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Estimating suppression of eddy mixing by mean flows1
Andreas Klocker ∗ , Raffaele Ferrari
Massachusetts Institute of Technology, Cambridge, Massachusetts, USA2
Joseph H. LaCasce
Department of Geosciences, University of Oslo, Norway3
∗Corresponding author address: Andreas Klocker, Massachusetts Institute of Technology, 77 Mas-
sachusetts Avenue, 54-1622, Cambridge, MA 02139.
E-mail: [email protected]
1
ABSTRACT4
Particle and tracer-based estimates of lateral diffusivities are used to estimate the sup-5
pression of eddy mixing across strong currents. Particles and tracers are advected using6
a velocity field derived from sea surface height measurements from the South Pacific, in a7
region west of Drake Passage. This velocity field has been used in a companion paper to8
show that both particle and tracer-based estimates of eddy diffusivities are equivalent, de-9
spite recent claims to the contrary. These estimates of eddy diffusivities are here analyzed to10
show (1) that the degree of suppression of mixing across the strong Antarctic Circumpolar11
Current is correctly predicted by mixing length theory modified to include eddy propagation12
along the mean flow, and (2) that the suppression can be inferred from particle trajectories13
by studying the structure of the autocorrelation function of the particle velocities beyond14
the first zero crossing. These results are then used to discuss how to compute lateral and15
vertical variations in eddy diffusivities using floats and drifters in the real ocean.16
1. Introduction17
Eddy transport across mean currents is a central element in many phenomena, such as in18
the poleward movement of warm waters in the Southern Ocean and the lateral spreading of19
nutrient-rich waters in upwelling zones. Understanding this transport, and parameterizing it20
in coarse resolution climate models, is of great interest at present (e.g. Toole and McDougall21
2001).22
Often the eddies responsible for transport derive from the instability of a mean current,23
such as the Antarctic Circumpolar Current (ACC) in the Southern Ocean or the California24
1
Current over the western slope of North America. This suggests that eddy transport is25
greatest near the mean current itself, as eddy mixing scales with eddy kinetic energy (Prandtl26
1925). However, there is a growing body of evidence suggesting that the mean flow also27
suppresses mixing (e.g. Nakamura 1996; Bower et al. 1985; Marshall et al. 2006; Abernathey28
et al. 2010; Ferrari and Nikurashin 2010). Thus assessing cross-jet transport involves finding29
the balance between the enhancement of mixing by instability and the suppression imposed30
by the mean.31
The present study seeks to improve this understanding by considering mixing in a the-32
oretical model and by measuring mixing with a realistic velocity field. The work builds on33
the study of Ferrari and Nikurashin (2010), extending the theoretical work to particles and34
by addressing mixing at depth in addition to that at the surface. It also follows a companion35
paper, Klocker et al. (2011), in which tracer- and particle-based diffusivities were compared.36
The present focus is on the Southern Ocean. We show that mixing is suppressed across37
the core of the ACC, i.e. from the surface down to 1500 m. Mixing is greater to the north38
of the ACC and below it. As suggested by the theoretical model, the suppression of the39
diffusivity is associated with the drift of eddies with respect to the mean flow. This in turn40
is manifested in a negative lobe in the particle autocorrelation function. Accurate diffusivity41
estimates thus require that this lobe be taken into account.42
The paper is organized as follows. The theoretical model is derived in Section 2. Then the43
velocity field, derived from fields in the Southern Ocean, is discussed in Section 3. Tracer-44
derived diffusivities are examined in Section 4a and compared directly to the theoretical45
model. Particle-based estimates are examined further in Section 4b, and recommendations46
are made for observational studies. The work concludes with Section 5.47
2
2. Theory48
To illustrate the suppression of mixing across a jet, we follow Ferrari and Nikurashin49
(2010) and represent eddy mixing as a stochastically forced wave equation. Ferrari and50
Nikurashin (2010) found that such a model, when used to advect a passive tracer, success-51
fully reproduces the meridional variation of the eddy diffusivity deduced using Nakamura’s52
technique (1996) applied to surface geostrophic velocities. Here we examine the particle-53
based (Lagrangian) diffusivities derived using a similar stochastic flow.54
We represent the ocean as an equivalent-barotropic fluid, governed by the quasi-geostrophic
potential vorticity (QGPV) equation:
