References
- T.S. Lundgren, Linearly forced isotropic turbulence, Center Turbul. Res. Annu. Res. Briefs. (2003), pp. 461–473.
- K. Alvelius, Random forcing of three-dimensional homogeneous turbulence, Phys. Fluids. 11 (1999), pp. 1880–1889.
- V. Eswaran and S.B. Pope, An examination of forcing in direct numerical simulations of turbulence, Comput. Fluids. 16 (1988), pp. 257–278.
- E.D. Siggia and G.S. Patterson, Intermittency effects in a numerical simulation of stationary three-dimensional turbulence, J. Fluid Mech. 86 (1978), pp. 567–592.
- N.P. Sullivan, S. Mahalingam, and R.M. Kerr, Deterministic forcing of homogeneous, isotropic turbulence, Phys. Fluids. 6 (1994), pp. 1612–1614.
- S. Chen, G.D. Doolen, R.H. Kraichnan, and Z. She, On statistical correlations between velocity increments and locally averaged dissipation in homogeneous turbulence, Phys. Fluids A. 5 (1993), pp. 458–463.
- C. Rosales and C. Meneveau, Linear forcing in numerical simulations of isotropic turbulence: Physical space implementations and convergence properties, Phys. Fluids. 17 (2005), pp. 1–8.
- T. de Karman and L. Howarth, On the statistical theory of isotropic turbulence, Proc. Royal Soc. London. Ser. A. 164 (1938), pp. 192–215.
- F. Moisy, P. Tabeling, and H. Willaime, Kolmogorov equation in a fully developed turbulence experiment, Phys. Rev. Lett. 82 (1999), pp. 3994–3997.
- R.A. Antonia and P. Burattini, Approach to the 4/5 law in homogeneous isotropic turbulence, J. Fluid Mech. 550 (2006), pp. 175–184.
- D. Fukayama, T. Oyamada, T. Nakano, T. Gotoh, and K. Yamamoto, Longitudinal structure functions in decaying and forced turbulence, J. Phys. Soc. Japan. 69 (2000), pp. 701–715.
- S.B. Pope, Turbulent Flows, Cambridge University Press, Cambridge, 2000.
- Y. Gagne, B. Castaing, C. Baudet, and Y. Malecot, Reynolds dependence of third-order velocity structure functions, Phys. Fluids. 16 (2004), pp. 482–485.
- L. Mydlarski and Z. Warhaft, On the onset of high-Reynolds-number grid-generated wind tunnel turbulence, J. Fluid Mech. 320 (1996), pp. 331–368.
- O. Desjardins, G. Blanquart, G. Balarac, and H. Pitsch, High order conservative finite difference scheme for variable density low Mach number turbulent flows, J. Comput. Phys. 227 (2008), pp. 7125–7159.
- Y. Morinishi, O.V. Vasilyev, and T. Ogi, Fully conservative finite difference scheme in cylindrical coordinates for incompressible flow simulations, J. Comput. Phys. 197 (2004), pp. 686–710.
- J. Qian, Inertial range and the finite Reynolds number effect of turbulence, Phys. Rev. E. 55 (1997), pp. 337–342.
- S.G. Saddoughi and S.V. Veeravalli, Local isotropy in turbulent boundary layers at high Reynolds number, J. Fluid Mech. 268 (1994), pp. 333–372.
- A.S. Monin and A.M. Yaglom, Statistical Fluid Mechanics: Mechanics of Turbulence, The MIT Press, Cambridge, 1975.
- J. Qian, Slow decay of the finite Reynolds number effect of turbulence, Phys. Rev. E. 60 (1999), pp. 3409–3412.
- T.S. Lundgren, Kolmogorov two-thirds law by matched asymptotic expansion, Phys. Fluids. 14 (2002), pp. 638–642.