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1994
1. Ordinary Integral Equations. 2. Two Dimensional Potential Problems. 3. Boundary Element Method. 4. Linear Isoparametric Solution. 5. Quadratic Isoparametric Solution. 6. Three Dimensional Potential Problems. 7. Numerical Integration for Three Dimensional Problems. 8. Two Dimensional Elastostatics. Appendix A: Integration and Differentiation Formulae.
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1. Ordinary Integral Equations. 2. Two Dimensional Potential Problems. 3. Boundary Element Method. 4. Linear Isoparametric Solution. 5. Quadratic Isoparametric Solution. 6. Three Dimensional Potential Problems. 7. Numerical Integration for Three Dimensional Problems. 8. Two Dimensional Elastostatics. Appendix A: Integration and Differentiation Formulae.
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1995
Boundary value problems like the Laplace, Helmholtz, biharmonic, Lame, or Stokes equations discussed in §8 can be approximated in their original domain of definition by various discretisation methods. Besides the (finite) difference method there is, in particular, the finite element method («FEM»; cf. Hackbusch [2]).
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Boundary value problems like the Laplace, Helmholtz, biharmonic, Lame, or Stokes equations discussed in §8 can be approximated in their original domain of definition by various discretisation methods. Besides the (finite) difference method there is, in particular, the finite element method («FEM»; cf. Hackbusch [2]).
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Heritage and early history of the boundary element method
Engineering Analysis With Boundary Elements, 2005Alexander H -D Cheng
exaly
A two-dimensional Isogeometric Boundary Element Method for elastostatic analysis
Computer Methods in Applied Mechanics and Engineering, 2012Stéphane P A BORDAS +2 more
exaly
A finite element approach for the immersed boundary method
Computers and Structures, 2003Daniele Boffi, Lucia Gastaldi
exaly
A virtual work derivation of the scaled boundary finite-element method for elastostatics
Computational Mechanics, 2002Andrew J Deeks
exaly