∂tq + U∂xq + (∂yQ)∂xψ + J(ψ, q) = 0, (1)
where J the Jacobian operator, ψ is the geostrophic streamfunction representing the wave
motions and
q = ∇2ψ − Fψ (2)
is the associated potential vorticity (Pedlosky 1987). In the latter, ∇2ψ and Fψ represent55
the relative and stretching vorticities, respectively; F = 1/λ2 is the inverse square of the56
deformation radius. The waves are imbedded in a mean zonal flow U and a large-scale PV57
gradient ∂yQ = β+FU , where β is the planetary gradient of PV and the FU is the contribu-58
tion by the mean flow shear (in an equivalent-barotropic model U is the difference between59
the flow in the active layer and the quiescent abyss, so it is a proxy for the vertical shear).60
Curvature terms associated with the bending of the mean flow are neglected, consistent with61
the assumption that the mean flow varies on scales much larger than the waves.62
3
We express the streamfunction in terms of its Fourier transform:
ψ(x, y, t) =∑
k
∑
l
a(t)eikx+ily (3)
The amplitude, a, is then governed by:
d
dta+ ikcwa = N (4)
where N is a nonlinear function, proportional to the transform of the advective term and
where:
cw = U + c, c = − ∂yQ
κ2 + F(5)
with κ2 = k2 + l2 the square of the total wavenumber. c is the free phase speed of the63
baroclinic Rossby wave and cw is the Doppler shifted Rossby wave speed that would be64
measured with a Hovmoller diagram of the streamfunction. Thus (4) governs the evolution65
of Rossby waves forced by eddy interactions, represented by N (deriving, for example, from66
baroclinic instability).67
Analytical solutions to (4) can be obtained if one replacesN with a fluctuation-dissipation
stochastic forcing term, as this effectively linearizes the PV equation. There is an extensive
literature on such models (e.g. Farrell and Ioannou 1993; Flierl and McGillicuddy 2002;
DelSole 2004) wherein these representations are described. The particular form we will use
is:
N = −2U√γκ
r(t)eikx+ily − γaeikx+ily . (6)
The fluctuations are generated by a white noise random process r(t), with zero mean and an
autocorrelation 〈r(t)r∗(t′)〉 = δ(t − t′) (where 〈 · 〉 denotes the expected value and the star
is the complex conjugate). The amplitude of the forcing is determined by the constant U .
4
The dissipation is represented as a linear damping term acting on the potential vorticity (a
choice of simplicity rather than realism). Thus the evolution equation for the streamfunction
amplitude, a, is:
d
dta + ikcwa+ γa = −2U√γ
κr(t) (7)
The solution to (7) is:
a(t) =2U√γκ
∫
∞
0
r(t− τ)e−γτ−ikcwτ dτ, (8)
The form of the RHS is chosen to omit the initial condition, which is irrelevant in what
follows. Given this, the kinetic energy of the eddy field is:
EKE ≡ 1
2
(
|∂xψ|2 + |∂yψ|2)
= U2 , (9)
where the bars indicate a spatial average over the lateral domain. The result explains our68
choice of amplitude in (6).69
With the eddy streamfunction, we can derive relations for the motion of particles advected
by the field. As our focus is on mixing across the zonal mean current, we will concentrate
on meridional displacements. Following Taylor (1921), we can define a diffusivity in the
meridional direction:
K1y(x, y, t) =1
2
d
dt〈η2〉 =
∫ t
0
R(t′, t) dt′, (10)
where the integrand in the last term,
R(t− t′) ≡< vL(t; x, y, t)vL(t′; x, y, t) > , (11)
is the autocorrelation of the meridional Lagrangian velocity. Here vL(t′; x, y, t) is the velocity70
at time t′ of a particle that passes through (x, y) at time t. As the eddy field produced by the71
5
stochastic model is stationary, the autocorrelation only depends on the difference between72
t′ and t and we can accordingly replace the vL(t; x, y, t) with vL(0; x, y, 0) without loss of73
generality. Furthermore, as the eddy field is homogeneous, we can replace the ensemble74
average with an integral over space and the autocorrelation becomes independent of position.75
For small amplitude eddies, particles simply drift zonally at the speed U and one can
easily compute the Lagrangian velocity from the Eulerian one,
vL (t′; x, y, 0) = v (x− Ut′, y, t′) . (12)
While this relationship is valid only if one ignores, at leading order, the particle motions
induced by the eddies, the resulting autocorrelation appears to hold for finite amplitude
eddies as well, as noted hereafter. Armed with this relationship, the transformed Lagrangian
meridional velocity for the stochastically-driven flow is:
vL(t′; x, y, 0) =
∂ψ
∂x
∣
∣
∣
∣
(x−Ut′,y,t′)
= ika(t′)eik(x−Ut′)+ily (13)
with the amplitude, a, given in (8). As v is complex, we calculate the autocorrelation thus:
Rvv(t′) =
1
2< v∗(x− Ut′, y, t′)v(x, y, 0) + v(x− Ut′, y, t′)v∗(x, y, 0) > . (14)
Substituting in the full expression for v, we obtain:
Rvv =2k2U2γ
κ2
[∫
∞
0
dτ ′∫
∞
0
dτ r(t′ − τ ′)r(t− τ)e−γ(τ+τ ′)+ik(cw−U)(τ−τ ′) + c.c.
