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Computational studies of impinging jets using \(k-\epsilon\)-turbulence models. (English) Zbl 0875.76435

MSC:
76M25 Other numerical methods (fluid mechanics) (MSC2010)
76F10 Shear flows and turbulence
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[1] and , ’The impingement of a circular jet normal to a flat surface with and without cross-flow’, Euro. Research Office Rep. AD688-953, 1969.
[2] and , ’Numerical prediction of flow in free and impinging jets’, CHAM Rep. 3181/1, 1987.
[3] Knowles, Proc. IMechE Pt. G: J. Aerosp. Eng. 205 pp 123– (1991)
[4] oral contribution to SERC CFD Community Club Workshop ’Turbulence Modelling for Impinging Flow’, Manchester, October 1991.
[5] Knowles, Int. j. numer. methods fluids 13 pp 1225– (1991)
[6] and , ’Computation of a round turbulent jet discharging into a confined cross-flow’, in Turbulent Shear Flows 2, Springer, Berlin, 1980, pp. 233-245.
[7] and , ’Turbulence and fluid/acoustic interaction in impinging jets’, Int. Powered Lift Conf., Santa Clara, CA, December 1987 /S.A.E, Paper 872345.
[8] Barata, AIAA J. Aircraft 26 pp 1002– (1989) · doi:10.2514/3.45873
[9] Turbulence Models and Their Application in Hydraulics–A State of the Art Review, IAHR, Delft, 1980.
[10] Malin, AIAA J. 26 pp 750– (1988)
[11] and , ’Numerical investigation of a jet in ground effect with a cross-flow’, Int. Powered Lift Conf., Santa Clara, CA, December 1987 /S.A.E., Paper 872344.
[12] Donaldson, J. Fluid Mech. 45 pp 281– (1971)
[13] ’Investigation into the behaviour of a single free jet in free air and impinging perpendicularly on the ground’, British Aerospace Rep. BAe-KAD-R-RES-3349, 1987.
[14] Poreh, J. Appl. Mech. 89 pp 457– (1967) · doi:10.1115/1.3607705
[15] ’Effects of streamline curvature on turbulent flow’, AGARDograph 169, 1973.
[16] and , ’Studies of impinging jet flows and radial wall jets’, Proc. Int. Symp. on Turbulence, Heat and Mass Transfer, Lisbon, August 1994, pp. 2.1.1-2.1.6.
[17] (See also ’Turbulence, heat and mass transfer’, eds. and , pp. 250-257, Begell House Inc., New York, 1996).
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