Debye length

In plasma physics, the Debye length, named after the Dutch physical chemist Peter Debye, is the scale over which mobile charge carriers (e.g. electrons) screen out electric fields in plasmas and other conductors. In other words, the Debye length is the distance over which significant charge separation can occur. In space plasmas where the electron density is relatively low, the Debye length may reach macroscope values, such as in the Magnetosphere, Solar wind, Interstellar medium and Intergalactic medium (See table):

Plasma	Density n_e(m³)	Electron Temperature T(K)	Magnetic Field B(T)	Debye Length λ_D(m)
Gas discharge	10¹⁶	10⁴	--	10^-4
Tokamak	10²⁰	10⁸	10	10^-4
Ionosphere	10¹²	10³	10^-5	10^-3
Magnetosphere	10⁷	10⁷	10^-8	10²
Solar core	10³²	10⁷	--	10^-11
Solar wind	10⁶	10⁵	10^-9	10
Interstellar medium	10⁵	10⁴	10^-10	10
Intergalactic medium	1	10⁶	--	10⁵

Source: Chapter 19: The Particle Kinetics of Plasma
http://www.pma.caltech.edu/Courses/ph136/yr2002/

Hannes Alfven pointed out that: "In a low density plasma, localized space charge regions may build up large potential drops over distances of the order of some tens of the Debye lengths. Such regions have been called electric double layers. An electric double layer is the simplest space charge distribution that gives a potential drop in the layer and a vanishing electric field on each side of the layer. In the laboratory, double layers have been studied for half a century, but their importance in cosmic plasmas has not been generally recognized.".

Debye length in a plasma

In SI units, it is

$\lambda_D = \sqrt{\frac{\epsilon_0 k T_e T_i}{n_e q_e^2 (T_i + Z T_e)}}$

where

λ_D is the Debye length,

ε₀ is the permittivity of free space,

k is Boltzmann's constant,

T_e and T_i are the temperatures of the electrons and ions, respectively,

n_e is the density of electrons,

q_e is the charge on an electron,

Z is the ionization state of the ions,

The ion term is often dropped, giving

$\lambda_D = \sqrt{\frac{\epsilon_0 k T_e}{n_e q_e^2}}$

although this is only valid when the electrons are much colder than the ions.

Debye length in an Electrolyte

In an electrolyte, the Debye length is given by

$\lambda_D = \sqrt{\frac{\epsilon_0 \epsilon_r k T}{2 N_A e^2 I}}$ .

Reference

Equation for Debye length copied from Goldston & Rutherford's Introduction to Plasma Physics, Institute of Physics Publishing, Philadelphia: 1997, p. 15)

Debye length

Debye length in a plasma

Debye length in an Electrolyte

Reference

See also: Debye length, Boltzmann's constant, Electric field screening, Hannes Alfven, Ionization, Permittivity of free space, Peter Debye, Plasma physics