It was introduced by Lyklema in “Fundamentals of Interface and Colloid Science”. A recent IUPAC Technical Report used this term explicitly and detailed several means of measurement in physical systems. The Dukhin number is a ratio of the
surface conductivity \kappa^{\sigma} to the fluid bulk electrical conductivity Km multiplied by particle size
a: : {\rm Du} = \frac{\kappa^{\sigma}}{{\Kappa_m}a}. There is another expression of this number that is valid when the surface conductivity is associated only with ions motion above the
slipping plane in the
double layer. In this case, the value of the surface conductivity depends on ζ-potential, which leads to the following expression for the Dukhin number for a symmetric electrolyte of ions with the same
diffusion coefficient: : {\rm Du} = \frac{2(1+3m/z^2)}{{\kappa}a}\left(\mathrm{cosh}\frac{zF\zeta}{2RT}-1\right), where the parameter
m characterizes the contribution of
electro-osmosis into motion of ions within the double layer : m = \frac{2\varepsilon_0\varepsilon_m R^2T^2}{3\eta F^2 D}, where •
F is the
Faraday constant •
T is
absolute temperature •
R is the
gas constant •
C is the ion concentration in the bulk •
z is
ion valency • ζ is
electrokinetic potential • ε0 is
vacuum permittivity • εm is the
permittivity of the fluid • η is
dynamic viscosity •
D is the
diffusion coefficient ==References==