Team:ETH Zurich/modeling/qs

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(Difference between revisions)
(Retrieving degradation rates)
(Retrieving degradation rates)
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By adding an additional quasi steady state assumptions on R<sub>Lux</sub>, and neglecting degradation of R<sub>Lux</sub> compared to its unbinding rate, we can find :
By adding an additional quasi steady state assumptions on R<sub>Lux</sub>, and neglecting degradation of R<sub>Lux</sub> compared to its unbinding rate, we can find :
-
$$\frac{d[mRNABxb1]}{dt}=LeakyLux+\frac{k_mRNABxb1 \alpha_{LuxR}^2}{d_{LuxR}^2(Km_{Lux}^2+\alpha_{LuxR})} \frac{[AHL]^2}{K_{mAHL}}-d_{GFP}[GFP]$$
+
$$\frac{d[mRNABxb1]}{dt}=LeakyLux+\frac{k_{mRNABxb1} \alpha_{LuxR}^2}{d_{LuxR}^2(Km_{Lux}^2+\alpha_{LuxR})} \frac{[AHL]^2}{K_{mAHL}}-d_{GFP}[GFP]$$
$$\text{with} K_{mAHL}=\frac{K_{mLux}^2 k_{-RLux}}{k_{RLux}(K_{mLux}^2+\alpha_{LuxR}/d_{LuxR})}$$
$$\text{with} K_{mAHL}=\frac{K_{mLux}^2 k_{-RLux}}{k_{RLux}(K_{mLux}^2+\alpha_{LuxR}/d_{LuxR})}$$

Revision as of 02:18, 17 October 2014

iGEM ETH Zurich 2014