SERBA: a B.I.E. program with linear elements for 2-D elastostatics analysis SERBA is a FORTRAN77 program which applies the boundary element method to solve the elasticify equation in a 2D region, by Federico Paris and Jose Canas. The program uses linear continuous elements, and any kind of combination of boundary conditions in stresses and displacements can be considered.

References in zbMATH (referenced in 118 articles , 1 standard article )

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  1. Freitas, A.B.; Loeffler, C.F.: Performance evaluation of the boundary element recursive procedure in elastic problems (2016)
  2. Gu, Yan; Chen, Wen; Fu, Zhuo-Jia; Zhang, Bo: The singular boundary method: mathematical background and application in orthotropic elastic problems (2014)
  3. Vodička, Roman; Mantič, Vladislav; Roubíček, Tomáš: Energetic versus maximally-dissipative local solutions of a quasi-static rate-independent mixed-mode delamination model (2014)
  4. Xu, Qiang; Yang, Dong-sheng: Solving multi-domain 2D heat conduction problems by the least squares collocation method with RBF interpolation on virtual boundary (2014)
  5. Guminiak, Michał: Simplified approach of free vibration analysis of plates supported in vicinity of the corners by BEM (2013)
  6. Panagiotopoulos, C.G.; Mantič, V.; Roubíček, T.: BEM solution of delamination problems using an interface damage and plasticity model (2013)
  7. Távara, Luis; Mantič, Vladislav; Salvadori, Alberto; Gray, Leonard J.; París, Federico: Cohesive-zone-model formulation and implementation using the symmetric Galerkin boundary element method for homogeneous solids (2013)
  8. AL-Jawary, M.A.; Ravnik, Jure; Wrobel, Luiz C.; Škerget, Leopold: Boundary element formulations for the numerical solution of two-dimensional diffusion problems with variable coefficients (2012)
  9. AL-Jawary, M.A.; Wrobel, L.C.: Numerical solution of the two-dimensional Helmholtz equation with variable coefficients by the radial integration boundary integral and integro-differential equation methods (2012)
  10. Barroso, A.; Graciani, E.; Mantič, V.; París, F.: A least squares procedure for the evaluation of multiple generalized stress intensity factors at 2D multimaterial corners by BEM (2012)
  11. Huang, Jin; Zeng, Guang; He, Xiaoming; Li, Zi-Cai: Splitting extrapolation algorithm for first kind boundary integral equations with singularities by mechanical quadrature methods (2012)
  12. Lind, S.J.; Phillips, T.N.: The influence of viscoelasticity on the collapse of cavitation bubbles near a rigid boundary (2012)
  13. Messner, Michael; Schanz, Martin: A symmetric Galerkin boundary element method for 3D linear poroelasticity (2012)
  14. Távara, L.; Mantič, Vladislav; Ortiz, Jhonny E.; París, Federico: Unique real-variable expressions of the integral kernels in the somigliana stress identity covering all transversely isotropic elastic materials for 3D BEM (2012)
  15. Al-Jawary, M.A.; Wrobel, L.C.: Numerical solution of two-dimensional mixed problems with variable coefficients by the boundary-domain integral and integro-differential equation methods (2011)
  16. Au, Chi Yan; Fung, Eric S.; Ling, Leevan: Numerical methods for backward Markov chain driven Black-Scholes option pricing (2011)
  17. Blázquez, A.; París, F.: Effect of numerical artificial corners appearing when using BEM on contact stresses (2011)
  18. Buroni, Federico C.; Ortiz, Jhonny E.; Sáez, Andrés: Multiple pole residue approach for 3D BEM analysis of mathematical degenerate and non-degenerate materials (2011)
  19. Chen, Wen; Lin, Ji; Wang, Fuzhang: Regularized meshless method for nonhomogeneous problems (2011)
  20. D’Elía, J.; Battaglia, L.; Cardona, A.; Storti, M.: Full numerical quadrature of weakly singular double surface integrals in Galerkin boundary element methods (2011)

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