Team:DTU Denmark/modelling

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   <b><i>In silico</i> modelling</b><br><br><br>
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   <b>Modelling of The Redoxilator</b><br><br>
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<p1>Modelling of GFP expression</p1>
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<font size="3"><p><b>Introduction</b></p></font>
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<p>Introduction</p>
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Here a model for the GFP expression under the control of “The Redoxilator” expression system is derived. The model is based on modular structured kinetics and links the level of the signal molecules NADH and NAD to the final expression of GFP through the events of <br><br>
-
Here a model for the GFP expression under the control of “The Redoxilator” expression system is derived. The model links the level of the signal molecules NADH and NAD to the final expression of GFP through the events of transcription factor activation, promoter activation, synthesis and degradation of mRNA and finally synthesis, dilution and degradation of GFP.  
+
  i) transcription factor activation,<br>
 +
  ii) promoter activation, <br>
 +
  iii) synthesis and degradation of mRNA and finally, <br>
 +
  iv) synthesis, dilution and degradation of GFP. <br><br>
 +
This model formed the basis of the genetic design of the The redoxilator. Importantly it provided understanding of the influence of each of the parameters when designing the system, e.g. that in order to achieve fast response time a fast degradable GFP was needed as reporter. However, since many parameters specific for this system are not yet available, the model is not expected to make exact predictions but to ease the understanding of the design "principles".
-
<font size="3"><b>The Redoxilator</b></font><br>
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<br><br>
 +
</html>
 +
[[Image:ReporterMechanism.png|400px|thumb|center|The redox coupled system]]
 +
<html>
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<p align="justify">Modelling of the redoxilator is in progress...</p>
+
<p align="justify"><i><b>Gene design and redox regulation</b><br>
-
<br>
+
NADH and NAD competes about binding to REX, however only when NADH is bound, the trancription factor is inhibited from binding to DNA. When the transcription factor is active (NADH not bound), the fused activator domain summons the RNA polymerase and the reporter gene is transcribed.</i></p><br>
 +
 
 +
 
 +
<font size="3"><p><b>NADH and NAD binding to the transcription factor</b></p></font>
 +
 
 +
Both NADH and NAD binds reversible to the same site of the transcription factor (TF): <br><br>
 +
 
 +
Dissociation of TF and NADH
 +
<br></html>[[image:picture_2.png|120px]]<html><br>
 +
 
 +
at equilibrium:
 +
<br></html>[[image:picture_3.png]]<html><br>
 +
 
 +
Dissociation of TF and NAD:
 +
<br></html>[[image:picture_46.png|120px]]<html><br><br>
 +
 
 +
Dissociation constant of TF and NAD: 
 +
<br></html>[[image:picture_5.png]]<html><br><br>
 +
 
 +
Balance of NAD and NADH. Constant total level of NADH + NAD in the cell are assumed:
 +
<br></html>[[image:picture_6.png]]<html><br><br>
 +
 
 +
Balance of TF. TF is constitutively expressed leading to constant total value </html>[[image:picture_7.png]]<html>.
 +
<br></html>[[image:picture_8.png]]<html><br><br>
 +
 
 +
NADH inhibits DNA binding activity of TF and thus transcription activity. Active TF is designated TF’.
 +
<br></html>[[image:picture_38.png]]<html><br><br>
 +
 
 +
Leading to the conserved moiety:
 +
<br></html>[[image:picture_40.png]]<html><br><br>
 +
 
 +
Using (3), the fraction of TF’ (<i>tf</i>) can be written as
 +
<br></html>[[image:picture_41.png]]<html><br><br>
 +
 
 +
With (1) and (2) in (4) the <i> tf </i> becomes
 +
<br></html>[[image:picture_42.png]]<html><br><br>
 +
 
 +
Leading to
 +
<br></html>[[image:picture_43.png]]<html><br><br>
 +
 
 +
Importantly figure 1 shows how the transcription factor is affected by the cofactor pool of NAD(H). The competing binding of NADH and NAD makes the system sense the redox poise rather than the concentration of each of the cofactors [2]. <br>
 +
 
