Force density

In fluid mechanics, the force density is the negative gradient of pressure. It has the physical dimensions of force per unit volume. Force density is a vector field representing the flux density of the hydrostatic force within the bulk of a fluid. Force density is represented by the symbol f [1] , and given by the following equation, where P is the pressure:

\mathbf{f} = - \nabla P .

The net force on a differential volume element dV of the fluid is:

d\mathbf{F} = \mathbf{f}dV

Force density acts in different ways which is caused by the boundary conditions. There is stick-slip boundary conditions and stick boundary conditions which effect force density.

In a sphere placed in an arbitrary non-stationary flow field of viscous incompressible fluid for stick boundary conditions where the force density’s calculations leads to show the generalization of Faxen's theorem to force multipole moments of arbitrary order.

In a sphere moving in an incompressible fluid in a non-stationary flow with mixed stick-slip boundary condition where the force of density shows an expression of the Faxén type for the total force, but the total torque and the symmetric force-dipole moment.[2]

The force density at a point in a fluid, divided by the density, is the acceleration of the fluid at that point.

The force density F is defined as the force per unit volume, so that:

\mathbf(F)=\int f(r)d^3 r .

The force density in an electromagnetic field is given in cgs by:

\mathbf(f)=pE+ \frac{J}{c} \times B, .

Where p is the charge density, E is the electric field, J is the current density, c is the speed of light, and B is the magnetic field.[3]

References

  1. Force Density. Eric Weisstein's World of Physics. Accessed March 8th, 2012.
  2. Physica A: Statistical Mechanics and its Applications Volume 84, Issue 3, Pages 435-641 (1976)Accessed January 19th, 2015
  3. Force Density. Eric Weinstein's World of Physics. Accessed January 17th, 2015.


This article is issued from Wikipedia - version of the Monday, March 23, 2015. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.