Difference between revisions of "Help:Cell-free chassis/Modelling"

Line 10: Line 10:
 
==Model description==
 
==Model description==
  
Although a study of microbial growth rate is undertaken here, this could be altered to feature the system survival/lifetime, as we are dealing with S30 cell extract. The lifetime of the system would be reflected by the rate of change of system energy (<math> {d[nutrient]}/dt </math>), which here is decreasing, as there is no source of replenishment of nutrient.
+
Although a study of microbial growth rate is undertaken here, this could be altered to feature the system survival/lifetime, as we are dealing with S30 cell extract. The lifetime of the system would be reflected by the rate of change of system energy (''d[nutrient]/dt''), which here is decreasing, as there is no source of replenishment of nutrient.
  
 
A review of literature suggests that multiple models have been developed to describe this feature of the system. The most widely used models are the Monod, Grau, Teisser, Moser and Contois equations.
 
A review of literature suggests that multiple models have been developed to describe this feature of the system. The most widely used models are the Monod, Grau, Teisser, Moser and Contois equations.
Line 18: Line 18:
 
It was proposed, and noted from experimental data, that the behaviour of the system can be described as being limited by the energy of the system, and this could be achieved by using the Hill function.<br>
 
It was proposed, and noted from experimental data, that the behaviour of the system can be described as being limited by the energy of the system, and this could be achieved by using the Hill function.<br>
  
<math> \mu_{obs} = \mu_{max}\frac{[S]^n}{K_s^n + [S]^n} \cdots (1)</math> <br>
+
<math> \mu_{obs} = \mu_{max}\frac{[E]^n}{K_s^n + [E]^n} \cdots (1)</math> <br>
 +
'''Latex doesn't work here, strangely'''<br>
  
 
where
 
where
  
* S = limiting nutrient/substrate ("energy in system")
+
*E = limiting nutrient/substrate ("energy in system")
*<math>\mu</math> = instantaneous (observed) growth rate coefficient
+
*&mu; = instantaneous (observed) synthesis rate coefficient
*<math>\mu_{max}</math> = maximal growth rate coefficient
+
*&mu;<sub>max</sub> = maximal synthesis rate coefficient
*K_s = half-saturation coefficient
+
*K<sub>s</sub> = half-saturation coefficient
 
*n = positive co-operativity coefficient<br><br>
 
*n = positive co-operativity coefficient<br><br>
 +
 +
etc... etc... more to be written...
  
 
* mathematical description of the system + parameter info.
 
* mathematical description of the system + parameter info.
 
* see [http://openwetware.org/wiki/User:Jaroslaw_Karcz/Sandbox]
 
* see [http://openwetware.org/wiki/User:Jaroslaw_Karcz/Sandbox]
* link to SBML file  
+
* link to SBML file
  
 
==Simulations: typical beahviours==
 
==Simulations: typical beahviours==

Revision as of 08:50, 25 October 2007

Cell-Free System modelling

Model assumptions

  • Simple constitutive gene expression model
  • Protein degradation is negligeable (since protease inhibitors are present in the CFS, the rate of proteolytic degradation is minimal)
  • Resources are an important limiting factor to be considered in our CFS (such as molecules of ATP or protein-charged tRNAs)

Model description

Although a study of microbial growth rate is undertaken here, this could be altered to feature the system survival/lifetime, as we are dealing with S30 cell extract. The lifetime of the system would be reflected by the rate of change of system energy (d[nutrient]/dt), which here is decreasing, as there is no source of replenishment of nutrient.

A review of literature suggests that multiple models have been developed to describe this feature of the system. The most widely used models are the Monod, Grau, Teisser, Moser and Contois equations.
These equations describe the functional relationship between the microbial growth rate and essential substrate (nutrient) concentration.

It was proposed, and noted from experimental data, that the behaviour of the system can be described as being limited by the energy of the system, and this could be achieved by using the Hill function.

<math> \mu_{obs} = \mu_{max}\frac{[E]^n}{K_s^n + [E]^n} \cdots (1)</math>
Latex doesn't work here, strangely

where

  • E = limiting nutrient/substrate ("energy in system")
  • μ = instantaneous (observed) synthesis rate coefficient
  • μmax = maximal synthesis rate coefficient
  • Ks = half-saturation coefficient
  • n = positive co-operativity coefficient

etc... etc... more to be written...

  • mathematical description of the system + parameter info.
  • see [http://openwetware.org/wiki/User:Jaroslaw_Karcz/Sandbox]
  • link to SBML file

Simulations: typical beahviours

  • weak promoter with no degradation (linear production of the output protein) ---> like the pTet data we have
  • strong promoter with no degradation (resources are limiting the rate of synthesis as well as the amount of protein to be produced) ---> like the pT7 data we have