Team:Evry/Modelmeta2
From 2013.igem.org
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The <i>[mRNA]</i> and <i>[GFP]</i> equations are alike. The prodction rates are K<sub>r</sub> for the mRNA and K<sub>p</sub> for the GFP. Since <i>FBS</i> represents the number of inhibited Fur Binding Sites, we have to substract it from N<sub>pla1</sub>. <br/> | The <i>[mRNA]</i> and <i>[GFP]</i> equations are alike. The prodction rates are K<sub>r</sub> for the mRNA and K<sub>p</sub> for the GFP. Since <i>FBS</i> represents the number of inhibited Fur Binding Sites, we have to substract it from N<sub>pla1</sub>. <br/> | ||
Both variables also have a negative degadation term:<br/> | Both variables also have a negative degadation term:<br/> | ||
- | <img src="https://static.igem.org/mediawiki/2013/ | + | <img src="https://static.igem.org/mediawiki/2013/9/9e/Dmrnarfp.png"/> |
</p> | </p> | ||
Revision as of 17:50, 27 October 2013
Inverter Model
Introduction
Now that we have a sensing model with results regarding the iron sensing delay, we can continue towards our main goal, by modeling the inverter system. So, this second part of the Enterobactin production model focuses on the synthetic inverter system our team implemented in the bacteria.
Observations
As shown in the Figure 1, the enterobactin production regulation is based on two consecutives inhibitions, which, in the end, is an activator with a certain delay. The model will follow this principle.
Goals
Our goal in this part of the model is to create a generic LacI-LacO inverter model so that:
- We can determine the delay of our bacteria's inverter
- The model can can be reused by other projects
Materials and methods
From Iron to FBS:
The first equations remain the same (from the sensing model):
RFP expression:
RFP expression is repressed by FBS:
Ki2 is the inhibition power and Npla2 is the number of plasmimds containing the RFP.
Note that FBS and RFPexpressed are both ruled by a normal logistic function. If we were to track the number of expressed LacI or RFP, we would be using two inverted logistic fuctions to model a double inverter. The thing is, since FBS represents the number of repressed genes and RFPexpressed the number of expressed genes, the double inverter is still there, but the calculations are easier.
RFP Production:
The [mRNA] and [GFP] equations are alike. The prodction rates are Kr for the mRNA and Kp for the GFP. Since FBS represents the number of inhibited Fur Binding Sites, we have to substract it from Npla1.
Both variables also have a negative degadation term:
Results
Conclusion
Models and scripts
References: