Cole equation of state: Difference between revisions

The Cole equation of state ^[1][2][3] is the adiabatic version of the stiffened equation of state. (See Derivation, below.) It has the form

${\displaystyle p=B\left[\left({\frac {\rho }{\rho _{0}}}\right)^{\gamma }-1\right]}$

In it, ${\displaystyle \rho _{0}}$ is a reference density around which the density varies, ${\displaystyle \gamma }$ is the adiabatic index, and ${\displaystyle B}$ is a pressure parameter.

Usually, the equation is used to model a nearly incompressible system. In this case, the exponent is often set to a value of 7, and ${\displaystyle B}$ is large, in the following sense. The fluctuations of the density are related to the speed of sound as

${\displaystyle {\frac {\delta \rho }{\rho }}={\frac {v^{2}}{c^{2}}},}$

where ${\displaystyle v}$ is the largest velocity, and ${\displaystyle c}$ is the speed of sound (the ratio ${\displaystyle v/c}$ is Mach's number). The speed of sound can be seen to be

${\displaystyle c^{2}={\frac {\gamma B}{\rho _{0}}}.}$

Therefore, if ${\displaystyle B=100\rho _{0}v^{2}/\gamma }$, the relative density fluctuations will be about 0.01.

If the fluctuations in the density are indeed small, the equation of state may be approximated by the simpler:

${\displaystyle p=B\gamma \left[{\frac {\rho -\rho _{0}}{\rho _{0}}}\right]}$

It is quite common that the name "Tait equation of state" is improperly used for this EOS. This perhaps stems for the classic text by Cole calling this equation a "modified Tait equation" (p. 39).

Derivation

Let us write the stiffened EOS as

${\displaystyle p+p^{*}=(\gamma -1)e\rho =(\gamma -1)E/V,}$

where E is the internal energy. In an adiabatic process, the work is the only responsible of a change in internal energy. Hence the first law reads

${\displaystyle dW=-pdV=dE.}$

Taking differences on theEOS,

${\displaystyle dE={\frac {1}{\gamma -1}}[(p+p^{*})dV+Vdp],}$

so that the first law can be simplified to

${\displaystyle -(\gamma p+p^{*})dV=Vdp.}$

This equation can be solved in the standard way, with the result

${\displaystyle (p+p^{*}/\gamma )V^{\gamma }=C,}$

where C is a constant of integration. This derivation closely follows the standard derivation of the adiabatic law of an ideal gas, and it reduces to it if ${\displaystyle p^{*}=0}$.

If the values of the thermodynamic variables are known at some reference state, we may write

${\displaystyle (p+p^{*}/\gamma )V^{\gamma }=(p_{0}+p^{*}/\gamma )V_{0}^{\gamma },}$

which can be written as

${\displaystyle p=(p_{0}+p^{*}/\gamma )(V_{0}/V)^{\gamma }-p^{*}/\gamma .}$

Going back to densities, instead of volumes,

${\displaystyle p=(p_{0}+p^{*}/\gamma )(\rho /\rho _{0})^{\gamma }-p^{*}/\gamma .}$

Now, the speed of sound is given by

${\displaystyle c^{2}={\frac {dp}{d\rho }},}$

with the derivative taken along an adiabatic line. This is precisely our case, and we readily obtain

References