Team:Aberdeen Scotland/parameters/invest 4

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= Quorum Sensing =
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= The Input-dependent model =
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One of the triggering mechanisms of our Pico plumber in order to start glue production, is quorum sensing. Quorum sensing is a response of bacteria to their population density. In the natural system of the marine bacterium Vibro fischeri a small molecule, termed autoinducer, is constantly produced at a low level. This autoinducer molecule (HSL) can freely diffuse in and out the E.Coli membrane. The HSL molecule then diffuses into the surroundings. Other bacteria in the surrounding environment can sense each other via diffusion of HSL through their cell membrane. In the absence of a high density of cells HSL rapidly diffuses into the environment and the HSL concentration is too low to trigger quorum sensing.
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Quorum sensing is based on a lux-type regulated transcriptional system controlling the production of the autoinducer. In Vibro fischeri, LuxR is encoded on the left side of the operon whereas LuxI is produced on the right side. LuxI together wuth an enzyme always present in the cell, called SAM, together generate in an enzymatic reaction the autoinducer, HSL. The autoinducer  HSL together with LuxR form a transcriptional activator for the lux operon, also known as lux box. This complex enables a stronger production of LuxI and LuxR and can been seen as an amplifying loop for LuxI production [1-3].
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For this model, we no longer assume a trivial process of repression of lacI being liften and QS being turned on. The LacI repression is now a repression / induction hill function with a K<sub>d</sub>  of 1200 molecules per cell for IPGT forming IPGT lacI complexes. We assume IPGT leaks into the cell from outside. We only set the outside concentration of IPGT.
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For quorum sensing all we set is an elevated HSL concentration outside which is free to defuse in. We now include a feedback loop into the QS mechanism. To do this we attach a lux box onto the plasmid for producing luxR and luxI, like so:
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== The issue ==
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In the planning stage of the project, we designed the quorum sensing circuit to have a constant medium production of LuxI in order to activate a lux box on the plasmid where the glue production takes place, in the presence of sufficient cell density:
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[[Image:Qs_invest_1.jpg|center|400px]]
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[[Image:Qs_invest_2.jpg|center|400px]]
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[[Image:Input Model Graph 1.jpg|center|500px]]
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We are using the lux operon and LacO to give us AND–logic gate to start glue production (here denoted as gene X and gene Y). It is expected that if IPTG is present and there is no HSL within the cell, the promoter starts to produce the glue at a low level. In the presence of HSL and IPTG the promoter starts fabrication of the glue at its maximum level.
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A possible source of error in our design is that our system might trigger glue production and cell lysis on its own. Having in mind that we have a constitutive medium strength promoter, we need a lower concentration of LuxI. To achieve this LuxI was tagged and a Shine-Dalgarno sequence was used to reuce ribosome affinity to 60%.
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However, we are taking the production strengths of this lux box to be reduced in comparison to our lux box for producing X, Y and cI. The strengths are
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== The Model ==
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Production max  for X, Y and cI    = 0.44 pops
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We ran our simulation using the IPTG and HSL concentration outside the cell as inputs. We changed both IPTG and HSL concentration at different times by a switch from low to high to see how the inputs affected the simulation. In our later simulations we simulated both the IPTG and HSL inputs more realistically. We did this applying the sochastic simulation (tau-leap method).
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[[Image:Qs_invest_3.jpg|center|700px]]
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taken from the iGEM page of ***** and personal communication with **** on ****
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Production min for X Y and cI      = 0.013 pops
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taken from *****
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Production max for QS feedback    = 0.002 pops
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Production min for QS feedback    = 0.00015 pops
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These values are taken from the paper “ FIOADAOIDFJAOFJASDIOJASOIJADOAJSDAFOJAFOAJSD”
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An important new parameter is K<sub>P</sub>. This is the dissociation constant for “P” activating the lux boxes. P is the luxR/HSL complex . To take a break from the wordy descriptions we will now show some small sections of results for this model, which should be easily interpretable after following the section about the Monte Carlo analysis
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The graph shows the concentration of molecules against the iteration number (which is equivalent to time multiplied by a time-step constant of h=0.5). GFP is a place holder for the glue, P stands for the complex of HSL and LuxR, and finally, IPTG and HSL are the input signals for our cell. IPTG is released at 15000 iterations, whereas HSL diffuses from the outside at 25000 iterations. We want a system to have AND-logic gate, so that both high IPTG and HSL concentration is required for system response. However, it is clearly visible that maximal production of GFP already starts shortly after IPTG gets into the cell.
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We can conclude from this that the lux-box is activated from within the cell. TThe high production of LuxI and hence, HSl, leads to a high concentration of the HSl-LuxR complex. Moreover, the HSL-LuxR complex is ver stable. This complex cannot diffuse out of the cell as HSL can, so that its concentration can build up very much and hence, activate the lux-box.
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= Exterior levels of IPTG and HSL required for success =
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= Possible Solution =
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The outside levels of IPGT and HSL are the only two assumptions we make in this model, let’s see what these assumptions need to be in order to achieve success
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To try to overcome this problem, we have redesigned the system to have LuxI and LuxR on the same promoter but with a lux box in front of both. For this model, we no longer assume the trivial process of repression of LacI being lifted and Quorum Sensing (QS) being turned on. The LacI repression is now a repression / induction hill function with a K<sub>d</sub> of 1200 molecules per cell for IPTG forming the LacI-IPTG complex. We assume IPTG leaks into the cell from outside. We only set the outside concentration of IPTG.
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For quorum sensing all simply set an elevated exterior HSL concentration which is free to diffuse in. We now include a feedback loop into the QS mechanism. To do this we attach a lux box onto the plasmid producing LuxR and LuxI, as follows:
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[[Image:Input Model Graph 2.jpg|center|700px]]
 
