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dc.contributor.author黃韋強en_US
dc.contributor.authorHuang, Wei-Qiangen_US
dc.contributor.author林文偉en_US
dc.contributor.authorLin, Wen-Weien_US
dc.date.accessioned2014-12-12T01:30:22Z-
dc.date.available2014-12-12T01:30:22Z-
dc.date.issued2012en_US
dc.identifier.urihttp://140.113.39.130/cdrfb3/record/nctu/#GT079622806en_US
dc.identifier.urihttp://hdl.handle.net/11536/42520-
dc.description.abstract本論文探討求解二次特徵值問題及有理特徵值之高效能Arnoldi型態演算法。其研究主題可分為兩部分:(一)流固系統中非線性特徵值問題之Arnoldi型態演算法之比較;(二)求解二次特徵值問題中的半正交廣義Arnoldi法。 我們探討並分析一個具有耗散聲能吸音牆密閉空間中聲場的阻尼振動模態。利用有限元素法,我們可由位移場的棱邊離散化將問題轉變為一個求解二次特徵值問題。另一方面,若考慮壓力節點的離散則會獲得一個有理特徵值問題。透過線性化的技巧,我們可將這兩個非線性特徵值問題分別改寫成型態為$Ax=\lambda x$的廣義特徵值問題。該問題可以用Arnoldi演算法處理兩種不同型態係數矩陣, $B^{-1}A$及$AB^{-1}$, 的標準特徵值問題。數值結果顯示利用Arnoldi法求解$AB^{-1}$具有較高的精準度。 對於求解二次特徵值問題中絕對值較靠近零之特徵值所對應的特徵對,我們發展了一個正交投影法-半正交廣義Arnoldi法。此外,我們更進一步提出可精化、可重啟動的半正交廣義Arnoldi法。相較於將二次特徵值問題線性化後再利用傳統隱式重啟動Arnoldi法求解,數值實驗顯示隱式重啟動半正交廣義Arnoldi法(不論是否有精化過程)具有極佳的收斂行為。zh_TW
dc.description.abstractIn this dissertation, we consider two themes related to Arnoldi-type algorithms for solving nonlinear eigenvalue problems. We develop and analyze efficient methods for computing damped vibration modes of an acoustic fluid confined in a cavity, with absorbing walls capable of dissipating acoustic energy. The edge-based finite elements for the displacement field results in a quadratic eigenvalue problem. On the other hand, the discretization in terms of pressure nodal finite elements results in a rational eigenvalue problem. We use the linearization technique to transform these nonlinear eigenvalue problems, respectively, into generalized eigenvalue problems $Ax=\lambda x$ and apply Arnoldi algorithm to two different types of single matrices $B^{-1}A$ and $AB^{-1}$. Numerical accuracy shows that the application of Arnoldi on $AB^{-1}$ is better than that on $B^{-1}A$. For computing a few eigenpairs with smallest eigenvalues in absolute value of quadratic eigenvalue problems, we develop the semiorthogonal generalized Arnoldi method, an orthogonal projection technique. Furthermore, we propose refinable and restartable variations of this method to improve the accuracy and efficiency. Numerical examples demonstrate that the implicitly restarted semiorthogonal generalized Arnoldi method with or without refinement has superior convergence behaviors than the implicitly restarted Anoldi method applied to the linearized quadratic eigenvalue problem.en_US
dc.language.isoen_USen_US
dc.subject流固耦合zh_TW
dc.subject有限元素zh_TW
dc.subject二次特徵值問題zh_TW
dc.subject有理特徵值問題zh_TW
dc.subject縮減線性化zh_TW
dc.subjectArnoldi演算法zh_TW
dc.subject正投影zh_TW
dc.subject半正交廣義Arnoldi法zh_TW
dc.subject精化zh_TW
dc.subject精化位移zh_TW
dc.subject隱式重啟動zh_TW
dc.subjectFluid-structure interactionen_US
dc.subjectFinite elementsen_US
dc.subjectQuadratic eigenvalue problemen_US
dc.subjectRational eigenvalue problemen_US
dc.subjectTrimmed linearizationen_US
dc.subjectArnoldi algorithmen_US
dc.subjectOrthogonal projectionen_US
dc.subjectSemiorthogonal generalized Arnoldi methoden_US
dc.subjectRefinementen_US
dc.subjectRefined shiftsen_US
dc.subjectImplicit restarten_US
dc.title二次暨有理特徵值問題中高效能Arnoldi型態演算法zh_TW
dc.titleEfficient Arnoldi-Type Algorithms for Quadratic and Rational Eigenvalue Problemsen_US
dc.typeThesisen_US
dc.contributor.department應用數學系所zh_TW
Appears in Collections:Thesis


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