]
(15)
where c.c. is the complex conjugate of the preceding double integral. Using the fact that:
r(t′ − τ ′)r(t− τ) = δ(t′ − τ ′ − t + τ) (16)
Eq.(15) reduces to:
Rvv(t′) =
2k2 U2
κ2e−γt′ cos [k(cw − U)t′] (17)
6
The autocorrelation decays exponentially in time, with a time scale proportional to γ−1, the76
inverse of the linear damping coefficient. At the same time R oscillates, with a frequency of77
k(cw − U) = kc. This is a consequence of the wave-like nature of the solution.78
The meridional diffusivity is the integral of the autocorrelation. It is straightforward to
show that this has a long-time asymptote of:
limt→∞K1y =2k2
κ2γ U2
γ2 + k2(cw − U)2. (18)
Thus the character of the autocorrelation and the size of the diffusivity depend on cw−U = c.79
If c = 0, the diffusivity is proportional to the EKE times the eddy decorrelation timescale80
γ−1. This is what one would conclude from the mixing length theory (Prandtl 1925). With81
a non-zero c, the autocorrelation oscillates with lag and the diffusivity is suppressed.82
The phase speed c is proportional to the mean PV gradient, ∂yQ = β + FU . Thus c is83
likely large in jets where the surface PV gradient is large, while it is smaller and possibly84
zero on the flanks of jets where the surface PV gradient is weak. Critical layers where c = 085
can only arise at the lateral flanks of jets in the equivalent barotropic mode, but they arise86
also in the vertical in the real ocean if the mean flow decays with depth. The Rossby wave87
speed of the equivalent barotropic model must be interpreted as the surface phase speed88
c = cw−U(z = 0). In the real ocean, mean currents tend to decay in the vertical and critical89
layers develop also in the vertical where cw −U(z) = 0. Ferrari and Nikurashin (2010) show90
that Eq. (18) holds also for vertically varying flows, if one substitutes the depth dependent91
eddy kinetic energy U(z)2 in the numerator and the depth dependent vertical velocity U(z)92
in the denominator, while cw = U(z = 0)+c remains the surface Doppler shifted wave speed.93
Hence more generally the suppression of K1y vanishes also in the vertical at critical layers94
7
where cw = U(z). Such levels are the steering levels of baroclinic instability and must exist95
if the jet is to be baroclinically unstable (e.g. Pedlosky 1987). Thus one expects large cw−U96
in the upper core of jets and strong suppression of mixing. On the lateral and vertical flanks97
cw − U is instead weaker and mixing is not suppressed.98
In regions where the mean flow is weak, the mean PV gradient is just β and c is the99
slow (westward) phase speed of the baroclinic Rossby wave and there is little suppression of100
mixing.101
If we define K01y to be the eddy diffusivity for eddies with c = 0, then Eq. (18) can be
written as,
K1y =K0
1y
1 + k2(cw − U)2/γ2. (19)
This shows that the reduction in K is proportional to the ratio of the decorrelation timescale102
γ−1 over the advection timescale 1/k(cw − U) = 1/kc.103
Interestingly, one arrives at the same result if one considers a passive tracer (Ferrari and
Nikurashin 2010). Assuming a mean zonal flow and a mean meridional gradient for the
tracer, Γ, this is:
∂C
∂t+ U
∂C
∂x+ J(ψ,C) + Γv = 0 (20)
where ψ is the eddy streamfunction obtained above. The solution is obtained by calculating104
the correlation between C and the meridional velocity and then dividing the result by the105
mean gradient, Γ. The result is the same as the particle-based estimate in Eq. (18) and106
is equivalent to that obtained by Ferrari and Nikurashin (2010) (their Eq. (12)1). The107
1Eq. (18) corrects an inconsequential factor of 2 that did not appear in Eq. (12) of Ferrari and Nikurashin
(2010).