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[[Image:Input Model Graph 3.jpg|center|700px]]
 
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So we need about 6000 molecules of both HSL and IPGT for success... although this will depend on our 3 old K<sub>d</sub> values of K<sub>LacI</sub> K<sub>TetR</sub> K<sub>cI</sub> and our new one of K<sub>P</sub>. (P is the luxR HSL complex activating the lux boxes)
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[[Image:Input Model Graph 1.jpg|center|500px]]
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For this experiment the K<sub>d</sub> values are
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However, the production strength of this lux box is smaller than that of the lux box for producing X, Y and cI. The strengths are as follows:
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Production max  for X, Y and cI    = 0.44 PoPS (Polymerases-per-second)
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K<sub>LacI</sub> = 700 molecules per cell
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Production min for X Y and cI      = 0.013 PoPS
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K<sub>cI</sub> = 5000 molecules per cell
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Production max for QS feedback    = 0.002 PoPS
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K<sub>tetR</sub> = 3000 molecules per cell
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Production min for QS feedback    = 0.00015 PoPS
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K<sub>P</sub> = 200 molecules per cell
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(check our "parameters" section for references)
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For now we will take our outside levels of IPGT and HSL to be 10,000 molecules. Although we have not yet calculated physically appropriate values yet.  
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An important new parameter is K<sub>P</sub>. This is the dissociation constant for “P” activating the lux boxes, where P is the LuxR-HSL complex. In the next section we show how the most important results obtained with this model.  
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= K<sub>TetR</sub>, K<sub>cI</sub> and K<sub>LacI</sub> relation =
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=Level of K<sub>P</sub> required for system to function =
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We studied this relationship in the simplified input model. Let’s now look at it again for the new input dependant one
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here we use a Monte Carlo simulation to determine the value of K<sub>P</sub> in molecules per cell that is required for the system to function (note that the IPTG and HSL input levels added are both 10000 molecules)
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[[Image:Input Model Graph 10.jpg|centre|700px]]
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[[Image:Input Model Graph 11.jpg|centre|700px]]
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[[Image:Input Model Graph 5.jpg|center|700px]]
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[[Image:Input Model Graph 6.jpg|center|700px]]
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=Relationship between K<sub>TetR</sub>, K<sub>CI</sub> and K<sub>LacI</sub> when K<sub>P</sub> is 50 =
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[[Image:Input Model Graph 4.jpg|centre|700px]]
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[[Image:Input Model Graph 7.jpg|center|700px]]
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=Relationship between K<sub>TetR</sub> and K<sub>CI</sub> when K<sub>P</sub> is 50 and K<sub>LacI</sub> is 700 =
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Knowing that the relationship between success with K<sub>LacI</sub> is quite uninteresting, our next plot will let us find another way of viewing the relationship between success, K <sub>TetR</sub> and K<sub>CI</sub>, and use our 4th dimension more cleverly
 
