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A triangular finite element mesh generator for fluid dynamic systems of arbitrary geometry. (English) Zbl 0445.76037


MSC:

76E20 Stability and instability of geophysical and astrophysical flows
85A05 Galactic and stellar dynamics
65N30 Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs
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References:

[1] The Finite Element Method, 3rd edn, McGraw-Hill, London, 1977.
[2] Finite Element Analysis in Fluid Dynamics, McGraw-Hill, London, 1978.
[3] , Finite Element Simulation in Surface and Subsurface Hydrology, Academic Press, New York, 1977.
[4] and , ’Mesh generation–a survey’, J. Eng. Ind. ASME Trans., 332-338 (1973).
[5] Frederick, Int. J. num. Meths Engng 2 pp 1933– (1970)
[6] and , ’Automatic mesh generation for finite element analysis’, in Advances in Computational Methods in Structural Mechanics and Design (Eds. et al.), UAH Press, Huntsville, Al., 1972.
[7] Cavendish, Int. J. num. Meths Engng 8 pp 679– (1974)
[8] Shaw, Int. J. num. Meths Engng 12 pp 93– (1978)
[9] and , ’GIFTS 4 users manual graphics-oriented interactive finite element time-sharing system’, AME Dept., University of Arizona, Tucson, Az. (1974).
[10] and , ’Finite element mesh generation for planar and shell type structures’, General Motors Research Lab., Warren, Mi., 1975. · doi:10.1145/800207.806419
[11] Carey, Comput. Methods Appl. Mech. Eng. 7 pp 93– (1976)
[12] Melosh, Int. J. num. Meths Engng 11 pp 1083– (1977)
[13] Bykat, Int. J. num. Meths Engng 11 pp 194– (1977)
[14] ’Automated finite element grid break-up method–a verification of the six node averaging approach in applications of computer graphics in engineering’, NASA SP-390 (October 1975).
[15] ’Equipotential zoning of 2-D meshes’, Lawrence Rad. Lab., University of California, Livermore, Ca. (1963).
[16] ’QMESH: a self-organizing mesh generation program’, Sandia Lab., Albuquerque, N.M., SLA-73-1088 (1974).
[17] and , ’Geographical data systems: overview and concepts’, ORNL/RUS-27 (1979).
[18] et al., ’TRIFEM 1: A 2-D finite element mesh generator and preprocessor for fluid flow problems in straight channels’, ORNL/TM-6349 (1978).
[19] and , ’TRIFEM 2: a triangular finite element mesh generator for fluid flow models of arbitrary geometry’, Oak Ridge National Lab, ORNL/TM (to be issued September 1980).
[20] ’Software for C surface interpolation’, Mathematical Software III (Eds. J. R. Rice et al.), 1977.
[21] McLain, Comp. J. 19 pp 178– (1976) · Zbl 0321.65009 · doi:10.1093/comjnl/19.2.178
[22] and , ’Perspectives on lake ecosystem modeling’, Ann Arbor Sci. (1979).
[23] et al., ’A computer simulation model for the striped bass young-of-the-year population in the Hudson River’, Oak Ridge National lab., ORNL/NUREG-8 (1976).
[24] et al., ’Interactive computer code for discretizing arbitrary surface water systems into completely mixed compartments’, RPI, Dept. of Chem. & Env. Eng., Troy, N. Y.(in preparation).
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