Paris/Cell auto

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In this part of our work, we aim at characterizing the diffusion of the DAP and the effect on the cells differentiation. This study consists in observing by simulation, the diffusion of DAP in a lawn of germ cells with some isolated somatic cells using a cellular automaton.
 +
<br>
<br>
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==Spatial simulation==
 
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We try with this work to characterize the diffusion of the DAP and the effect on the cells. We have a lawn of bacterias with germinal cells and some somatic cells, we also introduce a spatial localisation for the cells.<br>
 
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=='''''We make some hypothesis:'''''==
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= Introduction =
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We work with a '''constant population''' (no death and no division), we can imagine that we are a stationary phase or between to division cycle.<br>
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DAP feeding between somatic and germ cells is based on an indirect communication process: soma cells produce DAP and release it in the environment; DAP molecules freely diffuse outside until they are captured by a germ cell. As the diffusion takes place in the environment, a somatic cell feed first the germ cells that are close to it. Then an well mixed hypothesis as the one used in the our [[Paris/Continuous_model|growth of population analysis]] is hard to assume. We are interesting here in the case where the differentiation of a germ into a soma is DAP dependent. In order to figure out the relation between DAP diffusion and differentiation we propose a simple cellular automaton on square grid. Each cell of the automaton contains a bacterium. We first detail some hypotheses used in this model, then we specify the local behavior rules following by each automaton cell. Finally, the generated simulation is presented.
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'''Without DAP a cell can't do anything''', so  it seems that DAP ''wake up'' bacteria but it's just an artifact.<br>
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The differentiation is '''DAP dependent''', it's append when the cell as enough DAP to evolve but not enough to divide.<br>
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The '''DAP is made in bacteria S''', the production rate is the difference between the total production and self consummation<br>
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The DAP can be under two types intra/extra cellular (DAPi/DAPe)<br>
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The '''DAP is consumed in bacteria G''' <br><br><br>
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=='''''We have 3 bags and 2 entities in our model'''''==
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= Hypotheses =
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*bag<br>
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Bact it has a concentration internal of DAP ('''DAPi''') and external ('''DAPe'''). It's a cell in our automaton<br>
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BactS is a Bact which produce DAPi<br>
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BactG is a Bact which consume DAPi <br>
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*entity<br>
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DAPi internal value of DAP<br>
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DAPe external value of DAP
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<br><br><br>
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=='''''We produce this set of rules'''''==
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<br>
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For bactS<br>
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*DAPe = DAPe + DAPe_diffused_in_neighborhood + DAPi_diffused_from_the_BactS<br>
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*DAPi= DAPi +DAPi_produced - DAPi_diffused_from_the_BactS<br>
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<br>
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For BactG<br>
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*DAPe=DAPe + DAPe_diffused_in_neighborhood - DAPi_diffused_from_the_BactG<br>
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*DAPi= DAPi -DAPi_consummate + DAPi_diffused_from_the_BactG<br>
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*BactG = if minimal DAPi for differentiation < DAPi < maximal DAPi for differentiation BactS else stay BactG
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<br><br><br>
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=='''''Initial state'''''==
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The chosen approach consists in observing the DAP diffusion and differentiation frontwaves. In order to focus on these phenomenon, we work on a ''constant'' population (no death, no division). So we assume that without DAP in its surrounding, a germ cell does not die but remain in passive state (we can imagine that they are at a stationary phase or between to division cycle). It will seem that DAP ''wake up'' bacteria but it's just an artifact due to this assumption.
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<br>
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We use a 30x30 cells automaton.
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All cells are BactG excepted 4 BactS which are placed randomly on the automaton
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<br><br><br>
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=='''''Parameters'''''==
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<br>
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We have 8 parameters and we can add noise for each of them.<br>
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'''In BactS:'''<br>
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*Dap export<br>
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*Dap import<br>
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*Dap production<br>
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<br>
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'''In BactG:'''<br>
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*Dap export<br>
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*Dap import<br>
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*Dap consummation<br>
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*Minimal Dap needed for differentiation<br>
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*Maximal Dap needed for differentiation<br>
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<br><br><br>
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=='''''Output'''''==
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It may happen that a germ cell as enough DAP to evolve (typically when it is touched by a DAP diffusion front) but we assume that the contribution is not enough for the cell to divide.
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<br>
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''We use gbview to generate those pictures''
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Finally, we assume then that DAP is produced in somatic cells only and consumed by germ cells. The communication is done by distinguishing in the automaton intra and extra cellular DAP (respectively named DAPi and DAPe).
-
<br><br>
+
 
