References
- T. Mizushina, H. Usui, and T. Yoshida, Turbulent pipe flow of dilute polymer solutions, J. Chem. Eng. Jpn. 7 (1973), pp. 162–167.
- F. Durst and A.K. Rastogi, Calculations of turbulent boundary layer flows with drag reducing polymer additives, Phys. Fluids 20 (1977), pp. 1975–1985.
- S. Hassid and M. Poreh, A turbulent energy dissipation model for flows with drag reduction, J. Fluids Eng. 100 (1978), pp. 107–112.
- S. Politis, Turbulence modelling on inelastic power-law fluids, Internal report 52, BRITE project RIIB.0085.UK, Imperial College of Science, Technology and Medicine, London, UK, 1989.
- M.R. Malin, Turbulent pipe flow of power-law fluids, Int. Commun. Heat Mass Transfer 24 (1997), pp. 977–988.
- D.O.A. Cruz, C.E. Maneschy, and E.N. Macedo, A turbulence model for computing the flow of power law fluids within circular tubes, Hybrid Methods Eng. 2 (2000), pp. 1–13.
- F.T. Pinho, A GNF framework for turbulent flow models of drag reducing fluids and proposal for a k-ϵ type closure. J. Non-Newton Fluid Mech. 114 (2003), pp. 149–184.
- D.O.A. Cruz and F.T. Pinho, Turbulent pipe flow predictions with a low Reynolds number k-ϵ model for drag reducing fluids, J. Non-Newton Fluid Mech. 114 (2003), pp. 109–148.
- D.O.A. Cruz, F.T. Pinho, and P.R. Resende, Modeling the new stress for improved drag reduction predictions of viscoelastic pipe flow, J. Non-Newton Fluid Mech. 121 (2004), pp. 127–141.
- P.R. Resende, M.P. Escudier, F. Presti, F.T. Pinho, and D.O.A. Cruz, Numerical predictions and measurements of Reynolds normal stresses in turbulent pipe flow of polymers, Int. J. Heat Fluid Flow 27 (2006), pp. 204–219.
- C.F. Li, R. Sureshkumar, and B. Khomami, Influence of rheological parameters on polymer induced turbulent drag reduction, J. Non-Newton Fluid Mech. 140 (2006), pp. 23–40.
- C.D. Dimitropoulos, R. Sureshkumar, and A.N. Beris, Direct numeric simulation of viscoelastic turbulent channel flow exhibiting drag reduction: Effect of variation of rheological parameters, J. Non-Newton Fluid Mech. 79 (1998), pp. 433–468.
- B. Yu and Y. Kawaguchi, Effect of Weissenberg number on the flow structure: DNS study of drag reducing flow with surfactant additives, Int. J. Heat Fluid Flow 24 (2003), pp. 491–499.
- P.K. Ptasinski, B.J. Boersma, F.T.M. Nieuwstadt, M.A. Hulsen, B.H.A.A. Van Den Brule, and J.C.R. Hunt, Turbulent channel flow near maximum drag reduction: Simulation, experiments and mechanisms. J. Fluid Mech. 490 (2003), pp. 251–291.
- G. Lielens, R. Keunings, and V. Legat, The FENE-L and FENE-LS closure approximations to the kinetic theory of finitely extensible dumbbells, J. Non-Newton Fluid Mech. 87 (1999), pp. 179–196.
- Q. Zhou and R. Akhavan, A comparison of FENE and FENE-P dumbbell and chain models in turbulent flow, J. Non-Newton Fluid Mech. 109 (2003), pp. 115–155.
- C.F. Li, V.K. Gupta, R. Sureshkmar, and B. Khomami, Turbulent channel flow of dilute polymeric solutions: Drag reduction scaling and an eddy viscosity model, J. Non-Newton Fluid Mech. 139 (2006), pp. 177–189.
- F.T. Pinho, C.F. Li, B.A. Younis, and R. Sureshkumar, A low Reynolds number k-ϵ turbulence model for FENE-P viscoelastic fluids, J. Non-Newton Fluid Mech. 154 (2008), pp. 89–108.
- P.R. Resende, K. Kim, B.A. Younis, R. Sureshkumar, and F.T. Pinho, A k-ϵ turbulence model for FENE-P fluid flows at low and intermediate regimes of polymer-induced drag reduction, J. Non-Newton Fluid Mech. 166 (2011), pp. 639–660.
- P.R. Resende, F.T. Pinho, B.A. Younis, K. Kim, and R. Sureshkumar, Development of a low-Reynolds-number k-ωmodel for FENE-P fluids, Flow Turbul. Combust. 90 (2013), pp. 69–94.
- Y. Dubief, G. Laccarino, and S.K. Lele, A turbulence model for polymer flows, Int. Rep., Annual Research Brief, Center for Turbulence Research, Stanford, CA,2004.
- G. Iaccarino, E.S.G. Shaqfeh, and Y. Dubief, Reynolds-averaged modeling of polymer drag reduction in turbulent flows, J.Non-Newton Fluid Mech. 165 (2010), pp. 376–384.
- P.A. Durbin, Application of a near-wall turbulence model to boundary layers and heat transfer, Int. J. Heat Fluid Flow 14 (1993), pp. 316–323.
