weak formulation 中文意思是什麼
weak formulation
解釋
弱公式化- weak : adj 1 柔弱的;虛弱的,有病的。2 無力的,軟弱的;(根據等)不充分的,薄弱的。3 不中用的;愚鈍的;...
- formulation : 編制
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2. using the property of the bilinear and trilinear form, a priori bound for solutions of a weak formulation is given
利用雙線性函數和三線性函數的性質,論述了各子問題的有界性、強制性以及解的先驗估計。 -
Using the formulized approach to the su ( 1, 1 ) h ( 4 ) time - dependent system, which is derived from the combination of the formulation of the time - dependent bogoliubov transformation and the evolution equation of the system, we obtain the time evolution operator, state function and heisenberg uncertainty relation of the parametric oscillator with cavity losses under the weak coupling approximation. we also discuss the squeezing property of the system
本文利用含時波戈留波夫變換與時間演化方程相結合得到的求解su ( 1 , 1 ) ? h ( 4 )量子系統的時間演化算符和演化態的普遍公式,我們導出了帶腔損耗的參數振子在弱耦合近似下的演化算符,態函數和不確定乘積,並討論了系統的壓縮特性。 -
The enterprise marketing ability strong and the weak, directly relates the enterprise marketing strategy formulation level the height, as well as whether does the marketing strategy correctly implement
企業營銷能力的強弱,直接關繫到企業營銷策略制定水平的高低,以及營銷策略能否正確實施。 -
Firstly, a weak formulation of this problem is derived. the existence, uniqueness and regularity of its solution are discussed. next, the mixed legendre - hermite polynomial approximation in non - isotropic sobolev space is proposed
首先,我們在第二章中討論無窮帶狀區域上熱傳導方程的弱形式及其解的存在性,唯一性和正則性,這種弱形式適合於數值計算。 -
In order to get a finite element formulation to analyze singular heat flux fields, the weak form of basic equations and boundary conditions describing the 2d heat conduction eigenproblems is derived for the sectorial domains in the vicinity of the interfacial crack tip
摘要為得到用於分析奇異熱流密度場的高效的有限元列式,針對不同材料中界面裂紋尖端的扇形區域,推導出二維熱傳導特徵解問題的基本方程和邊界條件的弱形式。 -
Two illustrative examples, a duffing oscillator subject to a harmonic parametric control and a driven murali - lakshmanan - chua ( mlc ) circuit imposed with a weak harmonic control, are presented here to show that the random phase plays a decisive role for control function. the method for computing the top lyapunov exponent is based on khasminskii ' s formulation for linearized systems. then, the obtained results are further verified by the poincare map analysis on dynamical behavior of the system, such as stability, bifurcation and chaos
通過兩個實例,即一類參激激勵作用下的duffing系統和一類murali - lakshmanan - chua ( mlc )電路,考察隨機相位在非反饋混沌控制中的影響與作用,利用最大lyapunov指數和poincare截面分析法證實了隨機相位確實可以用來調節系統的混沌行為,即一個小的隨機相位的擾動可能導致系統從有序轉變為無序,也可能使得系統從無序轉變為有序。
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