Team:Grenoble/Modeling/Amplification/Stochastic/results
From 2012.igem.org
(Difference between revisions)
Line 4: | Line 4: | ||
<body id="Modeling"> | <body id="Modeling"> | ||
<div id="cadre"> | <div id="cadre"> | ||
+ | <section> | ||
+ | <center> | ||
+ | <a href="https://2012.igem.org/wiki/index.php?title=Team:Grenoble/Modeling/Amplification/ODE"><img src="https://static.igem.org/mediawiki/2012/e/ef/ODE.png" alt="" /></a> | ||
+ | | ||
+ | <a href="https://2012.igem.org/wiki/index.php?title=Team:Grenoble/Modeling/Amplification/Sensitivity"><img src="https://static.igem.org/mediawiki/2012/a/a4/Sensitivity_and_parameters.png" alt="" /></a> | ||
+ | | ||
+ | <a href="https://2012.igem.org/wiki/index.php?title=Team:Grenoble/Modeling/Amplification/Quorum"><img src="https://static.igem.org/mediawiki/2012/6/65/Quorum_Sensing.png" alt="" /></a> | ||
+ | | ||
+ | <a href="https://2012.igem.org/wiki/index.php?title=Team:Grenoble/Modeling/Amplification/Stochastic"><img src="https://static.igem.org/mediawiki/2012/a/ad/Stochastic_analysis.png" alt="" /></a> | ||
+ | </center> | ||
+ | </section> | ||
<section> | <section> | ||
<h1>Goal</h1> | <h1>Goal</h1> |
Revision as of 06:46, 21 September 2012
Goal
In this part we would like to answer 3 questions thanks to the stochastic modeling.- How much time do we need to wait to get a response ?
- Is the sensitivity of the amplification loop given by stochastic modeling the same as in ODE modeling ?
- What is the part of false positives ?
Time
We would like to evaluate the time needed to get an answer. Once a bacterium has detected a Golden staph, the quorum sensing will allow the propagation of the information. Thus we will be able to get the answer really quickly and visible. We need to establish a time not too small to avoid false negatives and not too long to avoid false positives and to be efficient. Indeed, if we take a short time we could miss some visible output signals which are longer to appear. Then we will conclude that nothing has been detected whereas there was something to detect. If we wait too long, some visible output signals can appear whereas there was nothing to detect. This phenomenon is due to the randomness inside the bacterium and espacially because of basal values. Indeed, because of the leaks at the promoter level, the production of proteins could be nonzero even when the gene is not up-regulated. We call this "basal production". In this first part we try to determine the ideal duration of observations and in the third part we will analyse if it would still be a good scale of time with respect to false positives. Thanks to the deterministic modeling we can have an estimation of the time needed to get an answer in different proportions. In the graph below you can observe the evolution of the output signal through time for an initial concentration of CAMP of 10-3 mol/L.Sensitivity
The ODE modeling gave 10-6 mol/L of CAMPi as the sensitivity of the amplification loop. This means, if we have 10-6 mol/L of CAMP at the initial point, the system will turn on. But this result is given by a deterministic analysis. What happens if we take into account the random phenomena of the bacterium ? Is the sensitivity still so good ? We want to obtain the evolution of the output signal (CA or GFP) depending on the concentration of the input signal (CAMPi) after 6h40 (400 min). To get that graph we simulate the algorithm hundreed times for each concentration of CAMPi (10, 101,5, 102, …, 106 molecules). We can compare the graph obtained with the one from the ODE modeling.False positives
We know the time we need to wait to get a response and the sensitivity of the amplification loop. But we don't know yet if that device is reliable. To answer this question we generate 10 000 simulations of the Gillespie Algorithm when there is no CAMP at the initial point. After 400 minutes we evaluate the number of output signals to establish the percentage of false positives. We consider as "output signal" the production of 35 molecules of CA which represents the lower bound of molecules of CA produced for an initial concentration of CAMP equal to the sensitivity of the amplification loop after 400 minutes according to our last modeling (part 2). We get the results below.Conclusion
With that stochastic modeling we have confirmed and slightly modified the results from the deterministic modeling. Indeed, the 400 minutes of waiting to get a response is also true in stochastic than in deterministic modeling. The sensitivity is slightly higher than in the ODE modeling but still be correct for our device. What's more, the proportion of false positives is really low. Thus, a 96-well plate will be efficient to detect the Golden staph for little concentrations and will be reliable.References
- Stochastic Simulation of Chemical Kinetics from Daniel T. Gillespie