Boundary Integral Equation Analyses of Singular, Potential, and Biharmonic Problems
暫譯: 邊界積分方程對奇異、勢能及雙調問題的分析

Ingham, D. B., Kelmanson, M. A.

  • 出版商: Springer
  • 出版日期: 1984-08-01
  • 售價: $4,600
  • 貴賓價: 9.5$4,370
  • 語言: 英文
  • 頁數: 173
  • 裝訂: Quality Paper - also called trade paper
  • ISBN: 3540136460
  • ISBN-13: 9783540136460
  • 相關分類: 流體力學 Fluid-mechanics
  • 海外代購書籍(需單獨結帳)

商品描述

Harmonic and biharmonic boundary value problems (BVP) arising in physical situations in fluid mechanics are, in general, intractable by analytic techniques. In the last decade there has been a rapid increase in the application of integral equation techniques for the numerical solution of such problems 1,2,3]. One such method is the boundary integral equation method (BIE) which is based on Green's Formula 4] and enables one to reformulate certain BVP as integral equations. The reformulation has the effect of reducing the dimension of the problem by one. Because discretisation occurs only on the boundary in the BIE the system of equations generated by a BIE is considerably smaller than that generated by an equivalent finite difference (FD) or finite element (FE) approximation 5]. Application of the BIE in the field of fluid mechanics has in the past been limited almost entirely to the solution of harmonic problems concerning potential flows around selected geometries 3,6,7]. Little work seems to have been done on direct integral equation solution of viscous flow problems. Coleman 8] solves the biharmonic equation describing slow flow between two semi infinite parallel plates using a complex variable approach but does not consider the effects of singularities arising in the solution domain. Since the vorticity at any singularity becomes unbounded then the methods presented in 8] cannot achieve accurate results throughout the entire flow field.

商品描述(中文翻譯)

在流體力學中,出現的諧波和雙諧波邊界值問題(BVP)通常無法通過解析技術來解決。在過去十年中,使用積分方程技術來數值解決這類問題的應用迅速增加。這其中一種方法是邊界積分方程法(BIE),該方法基於格林公式,能夠將某些BVP重新表述為積分方程。這種重新表述的效果是將問題的維度降低一個維度。由於在BIE中,離散化僅發生在邊界上,因此由BIE生成的方程系統比等效的有限差分(FD)或有限元素(FE)近似生成的方程系統要小得多。BIE在流體力學領域的應用過去幾乎僅限於解決有關選定幾何形狀的潛流的諧波問題。似乎對於粘性流動問題的直接積分方程解決方案的研究很少。Coleman使用複變數方法解決了描述兩個半無限平行板之間緩慢流動的雙諧波方程,但未考慮解域中出現的奇異性影響。由於在任何奇異點的渦度變得無界,因此在文獻中提出的方法無法在整個流場中獲得準確的結果。

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