Post on 04-Jan-2016
Dynamics of a compound vesicle*
Yuan-Nan Young
New Jersey Institute of Technology
Shravan Veerapaneni, New York University
Petia Vlahovska, Brown University
Jerzy Blawzdziewicz, Texas Technological University
*Submitted to Phys. Rev. Lett., 2010
Funding from NSF-CBET, NSF-DMS
Biological motivation: Red blood cell (RBC)
(Alison Forsyth and Howard Stone, Princeton University)
RBC dynamics, ATP release, and shear viscosity• Correlation between RBC
dynamics and ATP release
• Correlation between RBC dynamics and shear viscosity
(Alison Forsyth and Howard Stone, Princeton University)
Biological mimic: Elastic membrane (vesicle)
(J. Fluid Mech. Submitted (2010) )
•Vesicle in shear flow
• A vesicle is a closed lipid bi-layer membrane, and the total area is conserved because the number of lipids in a monolayer and the area per lipid are fixed
• The enclosed volume is conserved as well
• For red blood cell mimic, the vesicle membrane also has a finite shear elasticity
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∇s ⋅r u
s≡ I − n ⊗ n( ) :∇
r u = 0,
∇ ⋅r u = 0.
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−∇p( in, out) + μ in, out( )∇ 2 r u in, out( ) =∇ ⋅T in, out( ) = 0, ∇ ⋅
r u in, out( ) = 0,
T = −pI + μ ∇r u + ∇
r u ( )
T
[ ], ˆ n ⋅ T out − T in( ) = τ m .
τ m is the membrane surface forces with elastic component.
Biological mimic: Capsule (cont.)
(J. Fluid Mech. Submitted (2010))
•Capsule in shear flow
• Small-deformation theory is employed to understand the dynamics of capsule in shear flow
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rs =1+ εf θ,ϕ( ) =1+ ε f jmY jm
m=− j
j
∑j= 2
∞
∑ ,
where Y jm is the scalar spherical harmonics.
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The leading - order equations for amplitude f2m = R(t) e−imψ t( )
˙ ψ = −1
2+
Λ−1
2Rcos 2ψ( ) + ε0
SΛ( )−1
2Rsin 2φ − 2ψ( ),
˙ R = Λ−1 1− R2( )sin 2ψ( ) + SΛ( )
−1ε0 1− R2
( )cos(2φ − 2ψ ) − R 1− R2( ) 1−ε0
2( ){ },
˙ φ = −1
2. ε0 : asphericity, S -1 =
2Δ
15πCa−1, Λ−1 =
8 30π
23λ + 32( ) Δ, Δ : excess area.
Ca =μ out ˙ γ R0
η, Δ ≡
A0
R02 − 4π , ε ~ Δ.
Biological mimic: Capsule (cont.)
•Capsule in shear flow
• Three types of capsule dynamics in shear flow: tank-treading (TT), swinging (SW), and tumbling (TB)
•0=0.5, Ca=0.2 and =0.02
• Transition from SW to TB as a function of (a)outin, and(b) 0
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Capillary number : Ca ≡μ out ˙ γ R0
η.
Biological mimic: Capsule (cont.)
•Capsule in shear flow
• SW-TB transition at the
limit 0 <<1 and R~ 0
• SW-TB transition for
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˙ R ~ Λ−1 sin 2ψ( ) + SΛ( )−1
ε0 cos t + 2ψ( ) − R[ ],
Assuming ε0S−1 ~ O(1), at leading order
R ~ ε0 ε0−1S sin 2ψ( ) + cos t + 2ψ( )[ ],
˙ ψ ~Λ−1
2S
cos 2ψ( ) − S−1ε0 sin t + 2ψ( )sin 2ψ( ) + S−1ε0 cos t + 2ψ( )
.
Periodic solution for ψ is possible for S−1ε0 ≤1.
