Team:Cambridge/Modelling
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== Introduction == | == Introduction == | ||
- | + | Our initial work was based around creation of a system that allows switching on of output at different calibrated input signal levels. Creating a model allows the feasibility of the proposed systems to be tested. A basic model of the original amplifier system was put forward, building on both our data and the Cambridge 2007 data. | |
===Modelling the phage activator system=== | ===Modelling the phage activator system=== | ||
Line 44: | Line 44: | ||
Assuming that translation rates remain constant, the rate of GFP and RFP production would be expected to be multiples of the above promoter activities/ input functions (which represent rate of transcription) | Assuming that translation rates remain constant, the rate of GFP and RFP production would be expected to be multiples of the above promoter activities/ input functions (which represent rate of transcription) | ||
+ | |||
+ | The aim of this area of work is to fit the activator plate reader to curves in an attempt to better charactertise them in terms of hill function parameters after Canton [[#References | [3]]]. | ||
+ | |||
+ | ====Entire System==== | ||
+ | |||
+ | The entire system, although a collected of nested hill functions, has an overall sigmoidal response to input concentration. This means that the full system can be modelled as a hill function, with appropriate parameters obtained by experimental analysis. | ||
===Making a Latch=== | ===Making a Latch=== | ||
Line 57: | Line 63: | ||
The first step is to take a look at the preliminary data to try to find appropriate parameters. An overall aim for the modelling of this system is to refine the model to each component and attempt to predict how different combinations of components will behave. The data collection separates the promoter and activator by use of both RFP and GFP reporters. | The first step is to take a look at the preliminary data to try to find appropriate parameters. An overall aim for the modelling of this system is to refine the model to each component and attempt to predict how different combinations of components will behave. The data collection separates the promoter and activator by use of both RFP and GFP reporters. | ||
+ | |||
+ | The basic model for the relationship between input concentration and GFP output rate of production is a Hill Function. The aim is to characterise each activator-promoter system and fit it to this basic model: | ||
+ | |||
+ | [[Image:Cambridge_Eq3.gif | center]] | ||
+ | |||
+ | The three parameters we require are the maximum output rate, the dissociation or binding constant and the hill coefficient. | ||
+ | |||
+ | Having studied the behaviour of the actual phage activator systems we discovered that each construct 'switched on' at different input levels; they have different effective binding constants. This gives us the behaviour required for a threshold system without much further development. | ||
+ | |||
+ | ===Investigating the Model=== | ||
+ | |||
+ | Before data was available we changed parameters to investigate the effects and to check that our programs were working as expected. Week 6, in particular Tuesday, summarises this work. | ||
==Extended Systems== | ==Extended Systems== | ||
+ | |||
+ | Despite the ability of the activator systems to switch on at different levels, before this was apparent an exercise in modelling different methods of achieving such a system was carried out. There were three proposed mechanisms for such a system. All are based on the presence of both a repressor and an activator of some form. | ||
+ | * 1. Repressor and Activator bind at different sites, but transcription only occurs if the activator is bound alone. | ||
+ | *2. The repressor and activator bind at different sites but the binding of one prevents binding of the other (by blocking the site for example). | ||
+ | |||
+ | These assume that the repressor and activator are both transcription factors. In effect, these are bistable switches. | ||
+ | |||
+ | *3. The activator (input of some form) prevents the production of a repressor that is otherwise continually expressed in the cell. | ||
+ | |||
+ | Looking at the effects of changing parameters was carried out during weeks 6 and 7. | ||
==Modelling Basics== | ==Modelling Basics== | ||
Line 72: | Line 100: | ||
First, working out the probability of the DNA site being occupied or free in the presence of a concentration of transcription factor. The equation describing the reversible DNA-Factor complex [DnX] formation is given below. Note that more than one molecule of repressor, the number here is given by n. | First, working out the probability of the DNA site being occupied or free in the presence of a concentration of transcription factor. The equation describing the reversible DNA-Factor complex [DnX] formation is given below. Note that more than one molecule of repressor, the number here is given by n. | ||
- | [[Image:Cambridge_modbasics1. | + | [[Image:Cambridge_modbasics1.gif | center | 140px]] |
k_1 is the forward rate constant, k_2 is for the reverse reaction. | k_1 is the forward rate constant, k_2 is for the reverse reaction. | ||
Line 78: | Line 106: | ||