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[[Image:Input Model Graph 8.jpg|center|700px]]
 
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[[Image:Input Model Graph 9.jpg|center|700px]]
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We notice that K<sub>P</sub> must be around 50 molecules to let the system function. We will now explore the relationship between K<sub>TetR</sub> and K<sub>CI</sub> at the value of K<sub>P</sub>=50 molecules per cell.
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for this simulation we set the HSL and IPTG input levels to 50,000 molecules. In our next section we will try to calculate the minimum levels of HSL and IPTG required to activate the system correctly.
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It seems that this model is a lot more intricate in nature, and also success is much harder to find.  Also we note that X concentration never really gets above 80 percent of its maximum, and is usually a great deal lower.
 
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[[Image:Input Model Graph 8.jpg|centre|700px]]
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[[Image:Input Model Graph 9.jpg|centre|700px]]
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The graph shows a great deal of stochastic fluctuation, which shows this system is not very robust. Increasing K<sub>P</sub> above 50 greatly increases this problem, as does decreasing HSL outside below 50,000.
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Our estimation for K<sub>TetR</sub> and K<sub>CI</sub> suggest that K<sub>TetR</sub> is less than K<sub>CI</sub>. We assume the worst case value for these two dissociation constants and set them equal to each other, at K<sub>TetR</sub> = K<sub>CI</sub> = 7000 molecules per cell.
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= Relationship between K<sub>TetR</sub> K<sub>CI</sub> and K<sub>P</sub> =
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= Required input levels of IPTG and HSL =
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K<sub>P</sub> plays a very important role in the success of the system. In essence K<sub>P</sub> has to be low, and the lower the better, as we see in the following Montecarlo simulations
 
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[[Image:Input Model Graph 10.jpg|center|700px]]
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[[Image:Input Model Graph 2.jpg|centre|700px]]
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[[Image:Input Model Graph 11.jpg|center|700px]]
 
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The reason K<sub>P</sub> has to be so low is because in this system there is equal production of LuxR and LuxI. This production level is governed by a feedback loop but the minimal production must be low in order to stop the system triggering itself. As they are both expressed quite weakly it is hard to accululate a large quantity of the LuxR /HSL complex, P. As it is P that leads to the expression of the glue molecule X and CI and then K<sub>P</sub> must be low in order to express them to a large degree.
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We start by going from 5,000 molecules to 100,000 molecules for HSL and from 10 molecules to 5,000 molecules for IPTG. we see that the sysem requires only around 2000 molecules of IPTG outside, although it benefits slighty when it is exposed to more. Note that the graphs color bar only extends from 55% of X production to 70% of X production. There appears to be no disernable effect in increasing the HSL outside, although when it is above 70,000 it seems to reduce the stochastic effects that stop the system lysing.
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It is here that we find our first major flaw with the new model. The problem is that our assumption that K<sub>P</sub> can has to be as low as 200 molecules per cell is unrealistic. This means that while our first input, which is the lifting of LacI repression from IPGT induction works perfectly, our second input, the quorum sensing, fails at expressing the glue molecule X to a large degree. This means that we have to rethink, for a second time, our Quorum sensing system. This will be done in the next section “A rethink of Quorum sensing” but for now we will show some graphs of protein concentrations demonstrating the problem.
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We now look at a graph showing HSL at values below 5000 molecules.
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[[Image:Input Model Graph 3.jpg|centre|700px]]
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= The correct functionality =
 
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Here are a few graphs demonstrating how the new input dependant model should work
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= Optimal Operation =
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Here are the following assumptions that need to make to get the optimal system performance
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K<sub>P</sub> has to be ~50 molecules per cell
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[[Image:Input Model Graph 12.jpg|center|700px]]
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K<sub>TetR</sub> has to be ~3000 molecules per cell
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[[Image:Input Model Graph 13.jpg|center|700px]]
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K<sub>CI</sub> has to be ~ 5000 molecules per cell
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== Failure due to high levels of K<sub>P</sub> ==
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Here are the graphs showing how we expect the system to function with different values of K<sub>P</sub>.
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the input level of HSL has to be ~10,000 molecules
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We also demonstrate that it is K<sub>P</sub> which is the governing problem in this model, and that the model is quite robust to changes in K<sub>TetR</sub> and K<sub>CI</sub> within our expected values.
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[[Image:Input Model Graph 14.jpg|center|700px]]
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the input level of IPTG has to be ~5,000 molecules
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[[Image:Input Model Graph 15.jpg|center|700px]]
 
