特徵值問題 的英文怎麼說
中文拼音 [tèzhǐzhíwèntí]
特徵值問題
英文
eigenwertproblem eigenvalue problem- 特 : Ⅰ形容詞(特殊; 超出一般) particular; special; exceptional; unusual Ⅱ副詞1 (特別) especially; v...
- 徵 : 名詞[音樂] (古代五音之一 相當于簡譜的「5」) a note of the ancient chinese five tone scale corre...
- 問 : Ⅰ動詞1 (請人解答) ask; inquire 2 (詢問; 慰問) question; ask about [after]; inquire about [aft...
- 題 : Ⅰ名詞1. (題目) subject; title; topic; problem 2. (姓氏) a surname Ⅱ動詞(寫上) inscribe; write
- 特徵 : characteristic; feature; properties; aspect; trait
- 問題 : 1 (需回答的題目) question; problem 2 (需研究解決的矛盾等) problem; matter 3 (事故或意外) tr...
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A posteriori error estimation based on stress super - convergence recovery technique for generalized eigenvalue problems
基於應力超收斂恢復技術的廣義特徵值問題后驗誤差估計The expansion of the eigenvalue on bilinear element
特徵值問題雙線性元的誤差展開計算This thesis investigates parallel solving the generalized eigenvalue problem ax - bx deeply, and proposes some new algorithms
本文從理論和實驗兩方面深入研究了分散式環境下實矩陣廣義特徵值問題ax = bx的并行計算,提出了一些新的演算法。On a class of eigenvalue problems and their applications
一類特徵值問題及其應用A class of eigenvalue problems is studied
摘要研究一類特徵值問題及其應用。The article stated here will give some remarks to the following equation in two cases : for the case > 0, the equation expresses the eigenvalue of the laplacian while for the case = 0, it is the existence of nontriv - ial bounded harmonic functions on complete noncompact manifolds
本文中我們主要分兩種情況來討論了關于laplace運算元的方程: u + u = 0 , r ~ + { 0 }對應於0 ,是riemann流形上laplace運算元的特徵值問題,而對應于= 0則是完備非緊流形上非平凡的有界調和函數的存在性問題。Eigenvalue problem for a nonlinear differential equation on a measure chain
測度鏈上非線性微分方程的特徵值問題The parallel processing for nonsymmetric generalized eigenvalue problem
非對稱廣義特徵值問題的并行演算法Eigenvalue problems for second - order dynamic equations on time scales
時間尺度上二階動力方程的特徵值問題In this paper, through treating lines reciprocal transformation to a matrix, cogradiently reach the eigenvalue and eigenvector of a matrix, to solve the question treat a eigenvalue under without parameters, and given some advanced theorems
摘要通過對矩陣進行行列互逆變換,同步求出矩陣特徵值及特徵向量,解決了不帶參數求特徵值問題,並給出一些新定理。An inverse eigenvalue problem for generalized periodic jacobi matrices
矩陣的逆特徵值問題A class of second order singularly perturbed eigenvalue problems
一類二階奇攝動特徵值問題Based on the perturbation riccati transfer matrix method, the calculating program are developed. the program can be used to the perturbation analysis and the sensitivity analysis of the real and complex, the single and repeated eigenvalues and eigenvectors for lateral vibration of rod and beam structures, especially suitable to the perturbation analysis and the sensitivity analysis of eigenvalues and eigenvectors for rotordynamic systems ; 2. the perturbation riccati transfer matrix method was applied to identify the parameters of the rotor for a boiler supply pump, and the accurate dynamic model of the rotor was archived