 +
</html>[[Image:TFratio.png|350px|thumb|center]]<html>
 +
<i><b>Figure 1 - Transcription factor activity with increasing NAD/NADH ratio is hyperbolic.</b> <br> At NAD/NADH = 0.1, <i>tf</i> = 0.5, i.e. half of the transcription factors are active. (For this plot the following parameters were used: assuming K_H = 0,02 μM and K_N = 2 μM since REX NADH affinity > REX NAD affinity [2]. </html>[[image:picture_7.png]]<html> = 2mM, estimated TF concentration expressed from a constitutive TEF promoter.)<br><br></i>
 +
 
 +
<font size="3"><p><b>Promoter binding of active transcription factor</b></p></font>
 +
 
 +
When the active TF (TF') is bound to the promoter (P), P becomes active (P’) and transcription is initiated. The number of transcription factors needed for promoter activation is designated m:
 +
<br></html>[[image:picture_47.png]]<html><br><br>
 +
 
 +
Here it assumed that binding of TF and TFN is equal. <br>
 +
The dissociation equilibrium for this reaction:
 +
 
 +
<br></html>[[image:picture_15.png]]<html><br><br>
 +
 
 +
The number of promoters is constant, making the sum of fractions equal to
 +
 
 +
<br></html>[[image:picture_16.png]]<html><br><br>
 +
 
 +
Where the fraction of active promoter <i>Pf</i> is
 +
 
 +
<br></html>[[image:picture_17.png]]<html><br><br>
 +
 
 +
Introducing P’ from (6) gives
 +
<br></html>[[image:picture_18.png]]<html><br><br>
 +
 
 +
Now introducing </html>[[image:picture_37.png]]<html> we can obtain a function of the fraction of active promoter sites as a function of NAD(H) level:
 +
 
 +
<br></html>[[image:picture_19.png]]<html><br><br>
 +
 
 +
For simplicity the expression of (5) has not been inserted. Figure 2 shows how the redox poise modulates transcription from the promoter P, which is controlled by The Redoxilator.<br>
 +
 
 +
<br></html>[[image:Pfratio.png|350px|thumb|center]]<html>
 +
<i><b>Figure 2 - Fraction of active promoters with increasing NAD/NADH ratio.</b><br> The curve is sigmoidal and has almost switch like behavior. From NAD/NADH = 0 to 0.01 the difference in active promoter is almost 60 %.(Assumed value of K_P = 1 mM, and m = 2).
 +
<br></i><br>
 +
 
 +
<font size="3"><p><b>mRNA production</b></p></font>
 +
 
 +
mRNA is produced from the transcription of the active promoter. Concentration of intracellular levels of mRNA (</html>[[image:picture_20.png]]<html>) can be derived from the mRNA balance:
 +
 
 +
<br></html>[[image:picture_21.png]]<html><br><br>
 +
 
 +
Here it is assumed that mRNA is degraded corresponding to a first order reaction and that mRNA is not exported from the cell. <br>
 +
 
 +
The term </html>[[image:picture_22.png]]<html> represents the dilution due to growth. However mRNA is highly unstable and is thus degraded within tens of seconds to order few minutes, making <i> k_dm</i> very small compared to growth rate. This makes </html>[[image:picture_24.png]]<html>, simplifying the mRNA balance to:
 +
 
 +
<br></html>[[image:picture_25.png]]<html>                    (9)<br><br>
 +
 
 +
<b>Production rate of mRNA </b> </html>[[image:picture_26.png]]<html> <br>
 +
It is assumed that when RNA polymerase is efficiently bound to the promoter, the promoter is active and mRNA is transcribed at constant maximum rate </html>[[image:picture_27.png]]<html>. The binding of RNA polymerase is dependent on the presence of transcription factor and determined by signal strength (NAD/NADH) as well as Kp. In the overall production rate of mRNA, of course also the number of promoters (and genes) Np is influencing:
 +
 
 +
<br></html>[[image:picture_28.png]]<html><br><br>
 +
 
 +
For a given organism </html>[[image:picture_27.png]]<html> and Np are constant. Inserting (10) into (9) the mRNA balance becomes:
 +
 
 +
<br></html>[[image:picture_35.png]]<html><br><br>
 +
 
 +
<b>Steady state concentration of mRNA</b><br>
 +
At steady state (11) is equal to zero since no mRNA accumulates. Here the mRNA concentration is:
 +
 
