0.3 The kinematics of fluid motion (Page 3/9)

Page 3 / 9

x = x [ξ (y, t^{'}), t],

where the parameter $t^{'}$ along it lies in the interval $0 \leq t^{'} \leq t$ . If we regard the motion as having been proceeding for all time, then the origin of time is arbitrary and t' can take negative values $- \infty \leq t^{'} \leq t$ .

The flow field illustrated in 4.13 by Aris is assigned as an exercise.

Dilatation

We noticed earlier that if the coordinate system is changed from coordinates $ξ$ to coordinates $x$ , then the element of volume changes by the formula

d V = \frac{\partial (x_{1}, x_{2}, x_{3})}{\partial (ξ_{1}, ξ_{2}, ξ_{3})} d ξ_{1} d ξ_{2} d ξ_{3} = J d V_{0}

If we think of $ξ$ as the material coordinates, they are the Cartesian coordinates at $t = 0$ , so that $d ξ_{1}$ $d ξ_{2}$ $d ξ_{3}$ is the volume $d V_{o}$ of an elementary rectangular parallelepiped. Consider this elementary parallelepiped about a given point $ξ$ at the initial instant. By the motion this parallelepiped is moved and distorted but because the motion is continuous it cannot break up and so at some time $t$ is some neighborhood of the point $x = x (ξ, t)$ . By the above equation, its volume is $d V = J d V_{o}$ and hence

J = \frac{d V}{d V_{o}} = ratio of an elementary material volume to its initial volume.

It is called the dilation or expansion . The assumption that $x = x (ξ, t)$ can be inverted to give $ξ = ξ (x, t)$ , and vice versa, is equivalent to requiring that neither $J$ nor $J^{-} 1$ vanish. Thus,

0 \leq J \leq \infty

We can now ask how the dilation changes as we follow the motion. To answer this we calculate the material derivative $D J / D t$ . However,

J = ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial x_{k}}{\partial ξ_{3}} = |\begin{matrix} \frac{\partial x_{1}}{\partial ξ_{1}} & \frac{\partial x_{1}}{\partial ξ_{2}} & \frac{\partial x_{1}}{\partial ξ_{3}} \\ \frac{\partial x_{2}}{\partial ξ_{1}} & \frac{\partial x_{2}}{\partial ξ_{2}} & \frac{\partial x_{2}}{\partial ξ_{3}} \\ \frac{\partial x_{3}}{\partial ξ_{1}} & \frac{\partial x_{3}}{\partial ξ_{2}} & \frac{\partial x_{3}}{\partial ξ_{3}} \end{matrix}|

Now

\frac{D}{D t} (\frac{\partial x_{i}}{\partial ξ_{j}}) = \frac{\partial}{\partial ξ_{j}} \frac{D x_{i}}{D t} = \frac{\partial v_{i}}{\partial ξ_{j}}

for $D / D t$ is differentiation with $ξ$ constant so that the order can be interchanged. Now if we regard $v_{i}$ as a function of $x_{1}$ , $x_{2}$ , $x_{3}$ ,

\frac{\partial v_{i}}{\partial ξ_{j}} = \frac{\partial v_{i}}{\partial ξ_{j}} \frac{\partial x_{m}}{\partial ξ_{j}}

The above relation can now be applied to differentiation of the Jacobian.

\begin{matrix} \frac{D J}{D t} & = & ε_{i j k} \frac{D}{D t} (\frac{\partial x_{i}}{\partial ξ_{1}}) \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial x_{k}}{\partial ξ_{3}} + ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{D}{D t} (\frac{\partial x_{j}}{\partial ξ_{2}}) \frac{\partial x_{k}}{\partial ξ_{3}} + ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{D}{D t} (\frac{\partial x_{k}}{\partial ξ_{3}}) \\ = & ε_{i j k} \frac{\partial v_{i}}{\partial x_{m}} \frac{\partial x_{m}}{\partial ξ_{1}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial x_{k}}{\partial ξ_{3}} + ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial v_{j}}{\partial x_{m}} \frac{\partial x_{m}}{\partial ξ_{2}} \frac{\partial x_{k}}{\partial ξ_{3}} + ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial v_{k}}{\partial x_{m}} \frac{\partial x_{m}}{\partial ξ_{3}} \\ = & ε_{i j k} \frac{\partial v_{1}}{\partial x_{1}} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial x_{k}}{\partial ξ_{3}} + ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial v_{i}}{\partial x_{2}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial x_{k}}{\partial ξ_{3}} + ε_{i j k} \frac{\partial x_{i}}{\partial ξ_{1}} \frac{\partial x_{j}}{\partial ξ_{2}} \frac{\partial v_{3}}{\partial x_{3}} \\ = & \frac{\partial v_{1}}{\partial x_{1}} J + \frac{\partial v_{2}}{\partial x_{2}} J + \frac{\partial v_{3}}{\partial x_{3}} J \\ = & (\nabla • v) J \end{matrix}

where we made use of the property of the determinant that the determinant of a matrix with repeated rows is zero. Thus,

\frac{D (ln J)}{D t} = \nabla • v

We thus have an important physical meaning for the divergence of the velocity field. It is the relative rate of dilation following a particle path. It is evident that for an incompressible fluid motion,

\nabla • v = 0 for incompressible fluid motion.

Use of a stream function to satisfy the mass-conservation equation (batchelor, 1967)

In the cases of flow of an incompressible fluid, and of steady flow of a compressible fluid, the mass-conservation equation reduces to the statement that a vector divergence is zero, the divergences being of $u$ and $ρ u$ respectively. If we impose the further restriction that the flow field either is two-dimensional or has axial symmetry, this vector divergence is the sum of only two derivatives, and the mass-conservation equation can then be regarded as defining a scalar function from which the components of $u$ or $ρ u$ are obtained by differentiation. The procedure will be described here for the case of an incompressible fluid.

Assume first that the motion is two-dimensional, so that $u = (u, v, 0)$ and $u$ and $v$ are independent of $z$ . The mass-conservation equation for an incompressible fluid then has the form

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Source: OpenStax, Transport phenomena. OpenStax CNX. May 24, 2010 Download for free at http://cnx.org/content/col11205/1.1

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