-
The output is two animated pictures one show the differentiation the other the diffusion of DAPe<br>
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= Model Description =
 +
 
 +
In this we focus on the elaboration of the cellular automaton.
 +
 
 +
== Structure ==
 +
 
 +
As we have previously announced, we design cellular automaton on a square grid. More precisely, in order to avoid boundary effects, we assume that the grid is actually wrapped in such a way the grid topology is a 2D torus. Each cell of the automaton contains a bacterium, either germ or somatic, together with the external DAP concentration. So we represent the different states of the automaton cell by tuple of values <code>{DAPe,DAPi,Type}</code>:
 +
 
 +
* <code>DAPe</code> is the external DAP concentration,
 +
 
 +
* <code>DAPi</code> is the internal DAP concentration in the bacterium,
 +
 
 +
* <code>Type</code> represents if the bacterium is differentiated or not; it can take two values <code>BactG</code> and <code>BactS</code>.
 +
 
 +
== Dynamics ==
 +
 
 +
The following rules specify the local evolution of each cell of the automaton. We distinguished to evolution laws depending on what kind of bacterium is in the cell:
 +
 
 +
*<html><u>In the case of a somatic cell</u></html>: we have to consider the diffusion of <code>DAPe</code> between the considered cell and its neighbors, the export of DAP from the inside to the outside, and finally the production of <code>DAPi</code>. The rule can be presented as follows:
 +
 
 +
  DAPe <- DAPe + (DAPe diffused in the neighborhood) + (DAPi lost by export)
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  DAPi <- DAPi + (DAPi produced) - (DAPi lost by export)
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  Type <- BactS
 +
 
 +
*<html><u>In the case of a germ cell</u></html>: we have to consider the diffusion of <code>DAPe</code> between the considered cell and its neighbors, the import of DAP from the outside to the inside, the consumption of <code>DAPi</code>, and finally the differentiation when DAP concentration reaches a right range of values. The rule can be presented as follows:
 +
 
 +
  DAPe <- DAPe + (DAPe diffused in the neighborhood) - (DAPi gain by import)
 +
  DAPi <- DAPi - (DAPi consumed) + (DAPi gain by import)
 +
  Type <- '''if''' (min_threshold) < DAPi < (max_threshold) '''then''' BactS '''else''' BactG
 +
 
 +
== Parameters ==
 +
 
 +
We consider 8 parameters. They are used with some noise during the evolution to avoid a deterministic behavior.
 +
 
 +
* In <code>BactS</code> cells:
 +
 
 +
:* Dap export rate in somatic bacteria
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 +
:* Dap import rate in somatic bacteria
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 +
:* Dap production rate of somatic bacteria
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 +
* In <code>BactG</code> cells:
 +
 
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:* Dap export rate in germ bacteria
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 +
:* Dap import rate in germ bacteria
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 +
:* Dap consummation rate of germ bacteria
 +
 
 +
:* Minimal threshold for differentiation
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 +
:* Maximal threshold for differentiation
 +
 
 +
== Initial state ==
 +
 
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Our initial state is 30x30 2D toric cellular automaton where all cells are initialized by value <code>{DAPe=0,DAPi=0,Type=BactG}</code> but four <code>{DAPe=0,DAPi=0,Type=BactS}</code> are randomly placed in the grid.
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 +
 
 +
 
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= Output [[Image:MGS-inside.png|50px]]=
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 +
Our implementation was done in [[Paris/mgs|MGS]] and the output was generated by [http://www.sciences.univ-nantes.fr/info/perso/permanents/cohen/SOFTWARE/GBVIEW/index.html GBView].
 +
 
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The output is two animated pictures: the first one shows the differentiation, the other the diffusion of DAPe<br>
<center>[[Image:Paris\Diff_DAP.gif|Dap diffusion]][[Image:Paris\Diffe.gif|Bact differentiation]]</center><br>
<center>[[Image:Paris\Diff_DAP.gif|Dap diffusion]][[Image:Paris\Diffe.gif|Bact differentiation]]</center><br>
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*The first picture show the diffusion of DAP
 
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:We can see a front wave in light blue after that there is a dark blue area in which the systeme is stable the concentration doesn't evolve.
 
