References
- Tsuji Y, Morikawa Y, Shiomi H. LDV Measurements of an air-solid two-phase flow in a vertical pipe. J Fluid Mech. 1984;139:417–434.
- Kulick JD, Fessler JR, Eaton JK. Particle response and turbulence modification in fully developed channel flow. J Fluid Mech. 1994;277:109–134.
- Kussin J, Sommerfeld M. Experimental studies on particle behaviour and turbulence modification in horizontal channel flow with different wall roughness. Exp Fluids. 2002;33:143–159.
- Ten Cate A, Derksen J, Portella L, et al. Fully resolved simulations of colliding monodisperse spheres in forced isotropic turbulence. J Fluid Mech. 2004;519:233–271.
- Burton TM, Eaton JK. Fully resolved simulations of particle-turbulence interaction. J Fluid Mech. 2005;545:67–111.
- Uhlmann M. Interface-resolved direct numerical simulation of vertical particulate channel flow in the turbulent regime. Phys Fluids. 2008;20:053305.
- Tanaka T, Eaton JK. Sub-Kolmogorov resolution particle image velocimetry measurements of particle-laden forced turbulence. J Fluid Mech. 2010;643:177–206.
- Lucci F, Ferrante A, Elghobashi S. Modulation of isotropic turbulence by particles of Taylor length-scale size. J Fluid Mech. 2010;650:5–55.
- Picano F, Breugem W-P, Brandt L. Turbulent channel flow of dense suspensions of neutrally-buoyant spheres. J Fluid Mech. 2015;764:463–487.
- Crowe CT, Schwarzkof JD, Sommerfeld M, et al. Multiphase flows with droplets and particles. 2nd ed. Boca Raton (FL): CRC Press; 2011.
- Balachandar S, Eaton JK. Turbulent dispersed multiphase flow. Annu Rev Fluid Mech. 2010;42:111–133.
- Pan Y, Banerjee S. Numerical investigation of the effects of large particles on wall-turbulence. Phys Fluids. 1997;9:3786–3807.
- Kajishima T, Takiguchi S, Hamasaki H, et al. Turbulence structure of particle-laden flow in a vertical plane channel due to vortex shedding. JSME Int J, Ser. B 2001;44:526–535.
- Yeo K, Dong S, Climent E, et al. Modulation of homogeneous turbulence seeded with finite size bubbles or particles. Int J Multiph Flow. 2010;36:221–233.
- Shao X, Wu T, Yu Z. Fully resolved numerical simulation of particle-laden turbulent flow in a horizontal channel at a low Reynolds number. J Fluid Mech. 2012;693:319–344.
- Kidanemariam A, Chan-Braun C, Doychev T, et al. Direct numerical simulation of horizontal open channel flow with finite-size heavy particles at low solid volume fraction. New J Phys. 2013;15:025031.
- Cisse M, Homann H, Bec J. Slipping motion of large neutrally buoyant particles in turbulence. J Fluid Mech. 2013;735:R1.
- Gao H, Li H, Wang L-P. Lattice Boltzmann simulation of turbulent flow laden with finite-size particles. Comput Math Appl. 2013;65:194–210.
- Wang L-P, Ayala O, Gao H, et al. Study of forced turbulence and its modulation by finite-size solid particles using the lattice Boltzmann approach. Comput Math Appl. 2014;67:363–380.
- Tanaka M, Teramoto D. Modulation of homogeneous shear turbulence laden with finite-size particles. J Turbulence. 2015;16:979–1010.
- Chouippe A, Uhlmann M. Forcing homogeneous turbulence in DNS of particulate flow with interface resolution and gravity. Phys Fluids. 2015;27:123301.
- Fornari W, Formenti A, Picano F, et al. The effect of particle density in turbulent channel flow laden with finite size particles in semi-dilute conditions. Phys Fluids. 2016;28:033301.
- Fornari W, Picano F, Brandt L. Sedimentation of finite-size spheres in quiescent and turbulent environments. J Fluid Mech. 2016;788:640–669.
