taylor-proudman theorem

In fluid mechanics, the Taylor-Proudman theorem states that, in slowly moving steady flow in a rotating reference frame, the fluid velocity will be uniform along any line parallel to the axis of rotation. That this is so may be seen by considering the Navier Stokes equations for steady flow, with zero viscosity and a body force corresponding to the Coriolis force, which are:

\rho({\mathbf u}\cdot\nabla){\mathbf u}={\mathbf F}-\nabla p where

{\mathbf u}

is the fluid velocity,

\rho

is the fluid density, and

p

the pressure. If we now make the assumption that the advective term may be neglected (reasonable if the Rossby number is much less than unity) the equations become:

2\rho\Omega\times{\mathbf u}=\nabla p where

\Omega

the angular velocity vector. If the curl of this equation is taken, the result is the Taylor-Proudman theorem:

({\mathbf\Omega}\cdot\nabla){\mathbf u}={\mathbf 0}. To derive this, one needs the vector identities

\nabla\times(A\times B)=(A\cdot\nabla)B-(B\cdot\nabla)A+B(\nabla\cdot A)-A(\nabla\cdot B)

and

\nabla\times(\nabla p)=0

(note that

\nabla\cdot{\mathbf\Omega}=0

is also needed). The vector form of the Taylor-Proudman theorem is perhaps better understood by expanding it into its coordinate components:

\Omega_x\frac{\partial {\mathbf u}}{\partial x}=0

\Omega_y\frac{\partial {\mathbf u}}{\partial y}=0

\Omega_z\frac{\partial {\mathbf u}}{\partial z}=0 Now choose coordinates in which

\Omega_x=\Omega_y=0

and then the equations reduce to

\frac{\partial{\mathbf u}}{\partial z}=0, if

\Omega_z\neq 0

. Note that the implication is that all three components of the velocity vector are uniform along any line parallel to the z-axis.

<< Previous

Word Browser

Next >>

martin j. taylor
thompson rivers university
akademia zamojska
shrine of remembrance
hassan modarres
manga cafe
matt salmon
vito paternoster
kanami
god's bible school
phyllis (tv series)

mae young
phyllis
pee dee
lou grant (television series)
list of slavic languages
hornsby shire, new south wales
kapan
international working union of socialist parties
ankle brachial index
cyp3a4
vivisection and experimentation debate

traditional satanism
beachwear
chief minister of maharashtra
muslim bulgarians
franois joseph philippe de riquet
john hondorp
clifford bax
salisbury, canada
james albert bonsack
total group
neave

johansson
ratfucking
sicklinghall
henry d' essex
richard ellis (texas patriot)
ensemble (fluid mechanics)
kyra phillips
claus spahn
robbie buck
1905 in india
jalal ad din khan