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[[Image:Input Model Graph 16.jpg|center|700px]]
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[[Image:Input Model Graph 12.jpg|centre|700px]]
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[[Image:Input Model Graph 13.jpg|centre|700px]]
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[[Image:Input Model Graph 17.jpg|center|700px]]
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[[Image:Input Model Graph 18.jpg|center|700px]]
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[[Image:Input Model Graph 19.jpg|center|700px]]
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[[Image:Input Model Graph 20.jpg|center|700px]]
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= The relationship between HSL outside, IPGT outside, K<sub>P</sub>, and system failure =
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= Actual Operation =
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Let us now try an experiment to check that it is not our input levels of HSL and IPGT that are creating the problem. Let us elevate our outside levels from 10,000 molecules to 50,000 molecules
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The graphs above show how the system would function with our carefully calculated optimum parameter set. However, we cannot guarantee that the actual parameters will be close to these estimates. while the input levels of HSL and IPTG are reasonable, our values of K<sub>CI</sub> and K<sub>TetR</sub> may well be almost equal to each other, and around 7000 molecules per cell. While changing these to 7000 would reduce the level of the glue production at lysis the killing blow for this model is that K<sub>P</sub> is almost definitely larger than 50 molecules per cell.
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The following graph shows how the system functions at the values of K<sub>d</sub> we believe to be most likely:
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[[Image:Input Model Graph 22.jpg|center|700px]]
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[[Image:Input Model Graph 14.jpg|centre|700px]]
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So the system runs much more successfully under these conditions. Let us use our parameter analysis approach to explore this relationship.
 
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[[Image:Input Model Graph 25.jpg|center|700px]]
 
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[[Image:Input Model Graph 26.jpg|center|700px]]
 
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So essentially we see that having input levels of 30,000 molecules outside of the cell would be perfect. We will calculate in later sections whether this is achievable, but in any case it would be advisable to change our Quorum sensing mechanism at this stage regardless because we cannot guarantee that K<sub>P</sub> will be of the order of ~50 to 500 molecules; in fact we can make an educated guess that it will in fact be much larger than this.
 
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= Conclusions on this model =
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= Conclusions =
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While the last few sections have been dealing with system failures it is important to note that this system works on many levels. Firstly, the value of K<sub>LacI</sub> is ideal and should pose no problem at all. Secondly, our estimates of K <sub>CI</sub> and K<sub>TetR</sub> should also pose no serious problem as long as they are within the range of a few thousand to around 7000.
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So in summary, the processing and output of our system works as intended, and as for our “AND gate” input we can say that half is fully functional while the other half needs work.
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In the next section we will describe this Quorum sensing input in detail and outline the next model we shall explore.
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As we have seen above, our system is very stochastically unstable, and extremly sensitive to the parameters we have investigated. As our best estimates of these parameters do not fall close to the optimal range required for the quorum sensing system we must redesign it. In the next section we amended our quorum sensing system again, to try to produce the correct response to our inputs.
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<a href="https://2009.igem.org/Team:Aberdeen_Scotland/parameters/invest_3"><img src="https://static.igem.org/mediawiki/2009/e/ed/Aberdeen_Left_arrow.png">&nbsp;&nbsp;Back to Parameter Simulations</a>
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<a href="https://2009.igem.org/Team:Aberdeen_Scotland/parameters/invest_3"><img src="https://static.igem.org/mediawiki/2009/e/ed/Aberdeen_Left_arrow.png">&nbsp;&nbsp;Back to Sensitivity Simulations</a>
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<a href="https://2009.igem.org/Team:Aberdeen_Scotland/quorum/invest_1">Continue to Quorum Sensing&nbsp;&nbsp;<img src="https://static.igem.org/mediawiki/2009/4/4c/Aberdeen_Right_arrow.png"></a>
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<a href="https://2009.igem.org/Team:Aberdeen_Scotland/parameters/invest_5">Continue to the Amended Model&nbsp;&nbsp;<img src="https://static.igem.org/mediawiki/2009/4/4c/Aberdeen_Right_arrow.png"></a>
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= Bibliography =
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(1) Goryachev. Systems analysis of a quorum sensing network: Design constraints imposed by the functional requirements, network topology and kinetic constants. BioSystems 2006;83(2-3 SPEC. ISS.):178.
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(2) James. Luminescence control in the marine bacterium Vibrio fischeri: An analysis of the dynamics of lux regulation. J.Mol.Biol. 2000;296(4):1127.
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(3) Ward JP. Mathematical modelling of quorum sensing in bacteria. IMA. 2001;18:263-292.
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(4) <html><a href="https://2009.igem.org/Team:Aberdeen_Scotland/internal/stochastic">Link to stochastic Equations</a></html>
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Latest revision as of 17:18, 18 August 2009

