Team:Evry/Model2
From 2013.igem.org
(Difference between revisions)
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<h2>Overview</h2> | <h2>Overview</h2> | ||
- | + | ||
+ | This model is based on the bacteria scale. We consider the activity of each bacteria.This drawing represent how we have reasoned the model. The environment is the duodenum. The bacteria produces siderophores and Siderophores chelate iron. Iron arrive in the environment by pulse every second. This pulse is constant. Iron is reduce by body and bacteria absorption. According to the hypothesis, we haven't iron auto-regulation. And the variation of Iron uptake is proportional to the iron quantity. | ||
+ | |||
+ | <h2>Assumptions</h2> | ||
+ | |||
+ | <ul> | ||
+ | <li>This model lasts 40 second.That's the time required for the chyme to cross the duodenum. | ||
+ | <li>The bacterial quantity is constant because of the very short time scale. | ||
+ | <li>The bacterial natural absorption is insignificant compared to the chelation because the production of siderophores is overexpressed. | ||
+ | </ul> | ||
+ | |||
<h2>Model Description </h2> | <h2>Model Description </h2> | ||
- | + | <h3>Bacteria</h3> | |
+ | A bacteria is a producer of siderophores. | ||
+ | This production is naturally ruled by a repressor and overexpressed by an activator : | ||
- | + | The repressor and the activator is ruled by thresholds. | |
+ | For the repressor, if iron quantity is lower than the threshold, we are in starvation case. So we haven't repression. | ||
+ | The production in this case is modeled by negative exponential. | ||
- | + | The activator have the same behaviour. if iron quantity is upper than the threshold the production of siderophores is activated. | |
+ | And this production is modeled by a positive exponential. | ||
- | + | The choice of exponential function is arbitrary. | |
- | + | Because of the different behaviour of each bacteria in a population, we have added a gaussian noise to the threshold. | |
- | |||
- | |||
- | < | + | <h3>Siderophore</h3> |
+ | In this approach, we consider that 1 mol of siderophore chelate 1 mol of iron. | ||
+ | And a siderophore can only chelate one iron atom. | ||
+ | We simulate the matching probability by a uniform random between 0 and 1. | ||
+ | If the random number is lower than the quotient between iron quantity in the environment and an optimal iron quantity for chelation, the siderophores can chelate iron. | ||
- | + | <h2>Equation System</h2> | |
+ | |||
+ | <h2>Results</h2> | ||
+ | |||
+ | <h2>Conclusion</h2> | ||
<div id="citation_box"> | <div id="citation_box"> |
Revision as of 09:59, 5 August 2013
Model 2
Overview
This model is based on the bacteria scale. We consider the activity of each bacteria.This drawing represent how we have reasoned the model. The environment is the duodenum. The bacteria produces siderophores and Siderophores chelate iron. Iron arrive in the environment by pulse every second. This pulse is constant. Iron is reduce by body and bacteria absorption. According to the hypothesis, we haven't iron auto-regulation. And the variation of Iron uptake is proportional to the iron quantity.Assumptions
- This model lasts 40 second.That's the time required for the chyme to cross the duodenum.
- The bacterial quantity is constant because of the very short time scale.
- The bacterial natural absorption is insignificant compared to the chelation because the production of siderophores is overexpressed.
Model Description
Bacteria
A bacteria is a producer of siderophores. This production is naturally ruled by a repressor and overexpressed by an activator : The repressor and the activator is ruled by thresholds. For the repressor, if iron quantity is lower than the threshold, we are in starvation case. So we haven't repression. The production in this case is modeled by negative exponential. The activator have the same behaviour. if iron quantity is upper than the threshold the production of siderophores is activated. And this production is modeled by a positive exponential. The choice of exponential function is arbitrary. Because of the different behaviour of each bacteria in a population, we have added a gaussian noise to the threshold.Siderophore
In this approach, we consider that 1 mol of siderophore chelate 1 mol of iron. And a siderophore can only chelate one iron atom. We simulate the matching probability by a uniform random between 0 and 1. If the random number is lower than the quotient between iron quantity in the environment and an optimal iron quantity for chelation, the siderophores can chelate iron.Equation System
Results
Conclusion
References: