Post on 23-Jan-2020
Turbulence, from onset to large scale structures
Björn Hof
Institute of Science and Technology Austria
Reynolds pipe experiments
O. Reynolds Phil. Trans. R. Soc. 1883
Increasing velocity
‚puffs‘ of turbulence
Turbulence is triggered by finite amplitude perturabtions Turbulence is observed at Re ~ 2000
However for an improved set up flow remained lamianr up to Re~13 000
Channel flow
Pipe flow (Re=2000)
Turbulent spots and stripes
Turbulence sets in despite the linear stability of the laminar flow.
Laminar and turbulent regions coexist
(Taylor) Couette flow
Dynamics of individual puffsDecay of turbulent puffs
Spreading of turbulent puffs
•Turbulent puffs decay suddenly after long tim•Memoryless process
P(t, Re)=exp(-t / τ (Re))
RE=2040: Turbulence becomes sustained at a non-equilibrium phase transition
Avila, Moxey, de Lozar, Avila, Barkley, Hof, Science 2011
Coupled map lattices:Kaneko Prog. Theoret. Phys.1985, Chate, Manneville PRL 1988Couette flow: S. Bottin, H. Chaté Eur. Phys J. 1998S. Bottin, F. Daviaud, P. Manneville, ODauchot,Europhys. Lett. 1998Manneville, PRE 2009Pipe flow:Moxey & Barkley, PNAS 2010
Spatio temporal intermittent regime
Re=2300
Direct numerical simulations by Marc Avila
Tim
e (D
/U)
Pipe axis / DPipe axis / D 0 150
Re=1900
Transition via spatio temporal intermittency:Coupled map lattice
time
spac
e
Kaneko Phys. Lett. A 1990
Directed Percolationtim
e
space
Single parameter: Probability P
Directed PercolationP < 0.64
Directed PercolationP < 0.64
Directed Percolation
Analogy to turbulencefirst suggested by Y. Pomeau 1986
P > 0.65
=0.276=-1.748 ∥=-1.841
Earlier Couette experimentTu
rbul
ent f
ract
ion
Length= 190 H
Wid
th=
35 H
Bottin, Daviaud, Manneville, Dauchot Europhys. Lett. 1998
The DP analogy• Replace P by Re• Laminar flow is the unique absorbing state• Time step ~ splitting/decay time• An active DP site is a puff (/stripe) including
laminar recovery region
Critical Exponents:1. Space correlation exponent:
Distribution of laminar gaps (spatial)
Best fit = -0.75DP: -0.748
Best fit = -0.84DP: -0.84
2. Time exponent:Distribution of laminar gaps in time
Cum
ulat
ive
Prob
abili
ty3. Critical exponent for theturbulent fraction
Re
Turb
ulen
t fra
ctio
n
Simulations by Liang Shi In collaboration with Marc Avila
Couette experimentsTaylor Couette apparatus Γθ = 5500 Γz = 16 and radius ratio= 0.998
Lem
oult,
Shi
, Avi
la, J
alik
ob, A
vila
& H
of, N
atur
e Ph
ysic
s 2
016
(arX
iv:1
504.
0330
4)
Re
Turb
ulen
t fra
ctio
n
The DP analogy• Replace P by Re• Laminar flow is the unique absorbing
state• Time step ~ splitting/decay time• An active DP site is a puff (/stripe)
Pipe flow?
Re=2020
Re=2060
Experiments: Mukund Vasudevan
Onset of sustained turbulence
Re=2020
Re=2060
Critical exponents?
Directed percolation Directed
percolationDirected percolation
Turb
ulen
t fra
ctio
n
# La
min
ar g
aps
(in s
pace
)
# La
min
ar g
aps
(in ti
me)
Re Gap size (space)
Gap size (time)
Other studiesChannel Flow: Sano Tamai Nature Physics 2016
Claim statistical steady state is assumed after 100 D/U (in pipes its order 108 D/U !!! )
Waleffe flow: Chantry, Tuckerman & Barkley JFM 2017
From localised to fully turbulent
From localised to fully turbulent
Nishi et al JFM 2008
(1973)
Fron
t sp
eed
Leading edge
Trailing edge
(Duguet, Willis & Kerswell JFM 2011)
From localised to fully turbulent
Re
Re
Barkley’s excitable media model(Barkley PRE 2011)
From localised to fully turbulent
Barkley, Song, Mukund, Lemoult, Avila & Hof Nature 2015
Emergence of Turbulence
Re=2300
Re
Laminar friction law
Re
What happens at larger Re?
Friction in pipes: early experiments
Blasius (1913): power law friction factor for
Darcy-Weisbach friction factor
Fit on experimental data
Friction in pipes: higher Reynolds numbers
Prandtl-von Karman
New data at high Re (Nikuradse,
1930)
Velocity log law proposed (von
Karman, 1930)
Friction factor formula from the
log law (Prandtl, 1932)Blasius
Friction in pipes: higher Reynolds numbers
Prandtl-von Karman
Blasius
New data at high Re (Nikuradse,
1930)
Velocity log law proposed (von
Karman, 1930)
Friction factor formula from the
log law (Prandtl, 1932)
von Karman’s view of power laws
“The resistance law is no power law,”Stockholm congress 1930 (von Karman):
Von Karman 1930:
(see Bodenschatz Eckert 2011)
Stockholm congress 1930 (von Karman):
It is known that over broad ranges the friction law can be approximated by functions of the type:
The exponent reduces with Re.
I believe this riddle has a simple explanation.
Power laws are approximations to a logarithmic function
Zagarola and Smits 1998 (◊), Swanson et al. 2002 (○) and Furuichi et al. 2015 (□)
Friction factor Deviation wrt Blasius (%)
Friction in the Blasius regime: state of the art
Zagarola and Smits 1998 (◊), Swanson et al. 2002 (○) and Furuichi et al. 2015 (□)
Available data is scattered and insufficient to draw conclusions
Friction factor Deviation wrt Blasius (%)
Friction in the Blasius regime: state of the art
Pressure drop measurements
Temperature controller unit
Servomotor driven syringe pump
Precision bore glass pipe
Differential pressure sensor
Run length friction factor accuracy `
Friction factor Deviation wrt Blasius (%)
Friction in the Blasius regime: results
Direct Numerical Simulations
streamwise azimuthal radial (wall) radial (max)
Pseudo-spectral code
8th
order finite differences in radial direction (4th
order at the wall)
Domain length
Resolution (in wall units):
A power law emerges for
Friction factor Deviation wrt Blasius (%)
Friction in the Blasius regime: resultsDNS ( ) + experiments ( )
Kolmogorov theory applied to pipe flow
● Local isotropy
● First similarity hypothesis
Kolmogorov theory applied to pipe flow
● Local isotropy
● First similarity hypothesis
Can we apply the theory at moderate ?
Kolmogorov theory applied to pipe flow
● Local isotropy
● First similarity hypothesis
● Schumacher et al. (2014):
● Small-scale universality in different flows at low
● Developed inertial range not required
Can we apply the theory at moderate ?
Deriving a friction law from Kolmogorov theory
● Start by multiplying the scaling by (see also: Gioia and Chakraborty, 2006)
Deriving a friction law from Kolmogorov theory
● Start by multiplying the scaling by
● Rewrite and compare with the wall shear stress
(see also: Gioia and Chakraborty, 2006)
Deriving a friction law from Kolmogorov theory
● Start by multiplying the scaling by
● Rewrite and compare with the wall shear stress
● Let
(see also: Gioia and Chakraborty, 2006)
Deriving a friction law from Kolmogorov theory
• -1/4 power law simplest scaling from Kolmogorov theory
What happens at larger Re ?
Velocity RMS in wall units
Inner peak location constant
Progressive development of a
second peak
Second peak associated with
large scale motions
How do the increasing LSMs affect the friction factor?
Contribution of LSM to the friction factor
● Fukagata et al. 2002
Contribution of LSM to the friction factor
● Fukagata et al. 2002
● Compute contributions of LSM and SSM (Chin et al., 2014)
Contribution of LSM to the friction factor
● Fukagata et al. 2002
● Compute contributions of LSM and SSM (Chin et al., 2014)
● Filter cutoff wavelength
Contribution of LSM to the friction factor
● Fukagata et al. 2002
● Compute contributions of LSM and SSM (Chin et al., 2014)
● Filter cutoff wavelength
Contribution of LSM to the friction factor
Contribution of LSMs to the friction factor
: LSMs dominate and friction deviates from a power law
Jose M. Lopez, Davide Scarselli, Balachandra Suri & BH in preparation
Conclusions
Friction factor scaling starts as a power law
Blasius scaling can be rationalized from Kolmogorov theory
Deviation of friction related to increasing dominance of LSMs in
turbulent momentum transport