The general boundary element method and its further generalizations
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Publication:3835906
DOI<627::AID-FLD894>3.0.CO;2-9 10.1002/(SICI)1097-0363(19991015)31:3<627::AID-FLD894>3.0.CO;2-9zbMath0954.76060OpenAlexW2096441370MaRDI QIDQ3835906
Publication date: 8 February 2001
Full work available at URL: https://doi.org/10.1002/(sici)1097-0363(19991015)31:3<627::aid-fld894>3.0.co;2-9
homotopystrongly nonlinear problemsgeneral boundary element methodnon-iterative approachnon-zero parameter
Boundary element methods applied to problems in fluid mechanics (76M15) Boundary element methods for boundary value problems involving PDEs (65N38)
Related Items (7)
A spectral relaxation approach for unsteady boundary-layer flow and heat transfer of a nanofluid over a permeable stretching/shrinking sheet ⋮ A multigrid approach for steady state laminar viscous flows ⋮ Some notes on the general boundary element method for highly nonlinear problems ⋮ Notes on the homotopy analysis method: some definitions and theorems ⋮ Homotopy method of fundamental solutions for solving certain nonlinear partial differential equations ⋮ Homotopy method of fundamental solutions for solving nonlinear heat conduction problems ⋮ A direct boundary element approach for unsteady nonlinear heat transfer problems
Cites Work
- A kind of approximation solution technique which does not depend upon small parameters. II: An application in fluid mechanics
- General boundary element method for nonlinear heat transfer problems governed by hyperbolic heat conduction equation
- A fast Poisson solver for complex geometries
- An approximate solution technique not depending on small parameters: A special example
- Integral equation methods for Stokes flow and isotropic elasticity in the plane
- A direct adaptive Poisson solver of arbitrary order accuracy
- HIGH-ORDER BEM FORMULATIONS FOR STRONGLY NON-LINEAR PROBLEMS GOVERNED BY QUITE GENERAL NON-LINEAR DIFFERENTIAL OPERATORS. PART 2: SOME 2D EXAMPLES
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