8
only difference is that cw − U in their model is the intrinsic phase speed of Eady waves108
propagating on the mean temperature gradient, because they use a surface quasi-geostrophic109
model instead of an equivalent barotropic model. Thus the present diffusivity is recovered110
if the Eady wave is replaced with a baroclinic Rossby wave. The tracer-based solution is111
obtained by assuming the tracer has the same structure as the eddy field, so that the Jacobian112
of ψ and C vanishes. This is equivalent to our linearization of the Lagrangian velocity in113
terms of the mean Eulerian flow.114
Green (1970) also derives a similar expression for the eddy diffusivity for potential vor-115
ticity in horizontally homogeneous, baroclinically unstable flow based on the fastest growing116
linear normal mode. We review the argument and discuss the connection to the present117
model in the Appendix.118
Thus the tracer- and particle-derived diffusivities agree. Such agreement was found in119
the numerical experiments of Klocker et al. (2011). It is also implicit in the results of120
Shuckburgh and Haynes (2003), who compared probability density functions (PDFs) for121
tracers and particles using a kinematic model.122
One can also compare the present approach with previous studies using stochastic models123
for particle advection. In particular, the “first order stochastic model with spin” examined by124
Veneziani et al. (2004) yields an autocorrelation function which is the product of a decaying125
exponential and an oscillatory function. In this model, the stochastic forcing is applied126
directly to the particle velocity, and the oscillatory behavior comes from a rotational term127
coupling the velocities in the x and y directions. Veneziani et al. (2004) determined the128
rotational frequency by studying the motion of looping float trajectories in the Gulf Stream129
region.130
9
The two approaches are complimentary. However, the philosophy is slightly different. In131
the stochastic model, the random forcing is applied directly to the particles, and the “spin”132
is imposed to reproduce the looping trajectories produced by ocean drifters and floats. The133
approach is purely kinematic. In the present model, the stochastic forcing represents the134
action of eddies in the potential vorticity equation. The particles are simply advected by the135
flow. This clarifies the physical basis for the looping motion of the particles and shows that136
the suppression of eddy diffusivities in the ocean is the result of eddy propagation.137
3. The velocity field138
To study the modulation of eddy mixing across a mean current, we construct a velocity139
field representative of the ACC using the geostrophic streamfunction as measured from140
altimeters. This is the same velocity field used in a companion paper (Klocker et al. 2011)141
- we will provide a summary here, but the reader is referred to Klocker et al. (2011) for a142
more detailed description.143
The sea level anomaly maps come from the combined processing of Ocean Topography144
Experiment (TOPEX) and European Remote Sensing Satellite-1 and 2 (ERS-1 and ERS-2)145
altimetry data, and the mean streamlines are computed using the zonal mean of the sum146
of the mean geoid and the 3-year time-mean sea-surface height from altimetry. The sea147
level data has a temporal resolution of 10 days and a spatial resolution of 1/4o longitude ×148
1/4o latitude. We then use the geostrophic relation to derive geostrophic velocities at the149
ocean surface and interpolate the velocities onto a 1/10o grid to advect tracers and floats.150
We construct two different velocity fields - an ‘eddy’ velocity field in which we only use sea151
10
surface height anomalies to calculate geostrophic velocities and a ‘full’ velocity field in which152
we add the zonal average of the zonal mean flow (ignoring the weak meridional mean flow).153
We focus on a region upstream of Drake Passage between 103o-78oW and 30o-66oS -154
the same region studied by the ongoing Diapycnal and Isopycnal Mixing Experiment in the155
Southern Ocean (DIMES). To calculate horizontal velocities below the surface we assume156
an equivalent-barotopic structure of the ACC as suggested by Killworth and Hughes (2002);157
that is, we scale the surface geostrophic velocity by a structure function µ(z). This struc-158
ture function is calculated from the output of the Southern Ocean State Estimate (SOSE;159
Mazloff et al. (2010)), an eddy-permitting general circulation model of the Southern Ocean160
constrained to observations in a least-squares sense. Using the surface geostrophic veloc-161
ity field and the structure function, we construct a three-dimensional map of geostrophic162
velocities.163
The advection of tracers and floats is purely horizontal, i.e. vertical velocities are ne-164
glected. A correction to the surface velocity field is imposed to eliminate the weak lateral165
convergences associated with upwelling and downwelling (see Marshall et al. (2006) for more166
details). This adjustment is small and hardly affects our estimates of eddy diffusivities. In167
addition, we impose no-normal flow conditions at the north-south boundaries and periodic168
conditions at the east-west boundaries.169
11
4. Suppression of eddy diffusivity across the Antarctic170
