Diffusion equation

This MedLibrary.org supplementary page on Diffusion equation is provided directly from the open source Wikipedia as a service to our readers. Please see the note below on authorship of this content, as well as the Wikipedia usage guidelines. To search for other content from our encyclopedia supplement, please use the form below:

Related Sponsors

BM Pharmacy Generic pharmaceuticals at unbeatable prices. Insomnia, men's health, hair health, pain control. bmpharmacy.com

Online Pharmacy Carisoprodol, tadalafil, sildenafil, vardenafil and more... xlpharmacy.com

MedBasket.com Discreet. Inexpensive. Fast shipping. Great selection. What more can we say? medbasket.com

Frugalmed 2000 reasons to shop with us first. frugalmed.com

Ads by Tiva

The diffusion equation is a partial differential equation which describes density fluctuations in a material undergoing diffusion. It is also used to describe processes exhibiting diffusive-like behaviour, for instance the 'diffusion' of alleles in a population in population genetics.

The equation is usually written as:

$\frac{\partial\phi}{\partial t} = \nabla \cdot \bigg( D(\phi,\vec{r}) \, \nabla\phi(\vec{r},t) \bigg),$

where $\, \phi(\vec{r},t)$ is the density of the diffusing material at location $\vec{r}$ and time $t$ and $\, D(\phi,\vec{r})$ is the collective diffusion coefficient for density $φ$ at location $\vec{r}$ ; the nabla symbol $\, \nabla$ represents the vector differential operator del acting on the space coordinates. If the diffusion coefficient depends on the density then the equation is nonlinear, otherwise it is linear. If $\, D$ is constant, then the equation reduces to the following linear equation:

$\frac{\partial\phi}{\partial t} = D\nabla^2\phi(\vec{r},t),$

also called the heat equation. More generally, when D is a symmetric positive definite matrix, the equation describes anisotropic diffusion.

1 Derivation
2 Historical origin
3 See also
4 External links

Derivation

The diffusion equation can be derived in a straightforward way from the continuity equation, which states that a change in density in any part of the system is due to inflow and outflow of material into and out of that part of the system. Effectively, no material is created or destroyed:

$\frac{\partial\phi}{\partial t}+\nabla\cdot\vec{j}=0$ ,

where $\vec{j}$ is the flux of the diffusing material. The diffusion equation can be obtained easily from this when combined with the phenomenological Fick's first law, which assumes that the flux of the diffusing material in any part of the system is proportional to the local density gradient:

$\vec{j}=-D\,(\phi)\,\nabla\,\phi\,(\,\vec{r},t\,)$ .

Historical origin

The particle diffusion equation was originally derived by Adolf Fick in 1855.

External links

Wikipedia content modification information:

This page was last modified on 31 July 2008, at 21:15.

Wikipedia Authorship and Review

Wikipedia content provided here is not reviewed directly by MedLibrary.org. Wikipedia content is authored by an open community of volunteers and is not produced by or in any way affiliated with MedLibrary.org.

Wikipedia Usage Guidelines

This article is licensed under the GNU Free Documentation License. It uses material from the Wikipedia article on "Diffusion equation".

The URL for this specific entry is:

http://medlibrary.org/medwiki/Diffusion_equation

All Wikipedia text is available under the terms of the GNU Free Documentation License. (See Copyrights for details). Wikipedia® is a registered trademark of the Wikimedia Foundation, Inc.

Welcome to the MedLibrary.org Wikipedia Supplement on Diffusion equation -- Please Click to Return to Front Page