 +
<br></html>[[image:picture_29.png]]<html><br>
 +
 
 +
<br></html>[[image:MRNAratio.png|350px|thumb|center]]<html>
 +
<i><b>Figure 3 - mRNA levels at steady state with increasing NAD/NADH ratios.</b> <br>Dilution is neglected since degradation rate of mRNA is much larger. (Assumed parameters: kdm = 8.3 h-1 (half life = 5 min), Np = 60 (2 micron plasmid is used). and </html>[[image:picture_27.png]]<html>  = 180 U/h (assuming 75 bases per second, and 1500 bases in gene).)
 +
<br></i><br>
 +
 
 +
 
 +
 
 +
 
 +
 
 +
 
 +
<font size="3"><p><b>GFP production</b></p></font>
 +
Finally, the mRNA is used as template for the process of translation to protein, here GFP. The GFP protein balance:
 +
 
 +
<br></html>[[image:picture_30.png]]<html><br><br>
 +
 
 +
As with mRNA, it is assumed that GFP is degraded by first order rate. The dilution cannot be neglected since protein degradation is much slower than mRNA degradation. Furthermore it is assumed that GFP is not transported out of the cell.
 +
 
 +
<br><br>
 +
 
 +
The protein is synthesized by ribosomes. The number of ribosomes bound to one mRNA (Np) and the protein production rate of the ribosome (kp) should be taken into account. The number of ribosomes in the cell, ATP and available charged amino acids are assumed to be non-limiting. Taking this into account, the protein synthesis rate can be described as
 +
 
 +
<br></html>[[image:picture_31.png]]<html><br><br>
 +
 
 +
Making the final GFP balance
 +
 
 +
<br></html>[[image:picture_32.png]]<html><br><br>
 +
 
 +
This final relation relates the GFP balance directly to the levels of NADH and NAD through mRNA level, promoter activity and transcription factor activity. <br><br>
 +
 
 +
<b>Steady state concentration of GFP</b><br>
 +
From (15) we find that the steady state concentration of GFP is
 +
 
 +
<br></html>[[image:picture_33.png]]<html><br><br>
 +
 
 +
This relation opens certain possibilities: By knowing the NAD/NADH ratio of the cell, one can predict the GFP expression using this model. Or opposite and even more relevant, knowing (by measurement) the  GFP level of the cell, one can point out the redox state. In this way The redoxilator acts as an <i>in vivo</i> redox sensor. Figure 4 shows how the steady state concentration of GFP changes at different redox poises.
<br>
<br>
 +
<br></html>[[image:GFPssratio.png|350px|thumb|center]]<html>
 +
<i><b>Figure 4 - Steady state GFP levels as a direct function of NAD/NADH signal levels.</b><br>  of a cell in steady state. (Assumed parameters Nrib = 1. kp = 288 U/h, assuming 40 amino acids per second. k_dGFP = 1.386 h-1 equal to a half time of 30 min [3]. Growth rate = 0.1 h-1).</i> <br><br>
 +
 +
So far a model has been derived showing how steady state GFP levels changes with different values of NAD/NADH poise. This is applicable when the NAD/NADH ratios are constant. However, when NAD/NADH changes in time, GFP also changes in time <i>dynamically</i>. In order to sense changes in NAD/NADH ratios it is important that the reporter signal (GFP level) changes relatively fast. The following paragraph deals with the dynamic state.
 +
<br><br>
 +
 +
<font size="3"><p><b>The dynamic state</b></p></font>
 +
 +
When the cells are exposed to a certain NAD/NADH level mRNA and in turn GFP levels will change in time according to their balances. In figure 5 the NAD+ level is changed from 0 M to 5mM equal to total amount of NAD(H). 
 +
 +
<br></html>[[image:Response.png|400px|thumb|center]]<html>
 +
<i><b>Figure 5 - Dynamics of GFP expression when NAD+ level is changed</b><br>
 +
<b>A:</b> At t = 1, the NAD+ level is suddenly shifted from 0 M to the total concentration of NAD(H). At t = 4, the NAD is shifted to 0 M. <b>B:</b> dynamic mRNA level. A fast response in mRNA levels is observed in both production and degradation. <b>C:</b> dynamic GFP levels. The response is much slower than mRNA. After app. 1/2 hour from signal burst, the GFP level has reached half of the maximum level. Degradation and dilution is relatively fast for a protein with a response time of approximately 40 min.
 +
</i> <br><br>
 +
 +
Figure 5 illustrates the importance of using a fast degradable GFP when using the redoxilator system as a sensor. If the cells that are subject for an <i>in vivo</i> analysis of redox poise using The redoxilator suddenly shift to a new state, the sensor will respond fast (in about 40 minutes with the assumed parameters).
 +
 +
<br><br>
 +
 +
If the NAD/NADH level changes in time, all values depending on NAD(H) concentrations will also be time depending. This will result in periodic burst in the production of the protein under control of the redox system:
 +
 +
<br></html>[[image:Dynamic2.png|500px|thumb|center]]<html>
 +
<i><b>Figure 6 - Dynamics of GFP expression when NAD+ level is changed</b> <br>
 +
<b>A:</b>Simulated change in NAD+/NADH level.<b>B:</b> Since NAD+/NADH ratio changes periodically, also transcription factor activity changes.<b>C:</b> The changes in NAD+ affects the dynamic GFP levels.
 +
</i>
 +
 +
<br><br>
 +
Figure 6 shows how the protein under control of the redoxilator is produced in bursts. Due to the fast degradation of GFP in this case, GFP levels will change in response to the redox level with a fast response time.
 +
 +
<br><br>
 +
 +
<b>References</b> <br>
 +
[1] Heijnen J.J 2009. Modular structured kinetic models: protein production from genes.<br>
 +
[2] Brekasis, D., Paget, M.S., 2003. A novel sensor of NADH/NAD+ redox poise in Streptomyces coelicolor A3(2). EMBO J. 22, 4856–4865.<br>
 +
[3] Mateus and Avery, 2000. Destabilized green fluorescent protein for monitoring dynamic changes in yeast gene expression with flow cytometry. Yeast 2000; 16: 1313±1323. <br>
 +
 +
 +
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<b>Abbreviations used in the model</b>
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Modelling is done using MATLAB with simbiology
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<br><br>
-
 
