https://orcid.org/0000-0001-9934-6615
References
- Robinson SK. Coherent motions in the turbulent boundary layer. Annu Rev Fluid Mech. 1991;23(1):601–639. doi: 10.1146/annurev.fl.23.010191.003125
- Townsend AA. The structure of turbulent shear flow. Cambridge: Cambridge University Press; 1976.
- Adrian RJ. On the role of conditional averages in turbulence theory. Turbulence in liquids. Princeton: Science Press; 1977.
- Jeong J, Hussain F, Schoppa W, et al. Coherent structures near the wall in a turbulent channel flow. J Fluid Mech. 1997;332:185–214. doi: 10.1017/S0022112096003965
- Zhou J, Adrian RJ, Balachandar S, et al. Mechanisms for generating coherent packets of hairpin vortices in channel flow. J Fluid Mech. 1999;387:353–396. doi: 10.1017/S002211209900467X
- Lozano-Durán A, Jiménez J. Time-resolved evolution of coherent structures in turbulent channels: characterization of eddies and cascades. J Fluid Mech. 2014;759:432–471. doi: 10.1017/jfm.2014.575
- Wu X, Moin P, Wallace JM, et al. Transitional–turbulent spots and turbulent–turbulent spots in boundary layers. PNAS. 2017;0:E5292–E5299. doi: 10.1073/pnas.1704671114
- Tardu S. Transport and coherent structures in wall turbulence. Hoboken (NJ): Wiley & Sons, Inc.; 2014.
- Coceal O, Dobre A, Thomas TG, et al. Structure of turbulent flow over regular arrays of cubical roughness. J Fluid Mech. 2007;589:375–409. doi: 10.1017/S002211200700794X
- Wu Y, Christensen KT. Spatial structure of a turbulent boundary layer with irregular surface roughness. J Fluid Mech. 2010;655:380–418. doi: 10.1017/S0022112010000960
- Volino RJ, Schultz MP, Flack KA. Turbulence structure in boundary layers over periodic two- and three-dimensional roughness. J Fluid Mech. 2011;676:172–190. doi: 10.1017/S0022112011000383
- Talapatra S, Katz J. Coherent structures in the inner part of a rough-wall channel flow resolved using holographic PIV. J Fluid Mech. 2012;711:161–170. doi: 10.1017/jfm.2012.382
- Chan L, MacDonald M, Chung D, et al. Secondary motion in turbulent pipe flow with three-dimensional roughness. J Fluid Mech. 2018;854:5–33. doi: 10.1017/jfm.2018.570
- Krogstad PÅ, Antonia RA. Surface roughness effects in turbulent boundary layers. Exp Fluids. 1999;27(5):450–460. doi: 10.1007/s003480050370
- Passalacqua P, Porté-Agel F, Foufoula-Georgiou E, et al. Application of dynamic subgrid-scale concepts from large-eddy simulation to modeling landscape evolution. Water Resour Res. 2006;42:W06D11–1–11. doi: 10.1029/2006WR004879
- Orlandi P, Leonardi S, Antonia RA. Turbulent channel flow with either transverse or longitudinal roughness elements on one wall. J Fluid Mech. 2006;561:279–305. doi: 10.1017/S0022112006000723
- Forooghi P, Stroh A, Schlatter P, et al. Direct numerical simulation of flow over dissimilar, randomly distributed roughness elements: a systematic study on the effect of surface morphology on turbulence. Phys Rev Fluids. 2018;3:044605. doi: 10.1103/PhysRevFluids.3.044605
- Barros JM, Schultz MP, Flack KA. Measurements of skin-friction of systematically generated surface roughness. Int J Heat Fluid Flow. 2018;72:1–7. doi: 10.1016/j.ijheatfluidflow.2018.04.015
- Yuan J, Piomelli U. Estimation and prediction of the roughness function on realistic surfaces. J Turbul. 2014;15:350–365. doi: 10.1080/14685248.2014.907904
- Busse A, Lützner M, Sandham ND. Direct numerical simulation of turbulent flow over a rough surface based on a surface scan. Comput Fluids. 2015;116:129–147. doi: 10.1016/j.compfluid.2015.04.008
- Scotti A. Direct numerical simulation of turbulent channel flows with boundary roughened with virtual sandpaper. Phys Fluids. 2006;18:031701–1 – 4. doi: 10.1063/1.2183806
- Yuan J, Piomelli U. Numerical simulations of sink-flow boundary layers over rough surfaces. Phys Fluids. 2014;26:01511301511015113–1 –015113–28.