TB occurs when S−1ε0 >1⇒
Cac−1 =
15π
2Δε0
−1 ⇒ Reproduces the transition boundary
from computations for 0 ≤ ε0 ≤ 0.5.
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0 →1 and R →1
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˙ ψ ~ −1
2+
Λ−1
2cos 2ψ( ) −
SΛ( )−1
2sin t + 2ψ( )
= -1
2+
Λ−1
2Bcos 2ψ −θB( ),
B ≡ 1+ S−2 − 2S−1 sin t( ),θB ≡ tan−1 S−1 cos t( )1− S−1 sin t( )
⎛
⎝ ⎜
⎞
⎠ ⎟.
For periodic solutions ˙ ψ dt0
2π
∫ =ψ 2π( ) −ψ 0( ) = 0,
this is possible only when Cac−1 ≤
15π
2Δ1− Δ
23λ + 32
8 30π
⎛
⎝ ⎜
⎞
⎠ ⎟2 ⎡
⎣ ⎢ ⎢
⎤
⎦ ⎥ ⎥
(J. Fluid Mech. Submitted (2010))
Introduction• Enclosing lipid membranes with sizes
ranging from 100 nm to 10 m
• Vesicle as a multi-functional platform for drug delivery
(Park et al., Small 2010)
Configuration
• A vesicle is a closed lipid bi-layer membrane, and the total area is conserved because the number of lipids in a monolayer and the area per lipid are fixed.
• The enclosed volume is conserved as well.
• A vesicle is placed in a linear (planar) shear flow.
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∇s ⋅v s≡ I − n ⊗ n( ) :∇v = 0,
∇ ⋅v = 0.
Formulation• The system contains three
dimensionless parameters: Excess area , Viscosity ratio Capillary number
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Excess Area Δ ≡A0
R02 − 4π ,
Reduced Volume V * ≡ 1+Δ
4π
⎛
⎝ ⎜
⎞
⎠ ⎟−
3
2.
R0 = 3V0 /4π3 ,
λ ≡η inside
η outside
,χ ≡ληa3 ˙ γ
κ.
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v∞ = ˙ γ E ⋅r r , E =
1
2
0 1+ ω 0
1−ω 0 0
0 0 0
⎛
⎝
⎜ ⎜ ⎜
⎞
⎠
⎟ ⎟ ⎟, ω =1 for linear shear flow.
η outside∇2v outside −∇poutside = 0, ∇ ⋅v outside = 0.
λη outside∇2v inside −∇pinside = 0, ∇ ⋅v inside = 0.
∇ ⋅v = 0, in - extensible membrane ⇒ ∇ s ⋅v s= 0.
Formulation (cont.)• The compound vesicle
encloses a particle (sphere of radius a < R0)
• Small-deformation theory is employed:
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r = r0 + f (Ω) = r0 + f jmY jm,m=− j
m= j
∑j= 2
∞
∑
Δ =( j + 2)( j −1)
2f jm
jm
∑ f jm* + h.o.t.,
r y jm 0 = j j +1( )[ ]
−1/ 2r∇ΩY jm,
r y jm1 = −iˆ r ×
r y jm 0,
r y jm 2 = ˆ r Y jm .
•The rigid sphere is assumed to be concentric with the vesicle.
