Faxén's law

In fluid dynamics, Faxén's laws relate a sphere's velocity and angular velocity to the forces, torque, stresslet and flow it experiences under low Reynolds number conditions.

First law

Faxen's first law was introduced in 1922 by Swedish physicist Hilding Faxén, who at the time was active at Uppsala University, and is given by
where

is the force exerted by the fluid on the sphere
is the Newtonian viscosity of the solvent in which the sphere is placed
is the sphere's radius
is the velocity of the sphere
is the disturbance velocity caused by the other spheres in suspension, evaluated at the sphere centre
is the background impressed flow, evaluated at the sphere centre.

It can also be written in the form
where is the hydrodynamic mobility.
In the case that the pressure gradient is small compared with the length scale of the sphere's diameter, and when there is no external force, the last two terms of this form may be neglected. In this case the external fluid flow simply advects the sphere.

Second law

Faxen's second law is given by
where

is the torque exerted by the fluid on the sphere
is the angular velocity of the sphere
is the angular velocity of the background flow, evaluated at the sphere centre.

'Third law'

Batchelor and Green derived an equation for the stresslet, given by
where

is the stresslet exerted by the fluid on the sphere,
is the velocity gradient tensor; represents transpose; and so is the rate of strain, or deformation, tensor.
is the rate of strain of the background flow, evaluated at the sphere centre.

Note there is no rate of strain on the sphere since the spheres are assumed to be rigid.
Faxén's law is a correction to Stokes' law for the friction on spherical objects in a viscous fluid, valid where the object moves close to a wall of the container.