Team:Grenoble/Modeling/Amplification/ODE
From 2012.igem.org
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</br> | </br> | ||
<center><img src="https://static.igem.org/mediawiki/2012/f/f3/Graphe3_ampli_grenoble.png" alt="" /></center> | <center><img src="https://static.igem.org/mediawiki/2012/f/f3/Graphe3_ampli_grenoble.png" alt="" /></center> | ||
+ | </br> | ||
+ | </br> | ||
+ | <span style="text-decoration:bold;">Conclusion:</span> | ||
+ | </br> | ||
+ | </br> | ||
+ | The sensitivity of our system is 10<SUP>-6</SUP> mol/L of initial cyclic AMP. When we introduced this quantity in the system, the bacteria will turn on. | ||
+ | Then, the next question is to know when we are under this value in how much time we will be able to observe that one bacteria turned on. | ||
+ | </section> | ||
+ | <section> | ||
+ | <h1><img src="https://static.igem.org/mediawiki/2012/1/1e/2_mod.png" alt="" /> Temporal evolution</h1> | ||
+ | </br> | ||
+ | </br> | ||
+ | To evaluate the time it will take to be able to detect a signal, we need to plot the evolution of the adenylate cyclase in the time for an initial concentration of cAMP<SUB>out</SUB>≥10<SUP>-6</SUP> mol/L. We first give the graph with cAMP<SUB>out</SUB>=10<SUP>-3</SUP> mol/L: | ||
+ | </br> | ||
+ | </br> | ||
+ | <center><img src="https://static.igem.org/mediawiki/2012/e/e6/Graphe4_ampli_grenoble.png" alt="" /></center> | ||
</br> | </br> | ||
</br> | </br> |
Revision as of 06:17, 21 September 2012
Preliminary
We will use the quasi steady state approximation (QSSA) then. The idea is that there are quick reactions, such as enzymatic ones, complexations, etc… And there are slow reactions such as protein production. We assume that the evolution speed of an element that is created only by quick reaction is null.Goal
In this part, we want to answer to three questions:- What is the sensitivity of our system?
- What is the time response?
- What steady states will our system always reach?