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References (4)
-
C. Brebbia, J. Telles, L. Wrobel (1984)
Boundary Element Techniques -
Hai-chang Hu (1984)
Variational Principles of Theory of Elasticity with Applications -
Hu Haichang (1989)
Necessary and sufficient condition for the correct formulation of boundary integral equations for harmonic functionsActa Mechanica Solida Sinica, 2
-
C. Brebbia, J. Telles, L. Wrobel, S. Mukherjee (1984)
Boundary element techniques: Theory and applications in engineering
- Publisher
- Springer Journals
- Copyright
- Copyright
- Subject
- Engineering; Theoretical and Applied Mechanics; Classical and Continuum Physics; Engineering Fluid Dynamics; Computational Intelligence
- ISSN
- 0567-7718
- eISSN
- 1614-3116
- DOI
- 10.1007/BF02487159
- Publisher site
- See Article on Publisher Site
Abstract
A boundary integral representation of plane biharmonic function is established rigorously by the method of unanalytical continuation in the present paper. In this representation there are two boundary functions and four constants which bear a one to one correspondence to biharmonic functions. Therefore the set of boundary integral equations with indirect unknowns based on this representation is equivalent to the original differential equation formulation.
Journal
Acta Mechanica Sinica – Springer Journals
Published: Aug 15, 2006