×

zbMATH — the first resource for mathematics

Calculating three-dimensional fluid flows at all speeds with an Eulerian- Lagrangian computing mesh. (English) Zbl 0294.76016

MSC:
76D05 Navier-Stokes equations for incompressible viscous fluids
39A10 Additive difference equations
65Z05 Applications to the sciences
Software:
YAQUI
PDF BibTeX XML Cite
Full Text: DOI
References:
[1] Hirt, C.W.; Amsden, A.A.; Cook, J.L.; Amsden, A.A.; Hirt, C.W., YAQUI: an arbitrary Lagrangian-Eulerian computer program for fluid flow at all speeds, J. computational phys., Los alamos scientific laboratory report LA-5100, 14, 227, (1973) · Zbl 0292.76018
[2] Harlow, F.H.; Amsden, A.A., J. computational phys., 8, 197, (1971)
[3] Rizzi, A.W.; Inouye, M., Aiaa j., 11, 1478, (1973)
[4] Cline, M.C.; Hoffman, J.D., J. computational phys., 12, 1, (1973)
[5] Williams, G.P., J. fluid mech., 37, 727, (1969)
[6] Briley, W.R., J. computational phys., 14, 8-28, (1974)
[7] Caretto, L.S.; Gosman, A.D.; Patankar, S.W.; Spalding, D.B., Two calculation procedures for steady, three-dimensional flows with recirculation, () · Zbl 0255.76031
[8] Hirt, C.W.; Cook, J.L., J. computational phys., 10, 324-340, (1972)
[9] Johnson, W.E., TRIOIL (A three-dimensional version of the OIL code), Gulf general atomic, San Diego, report GAMD-7310, (June 1, 1967)
[10] Wilkins, M.L.; French, S.J.; Sorem, M., Finite-difference schemes for calculating problems in three space dimensions and time, () · Zbl 0271.76012
[11] Pracht, W.E.; Brackbill, J.U., BAAL: A code for calculating three-dimensional fluid flows at all speeds with an eulerian-Lagrangian computing mesh, Los alamos scientific laboratory report, (1974), to be published
[12] Brackbill, J.U.; Pracht, W.E., J. computational phys., 13, 455-482, (1973)
[13] Amsden, A.A.; Hirt, C.W., J. computational phys., 11, 348-359, (1972)
[14] \scR. A. Gentry, L. R. Stein AND C. W. Hirt, “Blast Loading on Three-Dimensional Structures,” manuscript in preparation. · Zbl 0366.76027
[15] \scJ. U. Brackbill, Los Alamos Scientific Laboratory, private communication (1974).
[16] \scW. E. Pracht, “Particulate Transport in Three-Dimensional Fluid Flows Through Curved and Bifurcating Vessels,” manuscript in preparation.
[17] Hotchkiss, R.S.; Hirt, C.W., Particulate transport in highly distorted three-dimensional flow fields, ()
[18] Hirt, C.W.; Cook, J.L., Perspective displays for three-dimensional finite difference calculations, J. computers fluids, (1974), accepted for publication · Zbl 0338.76016
[19] Hirt, C.W.; Harlow, F.H., J. computational phys., 2, 114-119, (1967)
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.