Circumpolar Current171
The equivalent-barotropic velocity field based on altimetric measurements and a state
estimate is now used to advect numerical floats and tracers. The tracer distributions are
used to calculate effective diffusivity as defined by Nakamura (1996),
Ke =κ
L20(y)
∂∂A
∫
|∇C|2dA(
∂C∂A
)2 (21)
where C is a tracer contour encircling the area A, κ is the numerical diffusivity used to
advect the tracer and L0(y) is the zonal extent of the domain at the latitude y (technically
the equivalent latitude as defined in Shuckburgh and Haynes (2003)). The float trajectories
are used to calculate the meridional single-particle diffusivity K1y as defined in Taylor (1921)
and Davis (1991),
K1y =1
2
d
dt〈(y(t)− y0)
2〉 (22)
where y(t) is the latitude of a particle released at y0 at t = 0, and 〈·〉 is the average over all172
particles released at y0.173
We only consider cross-ACC diffusivities, because Nakamura’s approach is not well suited174
to compute along-current diffusivities. In the Pacific sector considered, the ACC flow from175
the east is along latitude lines and hence the analysis is in terms of meridional diffusivities.176
Klocker et al. (2011) show that Ke and K1y are indistinguishable from each other if177
one uses a sufficient number of floats. Here we consider both estimates to illustrate how178
suppression of mixing across strong currents affects tracer and float statistics.179
12
a. Tracer-based estimates180
The results from the stochastic model suggest that the latitudinal variations in eddy181
diffusivity are best interpreted as a competition between the enhancement of mixing by182
eddy stirring and suppression by mean flow advection. We test this hypothesis by running183
two sets of calculations. In the first set, the tracer is advected by the full velocity field. In184
the second set, the tracer is advected by the eddy velocity only, i.e. by the full velocity185
minus the zonal mean ACC flow.186
Estimates of Ke from the tracer distributions obtained from the two calculations are187
shown in Fig. 1. In the absence of advection by the mean flow, Ke peaks in the core of the188
ACC, where the EKE is largest. This is consistent with mixing length scalings which posit189
that the eddy diffusivity is proportional to a mixing length scale times the square root of the190
EKE (Holloway 1986; Keffer and Holloway 1988). The addition of a mean flow, however,191
greatly reduces Ke, consistent with the theory outlined in Sec. 2. The suppression is most192
pronounced in the ACC where the mean flow is largest.193
Ferrari and Nikurashin (2010) show that the degree of suppression of diffusivity by the194
ACC is captured qualitatively and quantitatively by the scaling in Eq. (19) based on the195
stochastic model. Here we test the stochastic model throughout the full water column196
(Ferrari and Nikurashin (2010) considered only the ocean surface). We calculate Ke at ten197
levels between the surface and 4500 m using the surface geostrophic velocity field scaled198
according to the equivalent-barotropic structure function µ(z).199
Two sample vertical profiles of Ke are shown in Fig. 2, one for a region north of the ACC200
between 44oS and 46oS and the other for a region in the core of the ACC between 58oS to201
13
60oS (see Klocker et al. (2011) for full latitude-depth maps of eddy diffusivities). In the core202
of the ACC, the eddy diffusivity is suppressed by the mean flow at the surface and has a203
subsurface maximum around 1500 m, where the mean flow is weak. To the north, where the204
mean is weaker, the diffusivity is largest at the surface where the EKE is largest.205
To test whether these profiles are consistent with the model in Eq. (19), four parameters206
must be estimated at each latitude and depth: U , cw, K01y and γ/k. The surface mean flow207
is shown in Fig. 3 and is defined to be the zonally averaged velocity (there is no significant208
meridional velocity in the Pacific sector we study). The mean velocity at any other depth is209
obtained by multiplying the surface velocity by µ(z). The other three parameters are harder210
to estimate, because the oceanic eddy field is multichromatic with a wide range of eddy211
sizes, propagation speeds and decorrelation times (Wunsch 2010). Departing from previous212
literature that relies on somewhat arbitrary metrics to estimate mean representative values213
of these parameters (e.g. Tulloch et al. 2009), we use an approach better suited for analysis of214
eddy diffusivities. At each depth, we run a series of simulations where the tracer is advected215
by the velocity field u = ueddy + Uconsti, where ueddy is the depth dependent eddy velocity,216
Uconst is a constant zonal mean velocity independent of latitude and depth, and i is the zonal217
unit vector. The set of simulations use a mean velocity between -0.1 to 0.1 m s−1. Sample218
curves of Ke as a function of Uconst are shown in Fig. 4 for the two regions at the ocean219
surface, in the core of the ACC and north of it. The dependence of Ke on Uconst has the220
Lorentzian shape predicted by Eq. (19) and can be used to estimate all the parameters we221
need: the curve maximum corresponds to K01y and it is achieved when Uconst = cw. The222
curve width can be used to estimate γ/k.223