The probability of the DNA site being free of the repressor is given by [D]/[D_t] where D_t is the total amount of free DNA binding site available. Assuming a pseudo steady state where [Dnx] is stable, so that d[DnX]/dt = 0, and including the constraint that | The probability of the DNA site being free of the repressor is given by [D]/[D_t] where D_t is the total amount of free DNA binding site available. Assuming a pseudo steady state where [Dnx] is stable, so that d[DnX]/dt = 0, and including the constraint that | ||
- | [[Image:Cambridge_modbasics2. | + | [[Image:Cambridge_modbasics2.gif |center| 140px]] |
allows the probability of finding a DNA site free of the repressor to be found by simple substitution and rearrangement of the rate equation below. | allows the probability of finding a DNA site free of the repressor to be found by simple substitution and rearrangement of the rate equation below. | ||
- | [[Image:Cambridge_modbasics3. | + | [[Image:Cambridge_modbasics3.gif |center| 260px]] |
This gives the repressor dependent input function of the gene: | This gives the repressor dependent input function of the gene: | ||
Line 103: | Line 131: | ||
2. AN INTRODUCTION TO SYSTEMS BIOLOGY Design Principles Of Biological Circuits. Uri Alon | 2. AN INTRODUCTION TO SYSTEMS BIOLOGY Design Principles Of Biological Circuits. Uri Alon | ||
+ | |||
+ | 3. [http://partsregistry.org/Part:BBa_F2620 BBa_F2620 Parts Registry entry with characterisation.] | ||
+ | |||
<!--Do not remove the first and last lines in this page!-->{{Template:CambridgeBottom}} | <!--Do not remove the first and last lines in this page!-->{{Template:CambridgeBottom}} |
Latest revision as of 03:20, 22 October 2009
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Modelling
Introduction
Our initial work was based around creation of a system that allows switching on of output at different calibrated input signal levels. Creating a model allows the feasibility of the proposed systems to be tested. A basic model of the original amplifier system was put forward, building on both our data and the Cambridge 2007 data.
Modelling the phage activator system
This is the basic 'amplifier' system that consists of an input sensitive promoter system,a protein activator and sensitive promoter. It can therefore be divided into two boxes, the approach taken in putting forward an initial model.
The pBAD promoter
An arabinose input acts as an inducer, permitting transcription, by binding the AraC transcription factor. This is a dual transcription factor; when unbound to arabinose a dimer restricts access of polymersase to reduce basal levels of transcription, upon binding arabinose the conformation changes and the dimer permits binding of polymerase. [1]
To model this situation, araC is first assumed to take the role of a repressor that reversibly binds and unbinds a site on the DNA. If it binds arabinose, it is sequestered and cannot bind the DNA. Here, an input function is created, after Alon [2]. This gives the rate of transcription from the promoter dependent on the concentration of arabinose. Since mRNA is then translated at a roughly constant rate, it is related with a multiplicative constant to the rate of protein production, in this case activator and RFP.
This gives the rate of transcription as a function of X* which represents the concentration of active repressor, unbound to arabinose. B is the maximum rate of transcription, here this rate is when induced by arabinose at highest concentration. K_d is the dissociation constant (see modelling derivations). Parameters must be found by a parameter scan for sensible values or by comparing to already gathered data.
The concentration of 'active' repressor is given as a function of arabinose concentration by:
where X^T is the total amount of araC available, bound or unbound. A is arabinose concentration. n is the number of arabinose molecules binding to each molecule of the repressor, and K is a binding constant. n was taken to be two by assuming that each araC dimer needs two molecules to be bound before it can permit transcription.
Combining these two gives the overall input function, which has leaky transcription included at A = 0, seen in the actual results.
The Activator and its Promoter
This is based on a similar idea. Activator is made by transcription from pBAD, the mRNA is then translated (the potential time delays will be taken into account). The activity of the phage promoter is dependent on activator concentration according to:
Assuming that translation rates remain constant, the rate of GFP and RFP production would be expected to be multiples of the above promoter activities/ input functions (which represent rate of transcription)
The aim of this area of work is to fit the activator plate reader to curves in an attempt to better charactertise them in terms of hill function parameters after Canton [3].
Entire System
The entire system, although a collected of nested hill functions, has an overall sigmoidal response to input concentration. This means that the full system can be modelled as a hill function, with appropriate parameters obtained by experimental analysis.
Making a Latch
A switch that remains on once stimulated would be useful if it was only necessary, say, to see if a hazardous contaminant had ever been present in a sample (it could still be there in low levels etc.). A method proposed is positive feedback; an activator placed downstream of its own promoter (as well as the reporter/ pigment) will, in theory, keep pigment production going. The rate of activator production from its own promoter is given in equation 3 above, which is dependent on activator concentration itself.