University of Aberdeen iGEM 2009

Contents

Quorum Sensing

One of the triggering mechanisms of our Pico plumber in order to start glue production, is quorum sensing. Quorum sensing is a response of bacteria to their population density. In the natural system of the marine bacterium Vibro fischeri a small molecule, termed autoinducer, is constantly produced at a low level. This autoinducer molecule (HSL) can freely diffuse in and out the E.Coli membrane. The HSL molecule then diffuses into the surroundings. Other bacteria in the surrounding environment can sense each other via diffusion of HSL through their cell membrane. In the absence of a high density of cells HSL rapidly diffuses into the environment and the HSL concentration is too low to trigger quorum sensing. Quorum sensing is based on a lux-type regulated transcriptional system controlling the production of the autoinducer. In Vibro fischeri, LuxR is encoded on the left side of the operon whereas LuxI is produced on the right side. LuxI together wuth an enzyme always present in the cell, called SAM, together generate in an enzymatic reaction the autoinducer, HSL. The autoinducer HSL together with LuxR form a transcriptional activator for the lux operon, also known as lux box. This complex enables a stronger production of LuxI and LuxR and can been seen as an amplifying loop for LuxI production [1-3].

The issue

In the planning stage of the project, we designed the quorum sensing circuit to have a constant medium production of LuxI in order to activate a lux box on the plasmid where the glue production takes place, in the presence of sufficient cell density:

Qs invest 1.jpg
Qs invest 2.jpg

We are using the lux operon and LacO to give us AND–logic gate to start glue production (here denoted as gene X and gene Y). It is expected that if IPTG is present and there is no HSL within the cell, the promoter starts to produce the glue at a low level. In the presence of HSL and IPTG the promoter starts fabrication of the glue at its maximum level. A possible source of error in our design is that our system might trigger glue production and cell lysis on its own. Having in mind that we have a constitutive medium strength promoter, we need a lower concentration of LuxI. To achieve this LuxI was tagged and a Shine-Dalgarno sequence was used to reuce ribosome affinity to 60%.

The Model

We ran our simulation using the IPTG and HSL concentration outside the cell as inputs. We changed both IPTG and HSL concentration at different times by a switch from low to high to see how the inputs affected the simulation. In our later simulations we simulated both the IPTG and HSL inputs more realistically. We did this applying the sochastic simulation (tau-leap method).

Qs invest 3.jpg

The graph shows the concentration of molecules against the iteration number (which is equivalent to time multiplied by a time-step constant of h=0.5). GFP is a place holder for the glue, P stands for the complex of HSL and LuxR, and finally, IPTG and HSL are the input signals for our cell. IPTG is released at 15000 iterations, whereas HSL diffuses from the outside at 25000 iterations. We want a system to have AND-logic gate, so that both high IPTG and HSL concentration is required for system response. However, it is clearly visible that maximal production of GFP already starts shortly after IPTG gets into the cell. We can conclude from this that the lux-box is activated from within the cell. TThe high production of LuxI and hence, HSl, leads to a high concentration of the HSl-LuxR complex. Moreover, the HSL-LuxR complex is ver stable. This complex cannot diffuse out of the cell as HSL can, so that its concentration can build up very much and hence, activate the lux-box.