These three parameters, cw, K01y and γ/k are now estimated for each latitude and depth224
14
by least-squares fitting the Lorentzian Ke curves to Eq. (19). Fig. 4 shows that substituting225
the best-fit parameters in Eq. (19) reproduces the Lorentzian Ke curves remarkably well.226
Our best fit estimates suggest that eddies propagate eastward at cw=+1 cm s−1 in the core227
of the ACC and westward at cw=−1 cm s−1 north of it. These values are somewhat smaller228
than reported by Marshall et al. (2006), who estimated the speed of the most energetic229
eddies from altimetric data in the Southern Ocean. The discrepancy suggests the eddies230
that dominate eddy mixing are not the most energetic ones.231
Ferrari and Nikurashin (2010) argue that the decorrelation timescale of eddies, γ−1, is
proportional to the eddy turnover time, (k2EKE)−1/2. This scaling is expected to hold for
turbulent eddy fields with energy peaking at wavenumber k (Ottino 1998). We find that our
estimates of γ/k do scale with the square root of EKE, but only in the upper 1000 m. The
scaling breaks down at depth, where γ/k becomes depth independent, despite the decrease
in EKE. Eddy stirring below 2000 m, where EKE is small, is best characterized as a
superposition of time-dependent quasi-linear waves rather than a turbulent eddy field. This
limit is generally referred to as chaotic mixing and the decorrelation timescale is not set by
the eddy turnover time (Ottino 1989). In summary our best fit of γ/k as a function of depth
is,
γ
k= α0 + α1
√
EKE(z), (23)
where α0 and α1 vary with latitude (primarily because the eddy scale changes with latitude).232
Fig. 2 summarizes the results. The vertical profile of the effective diffusivity Ke is plotted233
for the two regions, one in the core of the ACC and the other north of it. The figure234
also shows K01y, i.e. the effective diffusivity in the absence of any suppression due to eddy235
15
propagation. In both regions K01y is substantially larger than Ke in the upper 2000 m, while236
Ke ≈ K01y below. The suppression is largest in the ACC region especially at the surface237
where the eddy propagation speed, cw ≈ +1 cm s−1, is much smaller than the mean flow238
speed, U ≈ +7 cm s−1. Fig. 2 further shows that dividing K01y by 1 + γ2
k2(U − cw)
2 recovers239
Ke very well, i.e. Eq.(19) together with best estimates of U , cw and γ/k captures well the240
suppression of eddy mixing due to eddy propagation with respect to the mean flow.241
Note that our goal is not to derive a closure scheme for eddy diffusivities. Rather we seek242
a theoretical model to interpret the vertical and horizontal variations in the diffusivities. We243
will show that the same model can be used to interpret Lagrangian estimates of eddy mixing244
and provides clues on why previous studies failed to capture suppression of mixing by mean245
flows when relying on float dispersion.246
b. Float-based estimates247
The stochastic model shows that the negative lobes in the Lagrangian velocity autocor-
relations are directly linked to suppression of mixing by eddy propagation. The negative
lobe is most pronounced when the period of oscillation of the cosine term, 2π/|U − cw|, is
shorter than the exponential decay timescale, i.e. the eddy decorrelation time scale γ−1 or
|U − cw| ≥ 2πγ
k. (24)
Otherwise the velocity correlation decays exponentially to zero with hardly any oscillation.248
Using the best estimates of γkand (U − cw) we can now verify whether the negative lobes in249
Rvv are most pronounced when Eq. (24) is satisfied. This would further support our claim250
that the suppression of eddy mixing can be inferred from Lagrangian trajectories provided251
16
that the number of trajectories is large enough to accurately compute the negative lobes in252
Rvv.253
In Sec. 3 we estimated that in the ACC (bin centered at 59oS) γ/k ≃ 0.03 m s−1 and254
|U − cw| ≃ 0.06 m s−1, whereas to the north (bin centered at 45oS) γ/k ≃ 0.03 m s−1 and255
|U − cw| ≃ 0.03 m s−1. Hence |U − cw| > γ/k in the ACC, leading to a large negative lobe in256
Rvv. North of the ACC, |U − cw| ≃ γ/k and the negative lobe is less pronounced. The width257
of the negative lobes of the Lagrangian autocorrelation function scales as π/k|U − cw| as per258
Eq. (17). In the ACC latitude band eddies have scales of approximately 100 km, and hence259
k ≈ 2π/100 km−1. This gives a negative lobe of 20 days, a value consistent with the width of260
the negative lobe of Rvv in Fig. 5a (solid line). For comparison, Fig. 5a (dashed line) shows261
Rvv computed from trajectories advected by the eddy velocity field only (i.e. no mean); the262
negative lobe is much less pronounced since in these simulations for which |cw| < γ/k. The263
single-particle diffusivities corresponding to these Lagrangian velocity autocorrelations are264
shown in Fig. 5b.265
The stochastic model derived in Sec. 2 suggests that particle- and tracer-derived estimates266
of diffusivity are equivalent. Consistently, Klocker et al. (2011) showed similar agreement267
everywhere in the Southern Ocean sector considered here. However, other studies using tra-268
jectories from real drifters and floats deployed in the Southern Ocean (e.g. Sallee et al. 2008)269
obtain diffusivities larger than those reported here. The present results, and those of Klocker270
