Glasgow/Modeling

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(Trial model for the promoter DmpR)
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== Modelling ==
== Modelling ==
=== Trial model for the promoter DmpR ===
=== Trial model for the promoter DmpR ===
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[[Image:Simplemodel.jpg]]
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[[Image:Simplemodel.jpg|400px]]
The current model that will be used for modeling purposes will use the three following equations to model the simple system as shown in Figure?? The reasons for using these modified equations are discussed below.  
The current model that will be used for modeling purposes will use the three following equations to model the simple system as shown in Figure?? The reasons for using these modified equations are discussed below.  

Revision as of 09:00, 25 July 2007

Glasgow Main Page

Modelling

Trial model for the promoter DmpR

Simplemodel.jpg

The current model that will be used for modeling purposes will use the three following equations to model the simple system as shown in Figure?? The reasons for using these modified equations are discussed below.

Screenshot1.jpg


Discussion The equation for the change of DntR|S within the system could be modelled by Equation 4

Screenshot2.jpg


At the beginning of the reaction DntR will have an unknown constant value as it cannot be measured. As the DntR will have a constant value the DntR and kb can be replaced by another constant kb’ as shown

Screenshot3.jpg

By substituting Equation 5 into Equation 4 gives

Screenshot4.jpg

However it is clear from Equation 6 that as the signal increases the DntR|S will increase without ever reaching a saturation limit. It was decided that the equation should be changed to utilize Michaelis-Menten. This means that a saturation limit will now be possible as shown.


Next it is important to note that the signal equation includes a term for the degradation of the signal as this is possible in the physical model. This equation also includes a term for the binding and a term for the unbinding as shown.



Also it should be noted that in this model XGAL is ignored, this is because the level of blue that is measured is proportional to the LacZ produced. By ignoring XGAL it will simplify the system equations.

Another point to note is that in this model of the system the transcription and the translation steps have been ‘lumped’ together by using Michaelis-Menten rather than modeling these biological steps separately.