Modelling the proposed switching levels system
This idea was summarised in the diagram and discussion included in week 4 dry work:
Most of these model systems will rely on the very basic equations outlined above, with extensions to add levels of complexity, such as the transport of arabinose into a cell.
Basic Phage Activators
The first step is to take a look at the preliminary data to try to find appropriate parameters. An overall aim for the modelling of this system is to refine the model to each component and attempt to predict how different combinations of components will behave. The data collection separates the promoter and activator by use of both RFP and GFP reporters.
The basic model for the relationship between input concentration and GFP output rate of production is a Hill Function. The aim is to characterise each activator-promoter system and fit it to this basic model:
The three parameters we require are the maximum output rate, the dissociation or binding constant and the hill coefficient.
Having studied the behaviour of the actual phage activator systems we discovered that each construct 'switched on' at different input levels; they have different effective binding constants. This gives us the behaviour required for a threshold system without much further development.
Investigating the Model
Before data was available we changed parameters to investigate the effects and to check that our programs were working as expected. Week 6, in particular Tuesday, summarises this work.
Extended Systems
Despite the ability of the activator systems to switch on at different levels, before this was apparent an exercise in modelling different methods of achieving such a system was carried out. There were three proposed mechanisms for such a system. All are based on the presence of both a repressor and an activator of some form.
- 1. Repressor and Activator bind at different sites, but transcription only occurs if the activator is bound alone.
- 2. The repressor and activator bind at different sites but the binding of one prevents binding of the other (by blocking the site for example).
These assume that the repressor and activator are both transcription factors. In effect, these are bistable switches.
- 3. The activator (input of some form) prevents the production of a repressor that is otherwise continually expressed in the cell.
Looking at the effects of changing parameters was carried out during weeks 6 and 7.
Modelling Basics
In order to model the kinetics of gene transcription and translation, the approach taken is similar to that in enzyme kinetics. The transcription factors bind reversibly to the relevant site on the DNA and depending upon the particular case, transcription is promoted or repressed.
The steps of working out the input function (which describes the rate of transcription as a function of the inducer concentration) of a gene are finding the concentration of active repressor (that unbound to the inducer, in this case, arabinose) and then finding the effect of that repressor on transcription.
We have taken araC to act as a repressor in these models, although as mentioned, it has dual activity, remaining on the DNA after arabinose binding to promote transcription.
Binding of repressor to site on DNA
First, working out the probability of the DNA site being occupied or free in the presence of a concentration of transcription factor. The equation describing the reversible DNA-Factor complex [DnX] formation is given below. Note that more than one molecule of repressor, the number here is given by n.
k_1 is the forward rate constant, k_2 is for the reverse reaction.
The probability of the DNA site being free of the repressor is given by [D]/[D_t] where D_t is the total amount of free DNA binding site available. Assuming a pseudo steady state where [Dnx] is stable, so that d[DnX]/dt = 0, and including the constraint that
allows the probability of finding a DNA site free of the repressor to be found by simple substitution and rearrangement of the rate equation below.
This gives the repressor dependent input function of the gene:
The constant K_d is effectively the nth root of k_2/k_1, as can be found by following through the derivations.
Sequestering of the repressor AraC by binding to arabinose
Again, a similar approach is taken as in enzyme kinetics. Effectively, all of the above derivation is followed but this time the amount of active repressor, X*, is found. This assumes that the amount of AraC repressor bound to arabinose is in pseudo steady state. The total effect of the two repressing systems becomes that of an activator and in effect the detail could be hidden to have a simple activated transcription model. This approach would be the best to pursue in characterising the activator systems.
The Phage Activator Systems
Including the pBAD promoter as described above, an additional level of complication needs to be taken account of with the phage activator systems. Here the activator promotes transcription, so the input function for the gene under the activator controlled promoter is found from the probability that the DNA binding site is occupied. This is [DnX]/[D_t] where [DnX] here represents the amount of activator-DNA binding site complex (note this is not the amount of free DNA sites this time). Otherwise, the derivation is as above, with the assumption again that [DnX] is in pseudo steady state.
References
1. [http://www.ncbi.nlm.nih.gov/pubmed/9600836 Apo-AraC actively seeks to loop. Schleif J.Mol. Biol (1988) 278, 529-538]
2. AN INTRODUCTION TO SYSTEMS BIOLOGY Design Principles Of Biological Circuits. Uri Alon
3. [http://partsregistry.org/Part:BBa_F2620 BBa_F2620 Parts Registry entry with characterisation.]