- Yuan J, Piomelli U. Roughness effects on the reynolds stress budgets in near-wall turbulence. J Fluid Mech. 2014;760:R1. doi: 10.1017/jfm.2014.608
- Keating A. Large-eddy simulation of heat transfer in turbulent channel flow and in the turbulent flow downstream of a backward-facing step [dissertation]. University of Queensland; 2004
- Raupach MR, Shaw RH. Averaging procedures for flow within vegetation canopies. Bound-Lay Meteorol. 1982;22:79–90. doi: 10.1007/BF00128057
- Leonardi S, Orlandi P, Antonia RA. Properties of d- and k-type roughness in a turbulent channel flow. Phys Fluids. 2007;19(12):125101. doi: 10.1063/1.2821908
- Napoli E, Armenio V, De Marchis M. The effect of the slope of irregularly distributed roughness elements on turbulent wall-bounded flows. J Fluid Mech. 2008;613:385–394. doi: 10.1017/S0022112008003571
- Yuan J, Aghaei Jouybari M. Topographical effects of roughness on turbulence statistics in roughness sublayer. Phys Rev Fluids. 2018;3:114603–19. doi: 10.1103/PhysRevFluids.3.114603
- Majumdar A, Bhushan B. Role of fractal geometry in roughness characterization and contact mechanics of surfaces. ASME J Tribol. 1990;112(2):205–216. doi: 10.1115/1.2920243
- Bandyopadhyay PR. Rough-wall turbulent boundary layers in the transition regime. J Fluid Mech. 1987;180:231–266. doi: 10.1017/S0022112087001794
- Moser RD, Moin P. The effects of curvature in wall-bounded turbulent flows. J Fluid Mech. 1987;175:479–510. doi: 10.1017/S0022112087000491
- Pokrajac D, Campbell LJ, Nikora V, et al. Quadrant analysis of persistent spatial velocity perturbations over square-bar roughness. Exp Fluids. 2007;42:413–423. doi: 10.1007/s00348-006-0248-0
- Schultz MP, Flack KA. Reynolds-number scaling of turbulent channel flow. Phys Fluids. 2013;25:025104–1 – 13. doi: 10.1063/1.4791606
- Nikuradse J. Laws of flow in rough pipes. NACA Technical Memorandum 1292; 1933.
- Jackson PS. On the displacement height in the logarithmic velocity profile. J Fluid Mech. 1981;111:15–25. doi: 10.1017/S0022112081002279
- Mejia-Alvarez R, Christensen KT. Low-order representations of irregular surface roughness and their impact on a turbulent boundary layer. Phys Fluids. 2010;22:015106–1 – 20. doi: 10.1063/1.3291076
- Barros JM, Christensen KT. Observations of turbulent secondary flows in a rough-wall boundary layer. J Fluid Mech. 2014;748:R1. doi: 10.1017/jfm.2014.218
- Vanderwel C, Ganapathisubramani B. Effects of spanwise spacing on large-scale secondary flows in rough-wall turbulent boundary layers. J Fluid Mech. 2015;774:R2.
- Yang J, Anderson W. Numerical study of turbulent channel flow over surfaces with variable spanwise heterogeneities: topographically-driven secondary flows affect outer-layer similarity of turbulent length scales. Flow, Turb Combust. 2018;100:1–17. doi: 10.1007/s10494-017-9839-5
- Munters W, Meneveau C, Meyers J. Shifted periodic boundary conditions for simulations of wall-bounded turbulent flows. Phys Fluids. 2016;28:025112. doi: 10.1063/1.4941912
- Leonardi S, Orlandi P, Djenidi L, et al. Structure of turbulent channel flow with square bars on one wall. Int J Heat Fluid Flow. 2004;25:384–32. doi: 10.1016/j.ijheatfluidflow.2004.02.022
- Jiménez J. Turbulent flows over rough walls. Annu Rev Fluid Mech. 2004;36:173–196. doi: 10.1146/annurev.fluid.36.050802.122103
- Krogstad PÅ, Antonia RA. Structure of turbulent boundary layers on smooth and rough walls. J Fluid Mech. 1994;277:1–21. doi: 10.1017/S0022112094002661
- Christensen KT, Wu Y. Characteristics of vortex organization in the outer layer of wall turbulence. In: Proceedings of the fourth international symposium on turbulence and shear flow phenomena. Vol. 3; 2005. p. 1025–1030.
- Sabot J, Saleh I, Comte-Bellot G. Effects of roughness on the intermittent maintenance of reynolds shear stress in pipe flow. Phys Fluids. 1977;20(10):S150–S155. doi: 10.1063/1.861724
- Tomkins CD, Adrian RJ. Spanwise structure and scale growth in turbulent boundary layers. J Fluid Mech. 2003;490:37–74. doi: 10.1017/S0022112003005251
- del Álamo JC, Jiménez J, Zandonade P, et al. Scaling of the energy spectra of turbulent channels. J Fluid Mech. 2004;500:135–144. doi: 10.1017/S002211200300733X
- Hoyas S, Jiménez J. Reynolds number effects on the reynolds-stress budgets in turbulent channels. Phys Fluids. 2008;20:101511–1–9. doi: 10.1063/1.3005862
- Krogstad PÅ, Efros V. About turbulence statistics in the outer part of a boundary layer developing over two- dimensional surface roughness. Phys Fluids. 2012;24:075112–1–15.
- Kolmogorov AN. The local structure of turbulence in incompressible viscous fluid for very large reynolds number. Dokl Akad Nauk SSSR. 1941;30:299–303.
- Ganapathisubramani B, Hutchins N, Hambleton WT, et al. Investigation of large-scale coherence in a turbulent boundary layer using two-point correlations. J Fluid Mech. 2005;524:57–80. doi: 10.1017/S0022112004002277
- Jiménez J, Hoyas S, Simens MP, et al. Turbulent boundary layers and channels at moderate reynolds numbers. J Fluid Mech. 2010;657:335–360. doi: 10.1017/S0022112010001370
- Saddoughi SG, Veeravalli SV. Local isotropy in turbulent boundary layers at high Reynolds numbers. J Fluid Mech. 1994;268:333–372. doi: 10.1017/S0022112094001370
- Pope SB. Turbulent flows. Cambridge: Cambridge University Press; 2000.
- Moser RD, Kim J, Mansour NN. Direct numerical simulation of turbulent channel flow up to Reτ = 590. Phys Fluids. 1999;11(4):943–945. doi: 10.1063/1.869966
- Bhaganagar K, Kim J, Coleman G. Effect of roughness on wall-bounded turbulence. Flow Turbul Combust. 2004;72(2):463–492. doi: 10.1023/B:APPL.0000044407.34121.64
- Kassinos SC. A structure-based model for the rapid distortion of homogeneous turbulence [dissertation]. Stanford University; 1995.
- Adrian RJ. Hairpin vortex organization in wall turbulence. Phys Fluids. 2007;19:041301. doi: 10.1063/1.2717527
- Hong J, Katz J, Schultz MP. Near-wall turbulence statistics and flow structures over three-dimensional roughness in a turbulent channel flow. J Fluid Mech. 2011;667:1–37. doi: 10.1017/S0022112010003988
- Adrian RJ. Stochastic estimation of the structure of turbulent fields. Vienna: Springer; 1996. p. 145–195.
- Manhart M. Vortex shedding from a hemisphere in a turbulent boundary layer. Theor Comp Fluid Dyn. 1998;12(1):1–28. doi: 10.1007/s001620050096
- Schoppa W, Hussain F. Coherent structure generation in near-wall turbulence. J Fluid Mech. 2002;453:57–108. doi: 10.1017/S002211200100667X
- Anderson W, Barros JM, Christensen KT, et al. Numerical and experimental study of mechanisms responsible for turbulent secondary flows in boundary layer flows over spanwise heterogeneous roughness. J Fluid Mech. 2015;768:316–347. doi: 10.1017/jfm.2015.91