Rose–Vinet equation of state

The Rose–Vinet equation of state is a set of equations used to describe the equation of state of solid objects. It is a modification of the Birch–Murnaghan equation of state.^[1][2] The initial paper discusses how the equation only depends on four inputs: the isothermal bulk modulus ${\displaystyle B_0}$, the derivative of bulk modulus with respect to pressure ${\displaystyle {B_0}^{\prime }}$, the volume ${\displaystyle V_0}$, and the thermal expansion; all evaluated at zero pressure (${\displaystyle P=0}$) and at a single (reference) temperature. The same equation holds for all classes of solids and a wide range of temperatures.

Let the cube root of the specific volume be

${\displaystyle \eta ={\left(\frac{V}{V_0}\right)}^{\frac{1}{3}}}$

then the equation of state is:

${\displaystyle P=3B_0\left(\frac{1-\eta }{{\eta }^2}\right)e^{\frac{3}{2}({B_0}^{\prime }-1)(1-\eta )}}$

A similar equation was published by Stacey et al. in 1981.^[3]

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