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• f jm ~ ε
Small-deformation theory• Velocity field inside and outside vesicle
•Singular at origin
•Singular at infinity
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vout = c jmq∞
jmq
∑ u jmq+ − u jmq
−( ) + c jmq u jmq
− + X jm q | q'( )q'
∑ u jmq '−
⎡
⎣ ⎢ ⎢
⎤
⎦ ⎥ ⎥jmq
∑
vin = c jmq u jmq− + X(q | q')u jmq '
−
q'
∑ ⎡
⎣ ⎢ ⎢
⎤
⎦ ⎥ ⎥jmq
∑
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u jm 0− =
1
2r j 2 − j +j
r2
⎛
⎝ ⎜
⎞
⎠ ⎟r y jm 0 + j j +1( ) 1−
1
r2
⎛
⎝ ⎜
⎞
⎠ ⎟r y jm 2
⎡
⎣ ⎢
⎤
⎦ ⎥
u jm1− =
1
r j +1
r y jm1
u jm 2− =
1
2r j2 − j( )
j
j +11−
1
r2
⎛
⎝ ⎜
⎞
⎠ ⎟r y jm 0 + j +
2 − j
r2
⎛
⎝ ⎜
⎞
⎠ ⎟r y jm 2
⎡
⎣ ⎢
⎤
⎦ ⎥
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u jm 0+ =
r j−1
2− j +1( ) + j + 3( )r2
[ ]r y jm 0 − j j +1( ) 1− r2
( )r y jm 2
u jm1+ = r j r y jm1
u jm 2+ =
r j−1
23+ j( )
j +1
j1− r2( )
r y jm 0 + j + 3− j +1( )r2
( )r y jm 2
⎡
⎣ ⎢
⎤
⎦ ⎥
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Vector Spherical Harmonics
r y jm 0 =
r
j( j +1)∇ΩY jm
r y jm1 = −iˆ r ×
r y jm 0
r y jm 2 = ˆ r Y jm
Scattering matrix Xjm(q|q’)• The enclosed rigid sphere (of radius a
<1) is concentric with the vesicle. Thus the sphere can only rotate inside the vesicle in a shear flow. This means the velocity must be the rigid-body rotation at r=a.
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vS inc + vS scat = α mu1m1+
m
∑ at r = a,
vS inc = c jmqu jmq+ , vS scat = c jmq X jm q | q'( )u jmq '
−
qq '
∑ .jm
∑jmq
∑
Scattering matrix Xjm(q|q’) (cont’d)
• For any coefficients c2mq the following equations have to be satisfied
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X11 = −a5, X00 = −1
2a5 −3+ 5a2
( ),
X20 = −5 6
4a5 1− a2
( ),X02 =5 6
4a3 1− a2
( )2,
X22 =a3
4−15a4 + 36a2 − 25( ).
X01 = X10 = X12 = X21 = 0.
•Velocity continuity at r=a gives
(Young et al., to be submitted to J. Fluid Mech.)
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c2m 0
a
2−3+ 5a2
( ) +1
a4X00
⎡ ⎣ ⎢
⎤ ⎦ ⎥+ c2m2 5a
3
81− a2( ) +
X20
a4
⎡
⎣ ⎢
⎤
⎦ ⎥= 0,
c2m 0
3
2− 1− a2
( ) +a2 −1
2a4 X00 +1
a4
2
3X02
⎡
⎣ ⎢
⎤
⎦ ⎥+ c2m2
a 5 − 3a2( )
2+
3
2
a2 −1
a4 X20 +X22
a2
⎡
⎣ ⎢ ⎢
⎤
⎦ ⎥ ⎥= 0.
Amplitude equations• Surface incompressibility gives
• Balance of stresses on the vesicle membrane gives the tension and cjm2. Combining everything, we obtain
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c jm2 =j( j +1) 1+ X00( ) − 2X02
2 − j j +1( )X20 + 2X22
c jm0 ≡ αc jm0.
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D'=D
1+X02
α+ X22
, D =1
α−
2 j +1
j( j +1)+
3(2 j +1)
j( j +1)− 2(2 j +1)
⎡
⎣ ⎢
⎤
⎦ ⎥ when λ =1.
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df jm
dt= iω
m
2f jm −
1
D'c jm 0
∞ 2 j +1
j( j +1)+ c jm2
∞ −3(2 j +1)
j( j +1)+ 2 2 j +1( )
⎛
⎝ ⎜
⎞
⎠ ⎟−
Ef jm
χ
⎡
⎣ ⎢
⎤
⎦ ⎥
Tank-treading to tumbling: >1• In a planar shear flow, vesicle tank-treads at
a steady inclination angle for small excess area .