et al. (2011), suggest that the discrepancy lies with computation of the autocorrelation. As271
the uncertainty in the autocorrelation increases with lag, it is common practice to fit an272
exponential function (e.g. Garraffo et al. 2001; Sallee et al. 2008) or to integrate Rvv only up273
to the first zero crossing (e.g. Freeland et al. 1975; Poulain and Niiler 1989). In both cases,274
17
the negative lobe in Rvv is ignored and the diffusivity thereby overestimated.275
5. Summary and discussion276
We computed lateral eddy diffusivities using tracers and floats advected by a proxy veloc-277
ity field to study the suppression of eddy mixing by eddy propagation along mean flows. We278
focussed on a region in the Southern Ocean, upstream of Drake Passage, which is the region279
of a large field experiment, the Diapycnal and Isopycnal Mixing Experiment in the Southern280
Ocean (DIMES). The main goal of DIMES is to quantify both isopycnal and diapycnal dif-281
fusivities in the Southern Ocean. In a companion paper (Klocker et al. 2011) we have shown282
that eddy diffusivities calculated using tracer and particle-based approaches are equivalent.283
In this manuscript, we used these lateral and vertical profiles of eddy diffusivities to study284
(1) what suppresses eddy mixing across mean flows and (2) to identify what statistics from285
float observations are robust markers of mixing suppression. The latter point is especially286
relevant to DIMES, since a primary aim is to estimate eddy diffusivities and their variations287
from the release of neutrally buoyant floats.288
We addressed point (1) using mixing length arguments together with the eddy diffusivities289
calculated from the proxy velocity field. Traditional mixing length arguments assume that290
eddy diffusivity is proportional to the eddy kinetic energy times a mixing length (e.g. Prandtl291
1925). In the oceanographic literature, it is often assumed that the mixing length scales with292
the eddy size (e.g. Holloway 1986), but Ferrari and Nikurashin (2010) found that propagating293
eddies reduce the mixing length and thereby play a crucial role in determining the variations294
in eddy diffusivity across the ocean. We extended the model here to study Lagrangian295
18
estimates of diffusivity. We find, in particular, that the latter is identical to the tracer-based296
estimate, confirming the numerical results of Klocker et al. (2011).297
In Klocker et al. (2011) we found that eddy diffusivities are smaller than 1000 m2 s−1298
in the core of the ACC from the surface down to 1500 m, but are larger than 1000 m2 s−1299
at depth and on the lateral flanks. Ferrari and Nikurashin (2010) interpret this pattern as300
evidence that mixing is suppressed in the core of the ACC where eddies propagate slower301
than the mean current: eddies propagate eastward at a few cm s−1, while the mean current302
flows at O(10 cm s−1). On the flanks of the ACC and at depth the mean current speed is303
weaker and comparable to the eddy speed. These are the critical layers where there is no304
suppression of mixing.305
To test the suppression of mixing by eddy propagation along mean flows, we ran a306
series of experiments with an eddy-only velocity field (i.e. the geostrophic velocity field307
calculated from sea surface height anomalies) and then added a constant zonal mean velocity308
independent of depth and latitude. By changing the mean velocity, we changed the relative309
speed between the eddies and the mean flow. We found that the eddy diffusivities computed310
for different mean flows followed closely the scaling law derived in Ferrari and Nikurashin311
(2010). That is, the spatial variations in eddy diffusivities estimated by Klocker et al. (2011)312
can be explained by mixing length arguments, if the drift of the eddies with respect to the313
mean flow is taken into account.314
Next we focussed on how to estimate the suppression of mixing using observations.315
Presently the only feasible approach to sample eddy diffusivities in the global ocean is by316
releasing drifters and floats (tracer release experiments are also an option, but are too costly317
to be done in more than a handful of locations). Previous analyses of drifter trajectories318
19
from the Southern Ocean (e.g. Sallee et al. 2008; Griesel et al. 2010) failed to show such319
mixing suppression across the mean flows.320
As seen in Klocker et al. (2011) and with the present stochastic model, the Lagrangian321
velocity autocorrelation is comprised of an exponentially decaying part and an oscillatory322
part; the latter depends on the phase speed of the eddies relative to the mean flow. If eddies323
and mean flow propagate at different speeds, the oscillatory part produces a negative lobe in324
the autocorrelation; this disappears when the eddies and mean flow propagate at the same325
speed. The negative lobe leads to a suppression of mixing, because it contributes negatively326
to the integral of the autocorrelation, which is the diffusivity. In order to properly sample327
these negative lobes in the ACC, one must resolve time lags of order a month. Many previous328
observational estimates truncated the calculation at much shorter time lags of order one week329
and thereby missed the suppression.330