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<br>
 
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*The second picture show the differentiation
 
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:Red BactG
 
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:Green BactS
 
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:The differentiation follow the wave front
 
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<br><br>
 
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'''In reality this phenomenon''' does not exist, but this model show that the low concentration of DAP induces differentiation (dark blue) and with high concentration of DAP, the differentiation is inhibited. <br>
 
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We can also note that the population can be stabilized, and the level of DAP remains constant in these areas.
 
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<br><br>
 
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After playing with the parameters, we can deduct 2 important things:
 
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*The inhibition most be strong and effective (we play with the minimal and maximal value of DAP for differentiation)
 
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:if it isn't the case the system collapse all the bactG stay BactG if the inhibition is too strong or switch to BactS if the inhibition is not enough strong.
 
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*The production and diffusion of DAP will be a critical factor
 
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:The DAP has to be produce then he will be exported, it will diffuse in the medium and will be imported
 
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:There is no proof of a special system to import or export DAP, so for each step there is a large amount of DAP lost.
 
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=='''''[[Paris\Sources#Cell auto|Sources]]'''''==
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*The first picture shows the diffusion of DAP: the front wave is figured in light blue; the dark blue area corresponds to stable parts of the system where concentration do not evolve anymore.
 +
 
 +
*The second picture presents the differentiation: red and blue cells are respectively germ and somatic bacteria.
 +
 
 +
= Results =
 +
 
 +
As we can see, the differentiation and DAP diffusion wave fronts are superposed. This simulation is obviously out of reality but the underlying model have been developed in order to consider that low concentration of DAP induces differentiation (cells become green - dark blue), while with high DAP concentration, the differentiation is inhibited. Without this second threshold, all cells would differentiate. But some germ cells remain because they are enough fed to stay over the threshold. This property is of course crucial as only germ cells can reproduce.
 +
 
 +
In the considered model of the system, the inhibition must be strong and effective for not all the cells differentiate. Bad thresholds make the system collapse: a too strong inhibition prevents germ cells to differentiate, and on the opposite, a too weak  inhibition make all them switch to a somatic state.
 +
 
 +
By tuning the constant of diffusion, we have noted that the 3 steps communication process (export, diffusion, import) is of main interest. For a few molecules of DAP imported in germ cells, an important amount of produced DAP has to be produced: there is a lot of lost during the process. So in order to keep a coherent rate of production, a germ cell must be surrounded by a lot of somatic bacteria: the ratio of 1:1 of differentiated and germ cell is not viable, that is why a lot of somatic cells feed isolated germ bacteria as enlighten by the animations.
 +
 
 +
= [[Paris\Sources#Cell auto|Sources]] =

Latest revision as of 21:27, 26 October 2007



In this part of our work, we aim at characterizing the diffusion of the DAP and the effect on the cells differentiation. This study consists in observing by simulation, the diffusion of DAP in a lawn of germ cells with some isolated somatic cells using a cellular automaton.


Contents

Introduction

DAP feeding between somatic and germ cells is based on an indirect communication process: soma cells produce DAP and release it in the environment; DAP molecules freely diffuse outside until they are captured by a germ cell. As the diffusion takes place in the environment, a somatic cell feed first the germ cells that are close to it. Then an well mixed hypothesis as the one used in the our growth of population analysis is hard to assume. We are interesting here in the case where the differentiation of a germ into a soma is DAP dependent. In order to figure out the relation between DAP diffusion and differentiation we propose a simple cellular automaton on square grid. Each cell of the automaton contains a bacterium. We first detail some hypotheses used in this model, then we specify the local behavior rules following by each automaton cell. Finally, the generated simulation is presented.

Hypotheses

The chosen approach consists in observing the DAP diffusion and differentiation frontwaves. In order to focus on these phenomenon, we work on a constant population (no death, no division). So we assume that without DAP in its surrounding, a germ cell does not die but remain in passive state (we can imagine that they are at a stationary phase or between to division cycle). It will seem that DAP wake up bacteria but it's just an artifact due to this assumption.

It may happen that a germ cell as enough DAP to evolve (typically when it is touched by a DAP diffusion front) but we assume that the contribution is not enough for the cell to divide.

