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Comparisons of TVD schemes for turbulent transonic projectile aerodynamics computations with a two-equation model of turbulence. (English) Zbl 0767.76052


MSC:

76M25 Other numerical methods (fluid mechanics) (MSC2010)
76F10 Shear flows and turbulence
76H05 Transonic flows
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[1] and , ’Thin layer approximation and algebraic model for separated turbulent flows’, AIAA Paper 78-0257, 1978.
[2] ’Turbulence modeling methods for the compressible Navier-Stokes equations’, AIAA Paper 83-1693, AIAA 16th Fluid and Plasma Dynamics Conference, 1983.
[3] and , ’On the use of wall function as boundary conditions for two-dimensional separated compressible flows’, AIAA Paper 85-0180, AIAA 23rd Aerospace Science Meeting, 1985.
[4] ’Navier-Stokes cascade analysis with a stiff {\(\kappa\)}-{\(\epsilon\)} turbulence solver’, AIAA Paper 88-0594, AIAA 26th Aerospace Science Meeting, 1988.
[5] ’A diagonally inverted LU implicit multigrid scheme for the 3-D Navier-Stokes equations and a two equation model of turbulence’, AIAA Paper 89-0467, AIAA 27th Aerospace Science Meeting, 1989.
[6] ’A two-equation model for compressible flows’, AIAA Paper 90-0494, AIAA 28th Aerospace Science Meeting, 1990.
[7] and , ’A {\(\kappa\)}-{\(\epsilon\)} near-wall formulation for separated flows’, AIAA Paper 90-1482, AIAA 21st Fluid Dynamics, Plasma Dynamics and Lasers Conference, 1990.
[8] and , ’A three-dimensional finite element Navier-Stokes solver with {\(\kappa\)}-{\(\epsilon\)} turbulence model for unstructured grids’, AIAA Paper 90-1652, AIAA 21st Fluid Dynamics, Plasma Dynamics and Lasers Conference, 1990.
[9] ’Multigrid solution of compressible turbulent flow on unstructured meshes using a two-equation turbulence model’, AIAA Paper 91-0237, AIAA 29th Aerospace Science Meeting, 1991.
[10] Sahu, AIAA J. 24 pp 1744– (1986)
[11] and , ’A theoretical and experimental investigation of a transonic projectile flow field’, AIAA Paper 82-0101, AIAA 20th Aerospace Sciences Meeting, 1982.
[12] and , ’Wind tunnel measurements of the induced surface pressures on a spinning artillery projectile model in the transonic speed regime’, Chemical Research, Development and Engineering Center, CRDEC-TR-86081, 1986.
[13] and , ’Transonic turbulent flow computations for axisymmetric afterbodies’, AIAA Paper 85-1639, AIAA 18th Fluid Dynamics, Plasma Dynamics and Lasers Conference, 1985.
[14] and , ’High accuracy TVD schemes for the {\(\kappa\)}-{\(\epsilon\)} equations of turbulence’, AIAA Paper 85-1665, AIAA 18th Fluid Dynamics, Plasma Dynamics and Lasers Conference, 1985.
[15] and , ’Flowfield computations around nozzle/afterbody configurations at transonic Mach numbers’, AIAA Paper 85-4081, AIAA 3rd Applied Aerodynamics Conference, 1985.
[16] ’Turbulence models for 3D transonic viscous flows’, AIAA Paper 89-1932, 1989.
[17] and , ’Implicit TVD schemes for hyperbolic conservation laws in curvilinear coordinated’, AIAA Paper 85-1513, Proc. AIAA 7th CFD Conference, 1985.
[18] Chien, AIAA J. 20 pp 33– (1982)
[19] Jones, Int. J. Heat Mass Transfer 15 pp 301– (1972)
[20] Roe, Ann. Rev. Fluid Mech. 18 pp 337– (1986)
[21] and , ’A comparison of finite volume flux vector splittings for the Euler equations’, AIAA Paper 85-0122. AIAA 23rd Aerospace Sciences Meeting, 1985.
[22] Pulliam, J. Comput. Phys. 39 pp 347– (1981)
[23] Yee, J. Comput. Phys. 68 pp 151– (1987)
[24] Steger, J. Comput. 40 pp 263– (1987)
[25] and , ’Recent improvements in efficiency, accuracy, and convergence for implicit approximate factorization algorithms’, AIAA Paper 85-0360, AIAA 23rd Aerospace Sciences Meeting, 1985.
[26] and , ’Generation of body fitted coordinates using hyperbolic differential equations’, FSI Report 80-1, Flow Simulations, Inc. Sunnyvale, CA, 1980.
[27] Pulliam, AIAA J. 18 pp 159– (1980)
[28] Shih, AIAA J. 19 pp 1759– (1991)
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