- Y. Nagano and M. Hishida, Improved form of the k-ϵ model for wall turbulent shear flows, J. Fluids Eng. 109 (1987), pp. 156–160.
- P.K. Ptasinski, F.T.M. Nieuwstadt, B.H.A.A. Van Den Brule, and M.A. Hulsen, Experiments in turbulent pipe flow with polymer additives at maximum drag reduction, Flow Turbul. Combust. 66 (2001), pp. 159–182.
- K.D. Housiadas and A.N. Beris, Polymer-induced drag reduction: Effects of the variations in elasticity and inertia in turbulent viscoelastic channel flow, Phys. Fluids 15 (2003), pp. 2369–2384.
- V.C. Patel, W. Rodi, and G. Scheuerer, Turbulence models for near-wall and low Reynolds: A review, AIAA J. 23 (1984), pp. 1308–1319.
- T.S. Park, H.J. Sung, and K. Suzuki, Development of a nonlinear near-wall turbulence model for turbulent flow and heat transfer, Int. J. Heat Fluid Flow 24 (2003), pp. 29–40.
- T.J. Craft, B.E. Launder, and K. Suga, Development and application of a cubic eddy-viscosity model of turbulence, Int. J. Heat Fluid Flow 17 (1996), pp. 108–115.
- B.E. Launder, G.J. Reece, and W. Rodi, Progress in the development of a Reynolds-stress turbulence closure, J. Fluid Mech. 68 (1975), pp. 537–566.
- K. Hanjalic and B.E. Launder, Contribution towards a Reynolds-stress closure for low-Reynolds-number turbulence, J. Fluid Mech. 74 (1976), pp. 593–610.
- B.E. Launder and W.C. Reynolds, Asymptotic near-wall stress dissipation rates in a turbulent flow, Phys. Fluids 26 (1983), pp. 1157–1158.
- M. Prud’homme and S. Elghobashi, Turbulent heat transfer near the reattachment of flow downstream of a sudden pipe expansion, Numer. Heat Transfer 10 (1986), pp. 349–368.
- R.M.C. So and G.J. Yoo, Low-Reynolds-number modelling of turbulent flows with and without wall transpiration, AIAA J. 25 (1987), pp. 1556–1564.
- Y.G. Lai and R.M.C. So, On near-wall turbulent flow modelling, J. Fluid Mech. 221 (1990), pp. 641–673.
- N. Shima, A Reynolds-stress model for near-wall and low Reynolds-number regions, J. Fluids Eng. 110 (1988), pp. 38–44.
- S.S. Thakre and J.B. Joshi, A low Reynolds number Reynolds stress modelling of turbulent pipe flow: Flow pattern and energy balance, Chem. Eng. Commun. 189 (2002), pp. 759–785.
- T.J. Craft, Developments in a low-Reynolds-number second-moment closure and its application to separating and reattaching flows, Int. J. Heat Fluid Flow 19 (1998), pp. 541–548.
- T.J. Craft, and B.E. Launder, A Reynolds stress closure designed for complex geometries, Int. J. Heat Fluid Flow 17 (1996), pp. 245–254.
- N. Shima, Low-Reynolds-number second-moment closure without wall-reflection redistribution terms, Int. J. Heat Fluid Flow 19 (1998), pp. 549–555.
- M.P. Escudier, F. Presti, and S. Smith, Drag reduction in the turbulent pipe flow of polymers, J. Non-Newton Fluid Mech. 81 (1999), pp. 197–213.
- H.A. Barnes, J.F. Hutton, and K. Walters, An Introduction to Rheology, Elsevier, Amsterdam, 1989.
- C.D. Dimitropoulos, R. Sureshkumar, A.N. Beris, and R.A. Handler, Budgets of Reynolds stress, kinetic energy and streamwise entropy in viscoelastic turbulent channel flow, Phys. Fluids 13 (2001), pp. 1016–1027.
- J. Laufer, The structure of turbulence in fully developed pipe flow, NACA Rep. 1174, National Advisory Committee for Aeronautics, Washington, 1954.
- E.R. Van Driest, On turbulent flow near a wall, J. Aeronautical Sci. 23 (1956), pp. 1007–1011.
- F. Durst, J. Jovanovic, and J. Sender, LDA measurements in the near-wall region of turbulent pipe flow, J. Fluid Mech. 295 (1995), pp. 305–335.
- P.S. Virk, H.S. Micley and K.A. Smith, The ultimate asymptote and mean flow structure in Tom's phenomenon, J. Appl. Mech. 92 (1970), pp. 488–493.
- B. Purnode and M.J. Crochet, Polymer solution characterization with the FENE-P model, J. Non-Newton Fluid Mech. 77 (1998), pp. 1–20.
- L. Thais, G. Mompean, and T.B. Gatski, Spectral analysis of turbulent viscoelastic and Newtonian channel flows, J. Non-Newton Fluid Mech. 200 (2013), pp. 165–176.
- L. Thais, A.E. Tejada-Martínez, T.B. Gatski, and G. Mompean, Temporal large eddy simulations of turbulent viscoelastic drag reduction flows, Phys. Fluids 22 (2010), pp. 1–13.
- L. Thais, T.B. Gatski, and G. Mompean, Analysis of polymer drag reduction mechanisms from energy budgets, Int. J. Heat Fluid Flow 43 (2013), pp. 52–61.