Possible Solution

To try to overcome this problem, we have redesigned the system to have LuxI and LuxR on the same promoter but with a lux box in front of both. For this model, we no longer assume the trivial process of repression of LacI being lifted and Quorum Sensing (QS) being turned on. The LacI repression is now a repression / induction hill function with a Kd of 1200 molecules per cell for IPTG forming the LacI-IPTG complex. We assume IPTG leaks into the cell from outside. We only set the outside concentration of IPTG. For quorum sensing all simply set an elevated exterior HSL concentration which is free to diffuse in. We now include a feedback loop into the QS mechanism. To do this we attach a lux box onto the plasmid producing LuxR and LuxI, as follows:


Input Model Graph 1.jpg

However, the production strength of this lux box is smaller than that of the lux box for producing X, Y and cI. The strengths are as follows:

Production max for X, Y and cI = 0.44 PoPS (Polymerases-per-second)

Production min for X Y and cI = 0.013 PoPS

Production max for QS feedback = 0.002 PoPS

Production min for QS feedback = 0.00015 PoPS

(check our "parameters" section for references)

An important new parameter is KP. This is the dissociation constant for “P” activating the lux boxes, where P is the LuxR-HSL complex. In the next section we show how the most important results obtained with this model.

Level of KP required for system to function

here we use a Monte Carlo simulation to determine the value of KP in molecules per cell that is required for the system to function (note that the IPTG and HSL input levels added are both 10000 molecules)

Input Model Graph 10.jpg
Input Model Graph 11.jpg

Relationship between KTetR, KCI and KLacI when KP is 50

Input Model Graph 4.jpg


Relationship between KTetR and KCI when KP is 50 and KLacI is 700

We notice that KP must be around 50 molecules to let the system function. We will now explore the relationship between KTetR and KCI at the value of KP=50 molecules per cell. for this simulation we set the HSL and IPTG input levels to 50,000 molecules. In our next section we will try to calculate the minimum levels of HSL and IPTG required to activate the system correctly.


Input Model Graph 8.jpg
Input Model Graph 9.jpg

The graph shows a great deal of stochastic fluctuation, which shows this system is not very robust. Increasing KP above 50 greatly increases this problem, as does decreasing HSL outside below 50,000.

Our estimation for KTetR and KCI suggest that KTetR is less than KCI. We assume the worst case value for these two dissociation constants and set them equal to each other, at KTetR = KCI = 7000 molecules per cell.

Required input levels of IPTG and HSL

Input Model Graph 2.jpg


We start by going from 5,000 molecules to 100,000 molecules for HSL and from 10 molecules to 5,000 molecules for IPTG. we see that the sysem requires only around 2000 molecules of IPTG outside, although it benefits slighty when it is exposed to more. Note that the graphs color bar only extends from 55% of X production to 70% of X production. There appears to be no disernable effect in increasing the HSL outside, although when it is above 70,000 it seems to reduce the stochastic effects that stop the system lysing.

We now look at a graph showing HSL at values below 5000 molecules.

Input Model Graph 3.jpg

Optimal Operation

Here are the following assumptions that need to make to get the optimal system performance

KP has to be ~50 molecules per cell

KTetR has to be ~3000 molecules per cell

KCI has to be ~ 5000 molecules per cell

the input level of HSL has to be ~10,000 molecules

the input level of IPTG has to be ~5,000 molecules


Input Model Graph 12.jpg
Input Model Graph 13.jpg

Actual Operation

The graphs above show how the system would function with our carefully calculated optimum parameter set. However, we cannot guarantee that the actual parameters will be close to these estimates. while the input levels of HSL and IPTG are reasonable, our values of KCI and KTetR may well be almost equal to each other, and around 7000 molecules per cell. While changing these to 7000 would reduce the level of the glue production at lysis the killing blow for this model is that KP is almost definitely larger than 50 molecules per cell.

The following graph shows how the system functions at the values of Kd we believe to be most likely:

Input Model Graph 14.jpg


Conclusions

As we have seen above, our system is very stochastically unstable, and extremly sensitive to the parameters we have investigated. As our best estimates of these parameters do not fall close to the optimal range required for the quorum sensing system we must redesign it. In the next section we amended our quorum sensing system again, to try to produce the correct response to our inputs.

Bibliography

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(4) Link to stochastic Equations