PFI, Trondheim, October 24-26, 2012 1 Department of Energy and Process Engineering, NTNU 2 Centro Interdipartimentale di Fluidodinamica e Idraulica, University.

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PFI, Trondheim, October 24-26, Department of Energy and Process Engineering, NTNU 2 Centro Interdipartimentale di Fluidodinamica e Idraulica, University of Udine L. Zhao 1, C. Marchioli 2, H. Andersson 1 Joint 4 th SIG43 –FP1005 Workshop on Fiber Suspension Flow Modelling Slip Velocity of Rigid Fibers in Wall-Bounded Turbulence

Motivation of the Study: Why are we looking at the slip velocity? Slip velocity is a crucial variable in: 1.Euler-Lagrange simulations: One-way coupling: determines the drag experienced by fibers Two-way coupling: determines reaction force from fibers on fluid 2.Two-fluid modeling of particle-laden flows Modeling SGS fiber dynamics in LES flow fields Crossing trajectory effects on time decorrelation tensor of u v u u: fluid velocity “seen” v: fiber velocity ∆u=u-v: slip velocity Aim of this study: statistical characterization of ∆u at varying fiber inertia and elongation

Examples: flow of air at 1.8 m/s in a 4 cm high channel Pseudo-Spectral method: Fourier modes in x and y, Chebyschev modes in z. Methodology - Carrier Fluid flow of water at 3.8 m/s in a 0.5 cm high channel DNS of turbulent channel Re=u h/=150, 180, 300

Fibers are modelled as prolate ellipsoidal particles. Lagrangian particle tracking. Simplifying assumptions: dilute flow, one-way coupling, Stokes flow (Re P <1 ), pointwise particles (particle size is smaller than the smallest flow scale). Periodicity in x ed y, elastic rebound at the wall and conservation of angular momentum. 200,000 fibers tracked, random initial position and orientation, linear and angular velocities equal to those of the fluid at fiber’s location. Methodology - Fibers

Kinematics: described by (1) position of the fiber center of mass and (2) fiber orientation. x G, y G, z G 3 frames of reference (to define orientation) Euler angles: φ, ψ, θ (singularity problems) Euler parameters: e 0, e 1, e 2, e 3 Rotation matrix:, … Methodology – Fiber Kinematics

Euler Equations: (2nd cardinal law) (in the particle frame) Rotational dynamics: Euler equations with Jeffery moments. Jeffery moments: Aspect Ratio Hence: Euler equations with Jeffery couples e 0, e 1, e 2, e 3 (Euler parameters) (Jeffery, 1922) Methodology – Fiber Dynamics

Translational Dynamics: hydrodynamic resistance (Brenner, 1963). First cardinal law: Brenner’s law: (form drag and skin drag) (in the fiber frame) In the inertial (Eulerian) frame: Resistance Tensor, Once fiber orientation is known, fiber translational motion can be computed! (inertia and drag only!!) (via numerical integration) Methodology – Fiber Dynamics

Stokes number: (chosen values:  + =1, 5, 30, 100) Specific density: The physics of turbulent fiber dispersion is determined by a small set of parameters + τ >> 1: large inertia (“stones”) τ << 1 : small inertia (tracers) τ ~ 1 : preferential (selective) response to flow structures Relevant Parameters and Summary of the Simulations Aspect ratio:(chosen values: =1.001, 3, 10, 50)

“Cartoon” of fiber ’s elongation =1.001 (spherical particle) =3 =10 =50 (elongated “spaghetti-like” fiber)

Top view: fibers accumulate in near-wall fluid Low-Speed Streaks (LSS) Results - Non-Homogeneity of Near-Wall Fiber Preferential Distribution Slip velocity at fiber position: Sample snapshot for   =30, =50 fibers

Results - Using Slip Velocity to Analyze Fiber Accumulation in LSS The influence of λ is not dramatic: only a change in the peak values is observed (no PDF shape change) Effect of fiber elongation on conditioned PDF(u f ’) – St=30 Positive slip Negative slip =1 =3=10=50

Results - Using Slip Velocity to Analyze Fiber Accumulation in LSS Significant PDF shape change with curve “inversion” between St=5 and St=30 Effect of fiber inertia on conditioned PDF(u f ’) Positive slip Negative slip St=1 St=5St=30St=100

Results - Streamwise Slip Velocity: Mean and RMS values St=1 St=30 Mean RMS

Results - Streamwise Slip Velocity: Mean and RMS values St=5 St=100 Mean RMS

Results - Wall-Normal Slip Velocity: Mean and RMS values St=1 St=30 Mean RMS

Conclusions … …and Future Developments Slip velocity is a useful measure of fibers-turbulence interaction in wall- bounded flows: its statistical characterization provides useful indications for modeling turbulent fiber dispersion Slip velocity statistics depend both on fiber elongation (quantitatively) and fiber inertia (also qualitatively!) RMS exceeds the corresponding mean value by roughly 3 to 5 times: the instantaneous slip velocity may thus frequently change sign Simulate more values of St, λ and Re Evaluate slip spin statistics Mean slip spin for the St=30 fibers in the Re=150 flow (spanwise component)