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Cauchy number - Wikipedia, the free encyclopedia

Cauchy number

From Wikipedia, the free encyclopedia

The Cauchy number is a dimensionless number in fluid dynamics used in the study of compressible flows. It is named after the French mathematician Augustin Louis Cauchy. When the compressibility is important the elastic forces must be considered along with inertial forces for dynamic similarity. Thus, the Cauchy Number is defined as the ratio between inertial and the compressibility force (elastic force) in a flow and can be expressed as

$Ca = \frac{\rho v^2}{K}$ ,

where

ρ

= density of fluid, (SI units : kg/m³)

v

= local fluid velocity, (SI units : m/s)

K

= bulk modulus of elasticity, (SI units : Pa)

[edit] Relation between Cauchy number and Mach number

For isentropic processes, the Cauchy number may be expressed in terms of Mach number. The isentropic bulk modulus $K s = γ p$ , where $γ$ is the specific heat capacity ratio and $p$ is the fluid pressure. If the fluid obeys the ideal gas law, we have

$K_s = \gamma p = \gamma \rho R T = \,\rho a^2$ ,

where

$a = \sqrt{\gamma RT}$ = speed of sound, (SI units : m/s)

R

= characteristic gas constant, (SI units : J/(kg K) )

T

= temperature, (SI units : K)

Substituting K (K_s) in the equation for $C a$ yields

$Ca = \frac{v^2}{a^2} = M^2$ .

Thus, the Cauchy number is square of the Mach number for isentropic flow of a perfect gas.

[edit] See also

v • d • e

Dimensionless numbers in fluid dynamics

Archimedes • Atwood • Bagnold • Biot • Bond • Brinkman • Capillary • Cauchy • Damköhler • Dean • Deborah • Eckert • Ekman • Eötvös • Euler • Froude • Galilei • Grashof • ‎Görtler • Hagen • Knudsen • Laplace • Lewis • Mach • Magnetic Reynolds • Marangoni • Morton • Nusselt • Ohnesorge • Péclet • Prandtl • Rayleigh • Reynolds • Richardson • Roshko • Rossby • Ruark • Schmidt • Sherwood • Stanton • Stokes • Strouhal • Suratman • Taylor • Weber • Weissenberg • Womersley

[edit] References

B. S. Massey and J. Ward-Smith, Mechanics of Fluids, 7^th ed., Nelson Thornes, UK (1998).

Categories: Fluid dynamics | Dimensionless numbers

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