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<i>TF</i> = the transcription factor based on the REX protein <br><br>
 +
<i>TF'</i> = active transcription factor <br><br>
 +
<i>N</i> = concentration of NAD <br><br>
 +
<i>H</i> = concentration of NADH <br><br>
 +
<i>TFH</i> = concentration of the transcription factor bound to NADH. <br><br>
 +
<i>TFN</i> = concentration of the transcription factor bound to NAD. <br><br>
 +
<i>P</i> = Promoter upstream of GFP <br><br>
 +
<i>P'</i> = activated/transcribed promoter <br><br>
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<i>tf</i> = fraction of active transcription factor <br><br>
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<i>Pf</i> = fraction of active promoter<br><br>
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<br>
   </font>
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Latest revision as of 01:12, 22 October 2009

Wiki banner 967px.png

Welcome to the DTU iGEM wiki!


Modelling of The Redoxilator

Introduction

Here a model for the GFP expression under the control of “The Redoxilator” expression system is derived. The model is based on modular structured kinetics and links the level of the signal molecules NADH and NAD to the final expression of GFP through the events of

i) transcription factor activation,
ii) promoter activation,
iii) synthesis and degradation of mRNA and finally,
iv) synthesis, dilution and degradation of GFP.

This model formed the basis of the genetic design of the The redoxilator. Importantly it provided understanding of the influence of each of the parameters when designing the system, e.g. that in order to achieve fast response time a fast degradable GFP was needed as reporter. However, since many parameters specific for this system are not yet available, the model is not expected to make exact predictions but to ease the understanding of the design "principles".

The redox coupled system

Gene design and redox regulation
NADH and NAD competes about binding to REX, however only when NADH is bound, the trancription factor is inhibited from binding to DNA. When the transcription factor is active (NADH not bound), the fused activator domain summons the RNA polymerase and the reporter gene is transcribed.


