Dynamic Electrophoretic Mobility of a Cylindrical Colloidal Particle

In the present paper, we use directly the method of Oh-A general expression for the dynamic electrophoretic mobility shima et al. (9) without decomposing the electrophoresis of a spherical colloidal particle in an oscillating electric field is problem as in Ref. (8) to solve the electrokinetic equat

Approximate expressions are derived for the electrophoretic mobility of dilute cylindrical colloidal particles in a salt-free medium containing only counterions. The cylinder is assumed to be infinitely long. It is shown that as in the case of a spherical particle, there is a certain critical value

A theory of the dynamic electrophoretic mobility of a spherical soft particle (that is, a polyelectrolyte-coated spherical particle) in an oscillating electric field is presented. In the absence of the polyelectrolyte layer a spherical soft particle becomes a spherical hard particle, while in the ab

for the dynamic mobility of spherical particles which is ap-A theory for the dynamic electrophoretic mobility m of spherical plicable for all ka (k is the Debye-Hu ¨ckel parameter and colloidal particles in concentrated suspensions in an oscillating a is the particle radius) at zero particle permitt

A general expression as well as approximate expressions are derived for the electrophoretic mobility of dilute spherical colloidal particles in a salt-free medium containing only counter ions. It is shown that there is a certain critical value of the particle surface charge. When the particle surfac

for a swarm of spherical particles applicable for low z poten-A general mobility expression is derived for a swarm of identical tials and all ka values, showing that as ka decreases and/ spherical colloidal particles in concentrated suspensions on the or the particle volume fraction increases (the p