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In [[fluid dynamics]], the '''Basset–Boussinesq–Oseen equation''' ('''BBO equation''') describes the motion of – and forces on – a small particle in [[unsteady flow]] at low [[Reynolds number]]s. The equation is named after [[Joseph Valentin Boussinesq]], [[Alfred Barnard Basset]] and [[Carl Wilhelm Oseen]].
 
==Formulation==
 
One formulation of the BBO equation is the one given by {{harvtxt|Zhu|Fan|1998|pp=18–27}}, for a spherical particle of diameter <math>d_p</math>, position <math>\boldsymbol{x}=\boldsymbol{X}_p(t)</math> and mean [[density]] <math>\rho_p</math> moving with particle velocity <math>\boldsymbol{U}_p=\text{d} \boldsymbol{X}_p / \text{d}t</math> – in a fluid of density <math>\rho_f</math>, [[dynamic viscosity]] <math>\mu</math> and with ambient (undisturbed local) [[flow velocity]] <math>\boldsymbol{U}_f:</math><ref>With {{harvtxt|Zhu|Fan|1998|pp=18–27}} referring to {{harvtxt|Soo|1990}}</ref>
 
:<math>
\begin{align}
  \frac{\pi}{6} \rho_p d_p^3 \frac{\text{d} \boldsymbol{U}_p}{\text{d} t}
  &= \underbrace{3 \pi \mu d_p \left( \boldsymbol{U}_f - \boldsymbol{U}_p \right)}_{\text{term 1}}  
  - \underbrace{\frac{\pi}{6} d_p^3 \boldsymbol{\nabla} p}_{\text{term 2}}
  + \underbrace{\frac{\pi}{12} \rho_f d_p^3\,
    \frac{\text{d}}{\text{d} t} \left( \boldsymbol{U}_f - \boldsymbol{U}_p \right)}_{\text{term 3}}
  \\ &
  + \underbrace{\frac{3}{2} d_p^2 \sqrt{\pi \rho_f \mu}
    \int_{t_{_0}}^t \frac{1}{\sqrt{t-\tau}}\, \frac{\text{d}}{\text{d} \tau} \left( \boldsymbol{U}_f - \boldsymbol{U}_p \right)\,
                    \text{d} \tau}_{\text{term 4}}
  + \underbrace{\sum_k \boldsymbol{F}_k}_{\text{term 5}} .
\end{align}
</math>
 
This is [[Newton's second law]], with in the [[left-hand side]] the particle's [[time derivative|rate of change]] of [[linear momentum]], and on the [[right-hand side]] the [[force]]s acting on the particle. The terms on the right-hand side are respectively due to the:<ref>{{harvtxt|Zhu|Fan|1998|pp=18–27}}</ref>
# [[Stokes' drag]],
# [[pressure gradient]], with <math>\boldsymbol{\nabla}</math> the [[gradient]] operator,
# [[added mass]],
# [[Basset force]] and
# other forces on the particle, such as due to [[gravity]], etc.
 
The particle Reynolds number <math>R_e:</math>
 
:<math>R_e = \frac{\max\left\{ \left| \boldsymbol{U}_p - \boldsymbol{U}_f \right| \right\}\, d_p}{\mu/\rho_f}</math>
 
has to be small, <math>R_e<1</math>, for the BBO equation to give an adequate representation of the forces on the particle.<ref>{{Cite book | publisher = Springer | isbn = 9780792333760 | last = Green | first = Sheldon I. | title = Fluid Vortices | year = 1995 | page = 831 }}</ref>
 
Also {{harvtxt|Zhu|Fan|1998|pp=18–27}} suggest to estimate the pressure gradient from the [[Navier–Stokes equations]]:
 
:<math>
  -\boldsymbol{\nabla} p
  = \rho_f \frac{\text{D} \boldsymbol{u}_f}{\text{D} t}
  - \mu \boldsymbol{\nabla}\!\cdot\!\boldsymbol{\nabla} \boldsymbol{u}_f,
</math>
 
with <math>\text{D} \boldsymbol{u}_f / \text{D} t</math> the [[material derivative]] of <math>\boldsymbol{u}_f.</math> Note that in the Navier–Stokes equations <math>\boldsymbol{u}_f(\boldsymbol{x},t)</math> is the fluid velocity field, while in the BBO equation <math>\boldsymbol{U}_f</math> is the undisturbed fluid velocity at the particle position: <math>\boldsymbol{U}_f(t)=\boldsymbol{u}_f(\boldsymbol{X}_p(t),t).</math>
 
==Notes==
{{reflist}}
 
==References==
{{refbegin}}
*{{Cite book
| publisher = Springer
| isbn = 9783540646129
| editor-last = Johnson
| editor-first = Richard W.
| title = The Handbook of Fluid Dynamics
| year = 1998
| chapter = Chapter 18 – Multiphase flow: Gas/Solid
| last1 = Zhu
| first1 = Chao
| last2 = Fan
| first2 = Liang-Shi
}}
*{{Cite book
| publisher = Ashgate Publishing
| isbn = 9780566090332
| last = Soo
| first = Shao L.
| title = Multiphase Fluid Dynamics
| year = 1990
}}
{{refend}}
 
{{DEFAULTSORT:Basset-Boussinesq-Oseen equation}}
[[Category:Equations of fluid dynamics]]

Revision as of 23:17, 3 November 2013

In fluid dynamics, the Basset–Boussinesq–Oseen equation (BBO equation) describes the motion of – and forces on – a small particle in unsteady flow at low Reynolds numbers. The equation is named after Joseph Valentin Boussinesq, Alfred Barnard Basset and Carl Wilhelm Oseen.

Formulation

One formulation of the BBO equation is the one given by Template:Harvtxt, for a spherical particle of diameter dp, position x=Xp(t) and mean density ρp moving with particle velocity Up=dXp/dt – in a fluid of density ρf, dynamic viscosity μ and with ambient (undisturbed local) flow velocity Uf:[1]

π6ρpdp3dUpdt=3πμdp(UfUp)term 1π6dp3pterm 2+π12ρfdp3ddt(UfUp)term 3+32dp2πρfμt0t1tτddτ(UfUp)dτterm 4+kFkterm 5.

This is Newton's second law, with in the left-hand side the particle's rate of change of linear momentum, and on the right-hand side the forces acting on the particle. The terms on the right-hand side are respectively due to the:[2]

  1. Stokes' drag,
  2. pressure gradient, with the gradient operator,
  3. added mass,
  4. Basset force and
  5. other forces on the particle, such as due to gravity, etc.

The particle Reynolds number Re:

Re=max{|UpUf|}dpμ/ρf

has to be small, Re<1, for the BBO equation to give an adequate representation of the forces on the particle.[3]

Also Template:Harvtxt suggest to estimate the pressure gradient from the Navier–Stokes equations:

p=ρfDufDtμuf,

with Duf/Dt the material derivative of uf. Note that in the Navier–Stokes equations uf(x,t) is the fluid velocity field, while in the BBO equation Uf is the undisturbed fluid velocity at the particle position: Uf(t)=uf(Xp(t),t).

Notes

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References

Template:Refbegin

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  • 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.

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Template:Refend

  1. With Template:Harvtxt referring to Template:Harvtxt
  2. Template:Harvtxt
  3. 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.

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