NADH and NAD binding to the transcription factor

Both NADH and NAD binds reversible to the same site of the transcription factor (TF):

Dissociation of TF and NADH
Picture 2.png
at equilibrium:
Picture 3.png
Dissociation of TF and NAD:
Picture 46.png

Dissociation constant of TF and NAD:
Picture 5.png

Balance of NAD and NADH. Constant total level of NADH + NAD in the cell are assumed:
Picture 6.png

Balance of TF. TF is constitutively expressed leading to constant total value Picture 7.png.
Picture 8.png

NADH inhibits DNA binding activity of TF and thus transcription activity. Active TF is designated TF’.
Picture 38.png

Leading to the conserved moiety:
Picture 40.png

Using (3), the fraction of TF’ (tf) can be written as
Picture 41.png

With (1) and (2) in (4) the tf becomes
Picture 42.png

Leading to
Picture 43.png

Importantly figure 1 shows how the transcription factor is affected by the cofactor pool of NAD(H). The competing binding of NADH and NAD makes the system sense the redox poise rather than the concentration of each of the cofactors [2].
TFratio.png
Figure 1 - Transcription factor activity with increasing NAD/NADH ratio is hyperbolic.
At NAD/NADH = 0.1, tf = 0.5, i.e. half of the transcription factors are active. (For this plot the following parameters were used: assuming K_H = 0,02 μM and K_N = 2 μM since REX NADH affinity > REX NAD affinity [2]. Picture 7.png = 2mM, estimated TF concentration expressed from a constitutive TEF promoter.)

Promoter binding of active transcription factor

When the active TF (TF') is bound to the promoter (P), P becomes active (P’) and transcription is initiated. The number of transcription factors needed for promoter activation is designated m:
Picture 47.png

Here it assumed that binding of TF and TFN is equal.
The dissociation equilibrium for this reaction:
Picture 15.png

The number of promoters is constant, making the sum of fractions equal to
Picture 16.png

Where the fraction of active promoter Pf is
Picture 17.png

Introducing P’ from (6) gives
Picture 18.png

Now introducing Picture 37.png we can obtain a function of the fraction of active promoter sites as a function of NAD(H) level:
Picture 19.png

For simplicity the expression of (5) has not been inserted. Figure 2 shows how the redox poise modulates transcription from the promoter P, which is controlled by The Redoxilator.

Pfratio.png
Figure 2 - Fraction of active promoters with increasing NAD/NADH ratio.
The curve is sigmoidal and has almost switch like behavior. From NAD/NADH = 0 to 0.01 the difference in active promoter is almost 60 %.(Assumed value of K_P = 1 mM, and m = 2).

mRNA production

mRNA is produced from the transcription of the active promoter. Concentration of intracellular levels of mRNA (Picture 20.png) can be derived from the mRNA balance:
Picture 21.png

Here it is assumed that mRNA is degraded corresponding to a first order reaction and that mRNA is not exported from the cell.
The term Picture 22.png represents the dilution due to growth. However mRNA is highly unstable and is thus degraded within tens of seconds to order few minutes, making k_dm very small compared to growth rate. This makes Picture 24.png, simplifying the mRNA balance to:
Picture 25.png (9)

Production rate of mRNA Picture 26.png
It is assumed that when RNA polymerase is efficiently bound to the promoter, the promoter is active and mRNA is transcribed at constant maximum rate Picture 27.png. The binding of RNA polymerase is dependent on the presence of transcription factor and determined by signal strength (NAD/NADH) as well as Kp. In the overall production rate of mRNA, of course also the number of promoters (and genes) Np is influencing:
Picture 28.png

For a given organism Picture 27.png and Np are constant. Inserting (10) into (9) the mRNA balance becomes:
Picture 35.png

Steady state concentration of mRNA
At steady state (11) is equal to zero since no mRNA accumulates. Here the mRNA concentration is:
Picture 29.png

MRNAratio.png
Figure 3 - mRNA levels at steady state with increasing NAD/NADH ratios.
Dilution is neglected since degradation rate of mRNA is much larger. (Assumed parameters: kdm = 8.3 h-1 (half life = 5 min), Np = 60 (2 micron plasmid is used). and Picture 27.png = 180 U/h (assuming 75 bases per second, and 1500 bases in gene).)

GFP production

Finally, the mRNA is used as template for the process of translation to protein, here GFP. The GFP protein balance:
Picture 30.png

As with mRNA, it is assumed that GFP is degraded by first order rate. The dilution cannot be neglected since protein degradation is much slower than mRNA degradation. Furthermore it is assumed that GFP is not transported out of the cell.