• Vesicle tumbles if
• In experiments (3D) and direct numerical simulations (2D), vesicle in a shear flow does not tumble without viscosity mismatch even at large .
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> c ≡ −9
23+
120
23
2π
15Δ
(Vlahovska and Gracia, PRE, 2007)
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˜ Δ = Δ1/ 2 9 + 23λ
16π 3 / 2 30
•Inclination angle
Tumbling of a compound vesicle:
• The vesicle rotates as a rigid particle as
This is because
• The inclination angle is a function of enclosed particle radius a and excess area
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a →1
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1+X02
α+ X22 → 0 as a →1.
•Inclination angle vs excess area
•Geometric factor vs radius
=2 =0•Critical radius vs reduced volume
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V ≡ 1+Δ
4π
⎛
⎝ ⎜
⎞
⎠ ⎟−3 / 2
• Compound vesicle tumbles when the inclusion size is greater than the critical particle radius ac.
• Effectively the interior fluid becomes more viscous due to the rigid particle, and we can quantitatively describe the effective interior viscosity by the transition to tumbling dynamics.
Effective interior fluid viscosity• The compound vesicle can be
viewed as a membrane enclosing a homogeneous fluid with an effective viscosity, estimated as
•Effective interior fluid viscosityRheology of c-vesicles
•Effective shear viscosity for the dilute suspension
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ηeff acritical( )η out
≡ −9
23+
120
23
2π
15Δ
•First normal stress for the dilute suspension
Conclusion • Compound vesicle can tumble in shear flow
without viscosity mismatch
• Effective interior viscosity is quantified as a function of particle radius a
• Rheology of the dilute compound vesicle suspension depends on the “internal dynamics” of compound vesicles
Compound Capsule
• A pure fluid bi-layer membrane is infinitely shear-able.
• Polymer network lining the bi-layer gives rise to finite shear elasticity.
• Assuming linear elastic behavior, the elastic tractions are
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t μ = −2 KA − μ( )(∇ s ⋅d)H ˆ n + KA − μ( )∇ s∇ s ⋅d + μ∇ s ⋅ ∇ sd ⋅ Is + Is ⋅ ∇ sd( )T
[ ]
d is the displacement of a material particle
KA stretch modulus( ) ~ 200N /m,μ shear elastic modulus( ) ~ 10−6 N /m
∇ s ⋅d = 0 for an inextensible capsule.
Compound Capsule (cont.)• Extra parameter for shear
elasticity• Starting from the tank-
treading unstressed “reference” membrane
• For deformation of a membrane with fixed ellipticity, the transition between trank-treading (swinging) and tumbling can be found using min-max principle
• Following Rioual et al. (PRE 2004) the critical particle radius can be found as a function of the swelling ratio (reduced area) in two-dimensional system.
• Rigorous small-deformation for the 2D compound vesicle is conducted.
• Comparison with boundary integral simulation results is consistent.
•Critical radius in 2D
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≡A
πR2
2D compound vesicle
Effective interior fluid viscosity• The compound vesicle can be
viewed as a membrane enclosing a homogeneous fluid with an effective viscosity, estimated as
•Effective interior fluid viscosity
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Txy ≡5
2−
f (a)
D'−
D'2
E 2 + D'2 ⎛
⎝ ⎜
⎞
⎠ ⎟, f (a) =
5 6 1+ X00 + X20α( ) +10αζ
αζD'.
Dilute Suspension of c-vesicles•Effective shear viscosity
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ηeff acritical( )η out
≡ −9
23+
120
23
2π
15Δ
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N1 ≡3Δ
4πEf (a) ≥ 0, E =
160π
3Δ− D'2 ,ζ =
6 1+ X00( ) − 2X02
2 − 6X20 + 2X22
.