Finally, we assume then that DAP is produced in somatic cells only and consumed by germ cells. The communication is done by distinguishing in the automaton intra and extra cellular DAP (respectively named DAPi and DAPe).

Model Description

In this we focus on the elaboration of the cellular automaton.

Structure

As we have previously announced, we design cellular automaton on a square grid. More precisely, in order to avoid boundary effects, we assume that the grid is actually wrapped in such a way the grid topology is a 2D torus. Each cell of the automaton contains a bacterium, either germ or somatic, together with the external DAP concentration. So we represent the different states of the automaton cell by tuple of values {DAPe,DAPi,Type}:

  • DAPe is the external DAP concentration,
  • DAPi is the internal DAP concentration in the bacterium,
  • Type represents if the bacterium is differentiated or not; it can take two values BactG and BactS.

Dynamics

The following rules specify the local evolution of each cell of the automaton. We distinguished to evolution laws depending on what kind of bacterium is in the cell:

  • In the case of a somatic cell: we have to consider the diffusion of DAPe between the considered cell and its neighbors, the export of DAP from the inside to the outside, and finally the production of DAPi. The rule can be presented as follows:
 DAPe <- DAPe + (DAPe diffused in the neighborhood) + (DAPi lost by export)
 DAPi <- DAPi + (DAPi produced) - (DAPi lost by export)
 Type <- BactS
  • In the case of a germ cell: we have to consider the diffusion of DAPe between the considered cell and its neighbors, the import of DAP from the outside to the inside, the consumption of DAPi, and finally the differentiation when DAP concentration reaches a right range of values. The rule can be presented as follows:
 DAPe <- DAPe + (DAPe diffused in the neighborhood) - (DAPi gain by import)
 DAPi <- DAPi - (DAPi consumed) + (DAPi gain by import)
 Type <- if (min_threshold) < DAPi < (max_threshold) then BactS else BactG

Parameters

We consider 8 parameters. They are used with some noise during the evolution to avoid a deterministic behavior.

  • In BactS cells:
  • Dap export rate in somatic bacteria
  • Dap import rate in somatic bacteria
  • Dap production rate of somatic bacteria
  • In BactG cells:
  • Dap export rate in germ bacteria
  • Dap import rate in germ bacteria
  • Dap consummation rate of germ bacteria
  • Minimal threshold for differentiation
  • Maximal threshold for differentiation

Initial state

Our initial state is 30x30 2D toric cellular automaton where all cells are initialized by value {DAPe=0,DAPi=0,Type=BactG} but four {DAPe=0,DAPi=0,Type=BactS} are randomly placed in the grid.


Output MGS-inside.png

Our implementation was done in MGS and the output was generated by [http://www.sciences.univ-nantes.fr/info/perso/permanents/cohen/SOFTWARE/GBVIEW/index.html GBView].

The output is two animated pictures: the first one shows the differentiation, the other the diffusion of DAPe

Dap diffusionBact differentiation

  • The first picture shows the diffusion of DAP: the front wave is figured in light blue; the dark blue area corresponds to stable parts of the system where concentration do not evolve anymore.
  • The second picture presents the differentiation: red and blue cells are respectively germ and somatic bacteria.

Results

As we can see, the differentiation and DAP diffusion wave fronts are superposed. This simulation is obviously out of reality but the underlying model have been developed in order to consider that low concentration of DAP induces differentiation (cells become green - dark blue), while with high DAP concentration, the differentiation is inhibited. Without this second threshold, all cells would differentiate. But some germ cells remain because they are enough fed to stay over the threshold. This property is of course crucial as only germ cells can reproduce.

In the considered model of the system, the inhibition must be strong and effective for not all the cells differentiate. Bad thresholds make the system collapse: a too strong inhibition prevents germ cells to differentiate, and on the opposite, a too weak inhibition make all them switch to a somatic state.

By tuning the constant of diffusion, we have noted that the 3 steps communication process (export, diffusion, import) is of main interest. For a few molecules of DAP imported in germ cells, an important amount of produced DAP has to be produced: there is a lot of lost during the process. So in order to keep a coherent rate of production, a germ cell must be surrounded by a lot of somatic bacteria: the ratio of 1:1 of differentiated and germ cell is not viable, that is why a lot of somatic cells feed isolated germ bacteria as enlighten by the animations.

Sources