Team:ETH Zurich/modeling/int

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m (Parameter fitting)
m (Parameter fitting)
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We consider the system at steady-state. After derivation, the following explicit equation can be retrieved:
We consider the system at steady-state. After derivation, the following explicit equation can be retrieved:
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<html><left></html>$$[SR]_{qss} = {(\frac{B_{L} * [aTc]^{n}}{ \lambda_1 K_L^{n} + (B_{L} +\lambda_1) [aTc]^{n}})}^2 $$<html></left></html>
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$$[SR]_{qss} = {(\frac{B_{L} * [aTc]^{n}}{ \lambda_1 K_L^{n} + (B_{L} +\lambda_1) [aTc]^{n}})}^2 $$
where
where
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$$\lambda_1 =  1.82e-07  (1.649e-07, 1.992e-07)$$
$$\lambda_1 =  1.82e-07  (1.649e-07, 1.992e-07)$$
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It is a narrow confidence interval. By assuming that $d_{Bxb1}$ corresponds to the order of magnitude of 10<sup>-2</sup> min<sup>-1</sup>, as most of the protein in ''E. coli'', and that $k_{F2}$ is at most of the order of magnitude of $0.1 nM min^{-1}$ (Source : bionumbers.org), we obtain that $K_H$'s order of magnitude is $10^{-4} nM$. The interpretation of this dissociation constant is that the DNA binding reaction is really specific, as it can be expected about integrases.
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It is a narrow confidence interval.  
[[File:ETH Zurich Integrase SR1.png|center|800px|thumb|Parameter fitting of the dissociate rate constant of K<sub>SABxb1</sub>]]
[[File:ETH Zurich Integrase SR1.png|center|800px|thumb|Parameter fitting of the dissociate rate constant of K<sub>SABxb1</sub>]]
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;We assume that:
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:d<sub>Bxb1</sub> corresponds to the order of magnitude of 10<sup>-2</sup> min<sup>-1</sup>, as most of the protein in ''E. coli''.
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:k<sub>mRNA<sub>Bxb1</sub></sub> is considered t of the order of magnitude of $0.1 nM min^{-1}$ (Source : bionumbers.org), we obtain that $K_H$'s order of magnitude is $10^{-4} nM$. The interpretation of this dissociation constant is that the DNA binding reaction is really specific, as it can be expected about integrases.
=== Range of validity of the assumptions ===
=== Range of validity of the assumptions ===

Revision as of 15:46, 12 October 2014

iGEM ETH Zurich 2014