- Fornari W, Picano F, Sardina G, et al. Reduced particle settling speed in turbulence. J Fluid Mech. 2016;808:153–167.
- Mashayek F. Droplet-turbulence interactions in low-Mach-number homogeneous shear two-phase flows. J Fluid Mech. 1998;367:163–203.
- Ahmed AM, Elghobashi S. On the mechanisms of modifying the structure of turbulent homogeneous shear flows by disperse particles. Phys Fluids. 2000;12:2906–2930.
- Tanaka M, Maeda Y, Hagiwara Y. Turbulence modification in a homogeneous turbulent shear flow laden with small heavy particles. Int J Heat Fluid Flow. 2002;23:615–626.
- Gualtieri P, Picano F, Casciola CM. Anisotropic clustering of inertial particles in homogeneous shear flow. J Fluid Mech. 2009;629:25–39.
- Gualtieri P, Picano F, Sardina G, et al. Clustering and turbulence modulation in particle-laden shear flows. J Fluid Mech. 2013;715:134–162.
- Nicolai C, Jacob B, Gualtieri P, et al. Inertial particles in homogeneous shear turbulence: experiments and direct numerical simulation. Flow Turbulence Combust. 2014;92:65–82.
- Nicolai C, Jacob B, Piva R. On the spatial distribution of small heavy particles in homogeneous shear turbulence. Phys Fluids. 2013;25:083301.
- Uhlmann M. An immersed boundary method with direct forcing for the simulation of particulate flows. J Comp Phys. 2005;209:448–476.
- Lucci F, Ferrante A, Elghobashi S. Is stokes number an appropriate indicator for turbulence modulation by particles of Taylor length-scale size. Phys Fluids. 2011;23:025101.
- Gerz T, Schumann U, Elghobashi SE. Direct numerical simulation of stratified homogeneous turbulent shear flows. J Fluid Mech. 1989;200:563–594.
- Spalart PR, Moser RD, Rogers MM. Spectral methods for the Navier-Stokes equations with one infinite and two periodic directions. J Comput Phys. 1991;96:297–324.
- Roma AM, Peskin CS, Berger MJ. An adaptive version of the immersed boundary method. J Comput Phys. 1999;153:509–534.
- Breugem W-P. A second-order accurate immersed boundary method for fully resolved simulations of particle-laden flows. J Comput Phys. 2012;231:4469–4498.
- Kempe T, Fröhlich J. Collision modeling for the interface-resolved simulation of spherical particles in viscous fluids. J Fluid Mech. 2012;709:445–489.
- Brandle de Motta JC, Breugem W-P, Gazanion B, et al. Numerical modelling of finite-size particle collisions in a viscous fluid. Phys Fluids. 2013;25:083302.
- Climent E, Maxey MR. Numerical simulations of random suspensions at finite Reynolds numbers. Int J Multiph Flow. 2003;29:579–601.
- Kempe T, Fröhlich J. An improved immersed boundary method with direct forcing for the simulation of particle laden flows. J Comput Phys. 2012;231:3663–3684.
- Sekimoto A, Dong S, Jiménez J. Direct numerical simulation of statistically stationary and homogeneous shear turbulence and its relation to other shear flows. Phys Fluids. 2016;28:035101.
- Mikulencak DR, Morris JF. Stationary shear flow around fixed and free bodies at finite Reynolds number. J Fluid Mech. 2004;520:215–242.
- Vreman AW. Particle-resolved direct numerical simulation of homogeneous isotropic turbulence modified by small fixed spheres. J Fluid Mech. 2016;796:40–85.
- Kida S, Tanaka M. Dynamics of vortical structures in a homogeneous shear flow. J Fluid Mech. 1994;274:43–68.
- Jeong J, Hussain F. On the identification of a vortex. J Fluid Mech. 1995;285:69–94.
- Horiuti K, Takagi Y. Identification method for vortex sheet structures in turbulent flows. Phys Fluids. 2005;17:121703.