The protein is synthesized by ribosomes. The number of ribosomes bound to one mRNA (Np) and the protein production rate of the ribosome (kp) should be taken into account. The number of ribosomes in the cell, ATP and available charged amino acids are assumed to be non-limiting. Taking this into account, the protein synthesis rate can be described as
Picture 31.png

Making the final GFP balance
Picture 32.png

This final relation relates the GFP balance directly to the levels of NADH and NAD through mRNA level, promoter activity and transcription factor activity.

Steady state concentration of GFP
From (15) we find that the steady state concentration of GFP is
Picture 33.png

This relation opens certain possibilities: By knowing the NAD/NADH ratio of the cell, one can predict the GFP expression using this model. Or opposite and even more relevant, knowing (by measurement) the GFP level of the cell, one can point out the redox state. In this way The redoxilator acts as an in vivo redox sensor. Figure 4 shows how the steady state concentration of GFP changes at different redox poises.

GFPssratio.png
Figure 4 - Steady state GFP levels as a direct function of NAD/NADH signal levels.
of a cell in steady state. (Assumed parameters Nrib = 1. kp = 288 U/h, assuming 40 amino acids per second. k_dGFP = 1.386 h-1 equal to a half time of 30 min [3]. Growth rate = 0.1 h-1).


So far a model has been derived showing how steady state GFP levels changes with different values of NAD/NADH poise. This is applicable when the NAD/NADH ratios are constant. However, when NAD/NADH changes in time, GFP also changes in time dynamically. In order to sense changes in NAD/NADH ratios it is important that the reporter signal (GFP level) changes relatively fast. The following paragraph deals with the dynamic state.

The dynamic state

When the cells are exposed to a certain NAD/NADH level mRNA and in turn GFP levels will change in time according to their balances. In figure 5 the NAD+ level is changed from 0 M to 5mM equal to total amount of NAD(H).
Response.png
Figure 5 - Dynamics of GFP expression when NAD+ level is changed
A: At t = 1, the NAD+ level is suddenly shifted from 0 M to the total concentration of NAD(H). At t = 4, the NAD is shifted to 0 M. B: dynamic mRNA level. A fast response in mRNA levels is observed in both production and degradation. C: dynamic GFP levels. The response is much slower than mRNA. After app. 1/2 hour from signal burst, the GFP level has reached half of the maximum level. Degradation and dilution is relatively fast for a protein with a response time of approximately 40 min.


Figure 5 illustrates the importance of using a fast degradable GFP when using the redoxilator system as a sensor. If the cells that are subject for an in vivo analysis of redox poise using The redoxilator suddenly shift to a new state, the sensor will respond fast (in about 40 minutes with the assumed parameters).

If the NAD/NADH level changes in time, all values depending on NAD(H) concentrations will also be time depending. This will result in periodic burst in the production of the protein under control of the redox system:
Dynamic2.png
Figure 6 - Dynamics of GFP expression when NAD+ level is changed
A:Simulated change in NAD+/NADH level.B: Since NAD+/NADH ratio changes periodically, also transcription factor activity changes.C: The changes in NAD+ affects the dynamic GFP levels.


Figure 6 shows how the protein under control of the redoxilator is produced in bursts. Due to the fast degradation of GFP in this case, GFP levels will change in response to the redox level with a fast response time.

References
[1] Heijnen J.J 2009. Modular structured kinetic models: protein production from genes.
[2] Brekasis, D., Paget, M.S., 2003. A novel sensor of NADH/NAD+ redox poise in Streptomyces coelicolor A3(2). EMBO J. 22, 4856–4865.
[3] Mateus and Avery, 2000. Destabilized green fluorescent protein for monitoring dynamic changes in yeast gene expression with flow cytometry. Yeast 2000; 16: 1313±1323.
Modelling facts

Abbreviations used in the model

TF = the transcription factor based on the REX protein

TF' = active transcription factor

N = concentration of NAD

H = concentration of NADH

TFH = concentration of the transcription factor bound to NADH.

TFN = concentration of the transcription factor bound to NAD.

P = Promoter upstream of GFP

P' = activated/transcribed promoter

tf = fraction of active transcription factor

Pf = fraction of active promoter


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