Team:ETH Zurich/Modeling/Analytical Approximations

From 2013.igem.org

(Difference between revisions)
(Created page with "{{:Team:ETH_Zurich/Templates}} {{:Team:ETH_Zurich/Templates/stylesheet}} <br clear="all"/> {{:Team:ETH_Zurich/templates/footer}}")
Line 2: Line 2:
{{:Team:ETH_Zurich/Templates/stylesheet}}
{{:Team:ETH_Zurich/Templates/stylesheet}}
 +
<h1><b>Steady State AHL Gradient Approximation</b></h1>
 +
In the reaction-diffusion model we have formalized the gradient establishment and we solved the resulting partial differential equation numerically. Now, the aim is to derive a suitable analytical approximation.
 +
 +
<h1> Kolmogorov-Petrovsky-Piskounov Equation </h1>
<br clear="all"/>
<br clear="all"/>
{{:Team:ETH_Zurich/templates/footer}}
{{:Team:ETH_Zurich/templates/footer}}

Revision as of 11:37, 24 October 2013

Header2.png
80px-Eth igem logo.png

Steady State AHL Gradient Approximation

In the reaction-diffusion model we have formalized the gradient establishment and we solved the resulting partial differential equation numerically. Now, the aim is to derive a suitable analytical approximation.

Kolmogorov-Petrovsky-Piskounov Equation