Nevertheless, it captures the basic dynamics 似乎简单。 然而,它夺取基本的动力学 [translate] a新鮮試讀 Tries to read freshly [translate] asorted out for 整理为 [translate] aUnsteady one-dimensional heat conduction is governed by the equation 不平稳的一维热量传导由等式治理 [translate] ...
In this paper, the membrane-pore structure be approximately considered as fractal space, 1-D heat conduction equation of the polar bear hair is established and the solution of the equation is obtained.doi:10.2298/TSCI15S1S79ZWei-Hong Zhu...
04. Heat Transfer One-Dimensional Conduction (4 of 26)是Heat Transfer 传热学 中英字幕 加州理工大学波莫纳分校的第4集视频,该合集共计27集,视频收藏或关注UP主,及时了解更多相关视频内容。
The implicit difference scheme fortwo-dimensional heat-conduction equationis presented. 给出了二维热传导方程隐式差分格式。 更多例句>> 6) three_dimensional heat conduction equation 三维热传导方程 1. A class of two_level explicit difference schemes are presented for solvingthree_dimensional heat conduction...
2) one-dimensional thermal conductive system 一维热传导系统3) One Dimensional Heat Equation 一维热传导方程 1. The Semi-discrete Finite Difference Method for Solving One Dimensional Heat Equation; 求解一维热传导方程的一种半离散差分格式4) One dimensional model of heat conduction 一维热传导模型...
2) one-dimension heat transfer model 一维传热模型 3) one-dimension 一维 1. Progresses in the Hydrothermal Synthesis of One-dimensional Nanomaterials; 水热法合成一维纳米材料的研究进展 2. Conventional method for computingone-dimensionwater environmental capacity was introduced,with non-uniformity factor ta...
Sturm-Liouville equationvolume constraintsurface constraintThis article is concerned with the shape of small devices used to control the heat flowing between a solid and a fluid phase, usually called \textsl{fin}. The temperature along a fin in stationary regime is modeled by a one-dimensional ...
The maximum principle in the case of boundary control problems involving the one-dimensional heat conduction equation 来自 ResearchGate 喜欢 0 阅读量: 25 作者: F Unger 摘要: An investigation is conducted of boundary control problems for a plate, a sphere, and a cylinder. A maximum principle ...
T. VILLA, Similarity solutions of the equation of one-dimensional heat conduction, J. Q@erenrial Equalions 35 (I 980).J. E. Boillet, D. A. D. Saravia and L. T. Villa, Similarity solutions of the equation of one-dimensional heat conduction, J. Differential Equations, 35 (1980), ...
The present study is concerned with the recovery of an unknown initial condition for a one-dimensional heat conduction equation by using only the usual two boundary conditions of the direct problem for heat equation. The algorithm assumes a function for the unknown initial condition and derives an...