Nernst–Planck equation

The time dependent form of the Nernst–Planck equation is a conservation of mass equation used to describe the motion of a charged chemical species in a fluid medium. It describes the flux of ions under the influence of both an ionic concentration gradient ∇c and an electric field E = −∇φ −∂A/∂t. It extends Fick's law of diffusion for the case where the diffusing particles are also moved with respect to the fluid by electrostatic forces:^[1]^[2]

{\frac {\partial c}{\partial t}}=\nabla \cdot \left[D\nabla c-uc+{\frac {Dze}{k_{\mathrm {B} }T}}c(\nabla \phi +{\frac {\partial \mathbf {A} }{\partial t}})\right]

Where

t is time,
D is the diffusivity of the chemical species,
c is the concentration of the species, and u is the velocity of the fluid,
z is the valence of ionic species,
e is the elementary charge,
k_B is the Boltzmann constant,
T is the temperature,
u is relative velocity of the observer to the ionic system.

If the diffusing particles are themselves charged they are influenced by the electric field. Hence the Nernst–Planck equation is applied in describing the ion-exchange kinetics in soils.^[3]

In the context of Neuroscience, this equation is best known in its steady-state form, where there is a balance of diffusion and drift. Setting time derivatives to zero, and noting that the term J = −uc represents the flux J:

\nabla \cdot \left[D\nabla c+J+{\frac {Dze}{k_{B}T}}c(\nabla \phi )\right]=0

Integrating the divergence over an arbitrary surface, one obtains the steady state Nernst–Planck equation

J=-\left[D\nabla c+{\frac {Dze}{k_{B}T}}c(\nabla \phi )\right]

Finally, in units of mol/(m²·s) and the gas constant R, one obtains the more familiar form:^[4]^[5]

J=-D\left[\nabla c+{\frac {Fz}{RT}}c(\nabla \phi )\right]

where F is the Faraday constant equal to N_A e.

Notes

↑ Kirby, B. J. (2010). Micro- and Nanoscale Fluid Mechanics: Transport in Microfluidic Devices: Chapter 11: Species and Charge Transport.
↑ Probstein, R. (1994). Physicochemical Hydrodynamics.
↑ Sparks, D. L. (1988). Kinetics of Soil Chemical Processes. Academic Press, New York. pp. 101ff.
↑ Hille, B. (1992). Ionic Channels of Excitable Membranes (2nd ed.). Sunderland, MA: Sinauer. p. 267.
↑ Hille, B. (1992). Ionic Channels of Excitable Membranes (3rd ed.). Sunderland, MA: Sinauer. p. 318.

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Nernst–Planck equation

See also

Notes