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The method of fundamental solutions for problems in potential flow. (English) Zbl 0546.76021

76Bxx Incompressible inviscid fluids
76M99 Basic methods in fluid mechanics
Full Text: DOI
[1] Mathon, R.; Johnston, R.L., The approximate solution of elliptic boundary-value problems by fundamental solutions, SIAM J. numer. anal., 14, 638, (1977) · Zbl 0368.65058
[2] Brebbia, C.A., The boundary element method for engineers, (1978), Halsted Press New York · Zbl 0414.65060
[3] Hsiao, G.; MacCamy, R.C., Solution of boundary value problems by integral equations of the first kind, SIAM rev., 15, 687, (1973) · Zbl 0235.45006
[4] Jaswon, M.A.; Symm, G.T., Integral equation methods in potential theory and elastostatics, (1977), Academic Press London · Zbl 0414.45001
[5] Fairweather, G.; Johnston, R.L., The method of fundamental solutions for problems in potential theory, (), 349-359 · Zbl 0546.76021
[6] Ho-Tai, S.; Johnston, R.L.; Mathon, R., Software for solving boundary-value problems for Laplace’s equation using fundamental solutions, Tech. rep. 136/79, dept. of comp. sc., university of Toronto, Canada, (1979)
[7] Martin, H.C., Finite element analysis of fluid flows, Proc. 2nd conf. matrix meth. struct. mech., (1969), Wright-Patterson AFB Ohio, USA, AFFDL-TR-68-150
[8] Brebbia, C.A.; Dominguez, J., Boundary element methods for potential problems, Appl. math. modelling, 1, 372, (1977) · Zbl 0373.31007
[9] Han, P.S. (personal communication)
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