The Knudsen number is a dimensionless number defined as where The representative length scale considered,, may correspond to various physical traits of a system, but most commonly relates to a gap length over which thermal transport or mass transport occurs through a gas phase. This is the case in porous and granular materials, where the thermal transport through a gas phase depends highly on its pressure and the consequent mean free path of molecules in this phase. For a Boltzmann gas, the mean free path may be readily calculated, so that where For particle dynamics in the atmosphere, and assuming standard temperature and pressure, i.e. 0 °C and 1 atm, we have ≈ .
Relationship to Mach and Reynolds numbers in gases
The Knudsen number can be related to the Mach number and the Reynolds number. Using the dynamic viscosity with the average molecule speed the is determined as follows: Dividing through by L, the Knudsen number is obtained: where The dimensionless Mach number can be written as where the speed of sound is given by where The dimensionless Reynolds number can be written as Dividing the Mach number by the Reynolds number: and by multiplying by yields the Knudsen number: The Mach, Reynolds and Knudsen numbers are therefore related by
Application
The Knudsen number can be used to determine the rarefaction of a flow :
This regime classification is empirical and problem dependent but has proven useful to adequately model flows. Problems with high Knudsen numbers include the calculation of the motion of a dust particle through the lower atmosphere and the motion of a satellite through the exosphere. One of the most widely used applications for the Knudsen number is in microfluidics and MEMS device design where flows range from continuum to free-molecular. Movements of fluids in situations with a high Knudsen number are said to exhibit Knudsen flow, also called free molecular flow. Airflow around an aircraft such as an airliner has a low Knudsen number, making it firmly in the realm of continuum mechanics. Using the Knudsen number an adjustment for Stokes' law can be used in the Cunningham correction factor, this is a drag force correction due to slip in small particles. The flow of water through a nozzle will usually be a situation with a low Knudsen number. Mixtures of gases with different molecular masses can be partly separated by sending the mixture through small holes of a thin wall because the numbers of molecules that pass through a hole is proportional to the pressure of the gas and inversely proportional to its molecular mass. The technique has been used to separate isotopic mixtures, such as uranium, using porous membranes, It has also been successfully demonstrated for use in hydrogen production from water. The Knudsen number also plays an important role in thermal conduction in gases. For insulation materials, for example, where gases are contained under low pressure, the Knudsen number should be as high as possible to ensure low thermal conductivity.