In any case, it is difficult to obtain accurate estimates of eddy diffusivities from float331
statistics alone (see Klocker et al. (2011) for a more detailed discussion on necessary float332
statistics). Rather one needs to combine float trajectories with additional information,333
such as the release of tracer patches, satellite-derived geostrophic velocities together with334
equivalent-barotropic scaling arguments, or high-resolution numerical models.335
Acknowledgments.336
This work was done as part of the Diapycnal and Isopycnal Mixing Experiment in the337
Southern Ocean (DIMES). We wish to acknowledge the generous support of NSF through338
award OCE-0825376 (RF and AK). We also wish to thank all the DIMES principal investi-339
20
APPENDIX341
Green (1970) proposed a theory for PV fluxes in a horizontally homogeneous, baroclini-
cally unstable flow based on the fastest growing linear normal mode. This idea was further
developed as a full eddy parameterization scheme by Killworth (1997). The upshot of linear
theory is that mixing by the most unstable mode in the quasi-geostrophic approximation
generates a diffusivity given by,
Klinear =k−1
κ2ciEKE
c2i + (U − cr)2, (A1)
where ci and cr are the imaginary and real speeds of the most unstable baroclinic mode. If one342
assumes that eddies decorrelate on a timescale proportional to their growth rate, ci ∼ k−1γ,343
and propagate at the speed of the most unstable mode, cr = cw, then one recovers Eq. (18).344
Hence Green’s theory can be viewed as a special example of a general class of mixing models345
that account both for the finite eddy decorrelation time and for the eddy propagation speed.346
22
347
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26
List of Figures419
1 Ke estimated from a tracer advected with the eddy velocity field (black dashed420
line) and the full velocity field (black solid line) at the ocean surface. These421
diffusivity estimates are compared to the square-root of eddy kinetic energy422
(gray line). 28423
2 (a) Zonal mean vertical profiles of Ke averaged over the 44oS to 46oS latitude424
stripe north of the ACC (solid back line). The dashed black line shows K0425
from simulations where the mean flow is set equal to the eddy speed, so that426
eddy propagation does not suppress cross-current mixing. The gray line is427
obtained dividing K0 by the suppression factor predicted by Eq. (19). (b)428
Same as in panel (a) but for the 58oS to 60oS latitude stripe in the core of the429
ACC. 29430
3 Zonal mean surface velocity (solid line) and phase speed (dashed line) of the431
domain. 30432
4 Ke as a function of mean flow Uconst (black lines) and a least-squares fit of433
Eq.(19) (gray lines), for the region north of the ACC between 44oS and 46oS434
(dashed lines) and the core of the ACC between 58oS to 60oS (solid lines). 31435
5 (a) The Lagrangian velocity autocorrelation and (b) the corresponding single436
particle diffusivities for a region in the ACC for the full velocity field (solid437
lines) and the eddy velocity field (dashed lines). (figure adapted from Klocker438
et al. (2011)) 32439
27
−60
−55
−50
−45
−40
−35
0 0.05 0.1 0.15
latit
ude
sqrt(EKE) [ms−1]
−60
−55
−50
−45
−40
−350 1000 2000 3000 4000
Ke [m2s−1]
Figure 1: Ke estimated from a tracer advected with the eddy velocity field (black dashedline) and the full velocity field (black solid line) at the ocean surface. These diffusivityestimates are compared to the square-root of eddy kinetic energy (gray line).
28
0 500 1000 1500 2000 2500−4500
−4000
−3500
−3000
−2500
−2000
−1500
−1000
−500
0
K [m2s−1]
dept
h [m
]
Ke (north)
K0 (north)
Ktheory
(north)
(a) 45oS
0 500 1000 1500 2000 2500 3000 3500−4500
−4000
−3500
−3000
−2500
−2000
−1500
−1000
−500
0
K [m2s−1]
dept
h [m
]
Ke (ACC)
K0 (ACC)
Ktheory
(ACC)
(b) 59oS
Figure 2: (a) Zonal mean vertical profiles of Ke averaged over the 44oS to 46oS latitudestripe north of the ACC (solid back line). The dashed black line shows K0 from simulationswhere the mean flow is set equal to the eddy speed, so that eddy propagation does notsuppress cross-current mixing. The gray line is obtained dividing K0 by the suppressionfactor predicted by Eq. (19). (b) Same as in panel (a) but for the 58oS to 60oS latitudestripe in the core of the ACC.
29
−0.03 −0.02 −0.01 0 0.01 0.02 0.03 0.04 0.05 0.06 0.07
−60
−55
−50
−45
−40
−35
[ms−1]
Latit
ude
Uc
w
Figure 3: Zonal mean surface velocity (solid line) and phase speed (dashed line) of thedomain.
30
−0.1 −0.08 −0.06 −0.04 −0.02 0 0.02 0.04 0.06 0.08 0.10
500
1000
1500
2000
2500
3000
3500
U [ms−1]
K [m
2 s−1 ]
ACCACC (fit)northnorth (fit)
Figure 4: Ke as a function of mean flow Uconst (black lines) and a least-squares fit of Eq.(19)(gray lines), for the region north of the ACC between 44oS and 46oS (dashed lines) and thecore of the ACC between 58oS to 60oS (solid lines).
31
0 20 40 60 80 100 120 140 160
−0.3
−0.2
−0.1
0
0.1
0.2
0.3
time [days]
Rvv
(a) Rvv
0
500
1000
1500
2000
2500
3000
3500
4000
4500
0 40 80 120 160
K [m
2 s−1 ]
time [days]
(b) K1y
Figure 5: (a) The Lagrangian velocity autocorrelation and (b) the corresponding singleparticle diffusivities for a region in the ACC for the full velocity field (solid lines) and theeddy velocity field (dashed lines). (figure adapted from Klocker et al. (2011))
32
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