model and stochastic model . but these models are difficult to calculate or ca n ' t lead to good results
在理论模型方面,前人提出了离散模型、微分模型和随机模型等来模拟液体的径向和轴向流率分布,但仍然存在许多问题,往往计算工作量大且常偏离实际情况,本文作者在导师的指导下,参照前人的研究成果,在滴流床的流率分布中采用了状态离散、时间离散的markov过程描述了滴流床的流率分布,结果与实验值吻合较好。 - Supposed that the fluid in all the fields will accomplish a transport in down - flow distance a z , the flow in trickle - bed is a m step markov process , where m = z / z ( z - the height of trickle - bed ) . according to the theory of random process , the statistic of the markov process will be calculated out from the original distribution and state - transport matrix
假定液体从床层上端面向下流过z距离后,处于各区的流体就实现了一步转移,则可将床内液体的流动视为从一个初始分布开始,经过m步( m = z z , z为床层高度)转移的状态离散、滴流床流率分布的模拟与整流时间离散的markov过程。 - For quantitative analysis of the combat platform fire application , the markov chain model of combat platform with reciprocal striking , hasty break through and shooting to dense target is studied by setting up markov chain which state and time are discrete according to the markov property in this process
摘要针对定量分析战斗平台火力运用问题,根据该过程所具有的马尔可夫性特点,将其描述为状态离散、时间离散的马尔可夫链,由此研究了一对一格斗、仓促突破战斗、对密集目标群射击等情况下的马尔可夫链模型。