THE SPECTRAL RELAXATION MODEL OF THE SCALAR DISSIPATION RATE IN HOMOGENEOUS TURBULENCE
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[1] G. Batchelor. Small-scale variation of convected quantities like temperature in turbulent fluid Part 1. General discussion and the case of small conductivity , 1959, Journal of Fluid Mechanics.
[2] S. Pope,et al. Direct numerical simulations of the turbulent mixing of a passive scalar , 1988 .
[3] C. Dopazo. Probability density function approach for a turbulent axisymmetric heated jet. Centerline evolution , 1975 .
[4] G. Batchelor,et al. The effect of homogeneous turbulence on material lines and surfaces , 1952, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.
[5] R. Moser,et al. Stochastic modeling of turbulent reacting flows , 1992 .
[6] Jayesh,et al. On temperature spectra in grid turbulence , 1994 .
[7] Katepalli R. Sreenivasan,et al. On local isotropy of passive scalars in turbulent shear flows , 1991, Proceedings of the Royal Society of London. Series A: Mathematical and Physical Sciences.
[8] Brian Launder,et al. Modelling the behaviour of homogeneous scalar turbulence , 1981, Journal of Fluid Mechanics.
[9] Zellman Warhaft,et al. An experimental study of the decay of temperature fluctuations in grid-generated turbulence , 1978, Journal of Fluid Mechanics.
[10] S. Pope. An Improved Turbulent Mixing Model , 1982 .
[11] J. Janicka,et al. Closure of the Transport Equation for the Probability Density Funcfion of Turbulent Scalar Fields , 1979 .
[12] A. Obukhov,et al. Structure of Temperature Field in Turbulent Flow , 1970 .
[13] R. Curl. Dispersed phase mixing: I. Theory and effects in simple reactors , 1963 .
[14] A. Kerstein,et al. Linear eddy simulations of mixing in a homogeneous turbulent flow , 1993 .
[15] F. Gao. An analytical solution for the scalar probability density function in homogeneous turbulence , 1991 .
[16] R. Fox. Improved Fokker–Planck model for the joint scalar, scalar gradient PDF , 1994 .
[17] A. Kolmogorov. The local structure of turbulence in incompressible viscous fluid for very large Reynolds numbers , 1991, Proceedings of the Royal Society of London. Series A: Mathematical and Physical Sciences.
[18] S. Corrsin,et al. The isotropic turbulent mixer: Part II. Arbitrary Schmidt number , 1964 .
[19] R. Fox. The Fokker–Planck closure for turbulent molecular mixing: Passive scalars , 1992 .
[20] S. Pope. PDF methods for turbulent reactive flows , 1985 .
[21] Zellman Warhaft,et al. The effect of a passive cross-stream temperature gradient on the evolution of temperature variance and heat flux in grid turbulence , 1983, Journal of Fluid Mechanics.
[22] Rodney O. Fox,et al. Reactive mixing in a tubular jet reactor : a comparison of PDF simulations with experimental data , 1994 .
[23] César Dopazo,et al. A binomial Langevin model for turbulent mixing , 1991 .
[24] S. Corrsin. On the Spectrum of Isotropic Temperature Fluctuations in an Isotropic Turbulence , 1951 .
[25] Alan R. Kerstein,et al. A linear-eddy model of turbulent scalar transport and mixing , 1988 .