該程序可以對桿、梁結構橫向彎曲振動的實數、復數的孤立和重頻特徵值問題進行攝動分析和靈敏度分析,特別是適合於轉子動力學系統特徵值和特徵向量問題的攝動分析和靈敏度分析; 2 、用攝動riccati傳遞矩陣方法解決了某電站鍋爐給水泵轉子的參數識別及動力模型修改的問題,並給出了該種型號的給水泵轉子的更準確的力學模型,為進一步的轉子動力學分析與設計奠定了可靠基礎; 3 、給出了攝動理論在相關領域如隨機特徵值分析、隨機振動響應分析、可靠性分析、靈敏度分析、優化設計以及參數識別中的應用公式。Conditions of normal mode realization are deduced and optimized model with the multivariate mode indicator function as the target function is built. through solving the maximal eigenvalue problem, the original shaker force vector of appropriation is reached. then the realization approach of the optimal shaker force vector based on single shape principle is proposed and at the same time the automatization of normal mode appropriation is realized
對于模態物理分離技術的多點正弦激振純模態試驗技術,尋求其最佳激振力矢量是最為關鍵的環節,本文先推導出純模態實現的條件,建立以多變量模態指示函數為目標函數的優化模型,通過求解最大特徵值問題,得出適調純模態的初始激振力矢量,再提出以單純形原理為基礎的最佳激振力矢量的實現方法,同時也實現了純模態適調過程的自動化。It plays a very important role in many application, according to the point of mathematics point, its mostly application originate from equations of mathematical physics, difference equations, markov process, and so on, its purpose is to solve the problems of solid, fluid, electromagnetic, microscopic particles, system control, and etc. in practical science research and engineer applications, such as, architecture project, research of aeronautics and astronautics, bioscience, computing physics and oil reconnoiter, many large scale generalized eigenvalue problems need to be solved
它在很多應用中扮演非常重要的角色,從數學角度來看,矩陣特徵值問題的應用大多來自數學物理方程、差分方程、 markov過程等。目的是為了計算固體、流體、電磁、微觀粒子、系統控制等重大問題。在實際的科學研究與工程應用中,比如在建築工程、航空航天研究、生物科學、計算物理以及石油勘探中,都要涉及到大規模矩陣廣義特徵值問題的計算。Based on the properties of bisymmetric matrices, a class of constrained inverse eigenproblem and associated approximation problem for bisymmetric matrices were essentially decomposed into the same kind of subproblems for real symmetric matrices with smaller dimensions, and the solutions of the two problems were obtained by applying the conclusions of real symmetric matrices
摘要根據雙對稱矩陣的性質,將雙對稱矩陣的一類約束逆特徵值問題及其逼近問題分解成具有較小階數的實對稱矩陣的同類子問題,然後利用實對稱矩陣的結果導出雙對稱矩陣的這兩個問題的解。The improvement of ode solver method in the analysis of ode eigenvalue problem
常微分方程特徵值問題求解器解法的改進Following from the results of sensitivity analysis of standard eigenvalue problems, the differentiability of semisimple multiple eigenvalues of nonsymmetric generalized eigenvalue problems is proved, and the derivatives of semisimple multiple eigenvalues and the series expansions of the corresponding eigenvectors are obtained
摘要以標準特徵值問題靈敏度分析的有關結論為基礎,證明了單參數非對稱廣義特徵值問題半單重特徵值的可微性,給出了特徵值導數的表達式和特徵向量的級數展開式。D. x. xie, l. zhang and x. y. hu, least - square solutions of inverse eigenvalue probem of bisymmetric matrices, math. numer sinica, 1 ( 1999 ) 62 - 72
廖安平,謝冬秀,雙對稱非負定矩陣一類逆特徵值問題的最小二乘解,計算數學, 23 : 2 ( 2001 ) 209 - 218In this paper, by means of the euler systems on the symplectic manifold, the bargmann system and the neumann system for the 4f / lorder eigenvalue problems : are gained. then the lax pairs for them are nonlinearized respectively under the bargmann constraint and the neumann constraint. by means of this and based on the euler - lagrange function and legendre transformations, the reasonable jacobi - ostrogradsky coordinate systems are found, which can also be realized
本文主要通過流形上的euler系統,討論四階特徵值問題所對應的bargmann系統和neumann系統,藉助于lax對非線性化及euler - lagrange方程和legendre變換,構造一組合理的且可實化的jacobi - ostrogradsky坐標系? hamilton正則坐標系,將由lagrange力學描述的動力系統轉化為辛空間( r ~ ( 8n ) , )上的hamillton正則系統。分享友人