Team:Paris Bettencourt/Software
Ferment It Yourself
iGEM Paris-Bettencourt 2O15
- Background
- Design
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Modeling
Introduction
As explained in the modeling page, this program modelizes the cells population evolution with mother cell differentiation and cell division.
We focus here on the stochastic program.Files
The MATLAB code is available in GitHub under the GNU General Public License version 3.0.
Here is a quick explanation of the differents files ie the differents functions.Stochastic algorithm
- \(timeEvolutionStochastic\) : calcul the time evolution.
- \(checkInput\) : check the input and show an error message if the input is not good.
- \(elmPixel\) : find the coordinates of a pixel around an other pixel.
- \(errorProgramm\) : display an error and stop the programm.
- \(freePosition\) : create a list of free pixels around one pixel.
- \(getComputerName\) : get the computer name.
- \(getSizeMat\) : find the matrice size.
- \(imageToMatrix\) : convert an image into a matrix.
- \(initCells\) : initialize the cells.
- \(initialization\) : initialize the program.
- \(initTimeEvent\) : calcul the different time.
- \(initVariables\) : initialize the variables.
- \(isBinary\) : check if a number is 0 or 1.
- \(isPositiveInteger\) : check if a number is a positive integer (1) or not (0).
- \(makeCells\) : make the cells.
- \(randEvent\) : generate the next random event.
- \(randPosition\) : find a free position for a cell.
- \(saveInitialParameters\) : save the initial parameters in a text file.
- \(saveResult\) : save and plot the results.
- \(showAndSaveEventTimeDistribution\) : show and save the event time probability distribution.
- \(showPopulation\) : show the cells matrix.
- \(writeParameters\) : write a text file with the parameters.
- \(launchStochasticProgramm\) : launch the stochastic time evoluation simulation.
- \(k1OptimizationStochastic\) : calcul the number of differentiated cells and vitamin with differents \(k_{1}\) in a stochastic way.
- \(k1OptimizationStochasticAndDeterministic\) : superimpose the deterministic and stochastic models.
Deterministic algorithm
- \(timeEvolutionDeterministic\) : show the time evolution by numerical calculus and equations.
- \(k1OptimizationDeterministic\) : calcul the number of differentiated cells with differents \(k_{1}\) in a deterministic way.
Input
In order to launch a simulation, you must define five variables.- initial cells.
- rate constants.
- fermentation period.
- action.
- folder name.
Cells input
You can choose to generate a random or a predetermined position for the initial cells.
You have two cells types : mother cells and differentiated cells.Random initial position
The input array must contain four integer values in this order.- \(MC_0\) : initial number of mother cells in the medium.
- \(DC_0\) : initial number of differentiated cells in the medium.
- \(sizeMatCell\) : cells box size (in pixels).
- \(sizeMat\) : real box size (in pixels).
Warning : \(sizeMatCell\) must be larger than \(sizeMat\).
In the program, the input variable has the following pattern.
\(input = [MC_0, DC_0, sizeMatCell, sizeMat]\)
Here is an example.
- \(MC_0 = 5 \phantom{t} (cells)\)
- \(DC_0 = 0 \phantom{t} (cells)\)
- \(sizeMatCell = 100 \phantom{t} (pixels)\)
- \(sizeMat = 250 \phantom{t} (pixels)\)
Predetermined initial position
In order to make an easy predetermined initial position input, we wrote a code which understand images.
The input must contain the image path.
It is very easy to design a custom image ie a custom spatial cell distribution. You must follow these four rules (we work only with the image red component)- the image must be square and in jpeg format.
- 255 means no cell.
- 128 means one differentiated cell.
- 0 means one mother cell.
If you want, you can use the following hexadecimal colours codes.- #FFFFFF (white) means no cell.
- #800000 (red) means one differentiated cell.
- #000000 (black) means one mother cell.
Here is an example only with mother cells.
Here is an other example with mother cells (black) and differentiated cells (red).
Rate constants
You have to define seven variables.- \(\mu_{1}\) : mother cell differentiation time mean.
- \(\sigma_{1}\) : mother cell differentiation time standard deviation.
- \(\mu_{2}\) : mother cell doubling time mean.
- \(\sigma_{2}\) : mother cell doubling time standard deviation.
- \(\mu_{3}\) : differentiated cell doubling time mean.
- \(\sigma_{3}\) : differentiated cell doubling time standard deviation.
- \(k_{4}\) : rate constant of the differentiated cell vitamin production.
In the program, the rate constants variable has the following pattern.
\(constantRate = [\mu_{1}, \sigma_{1}, \mu_{2}, \sigma_{2}, \mu_{3}, \sigma_{3}, k_{4}]\)
Here is an example.
- \(\mu_{1} = 1 \phantom{t} (hours)\)
- \(\sigma_{1} = 0.1 \phantom{t} (hours)\)
- \(\mu_{2} = 1.0502 \phantom{t} (hours)\)
- \(\sigma_{2} = 0.1 \phantom{t} (hours)\)
- \(\mu_{3} = 2.1004 \phantom{t} (hours)\)
- \(\sigma_{3} = 0.1 \phantom{t} (hours)\)
- \(k_{4} = 1 \phantom{t} (hours^{-1})\)
Fermentation period
The fermentation period \(t\) is a simple scalar variable.
You can use \(t = 5 \phantom{t} (hours)\) for example.Action
In order to choose what you want to do, you must define three booleans.- \(createFolder\) : create a folder in the disk to save informations.
- \(showAnimation\) : show the cell population animation. Warning : require a lot of computing power.
- \(plotGraph\) : plot the results in graphs.
In the program, the action variable has the following pattern.
\(action = [createFolder, showAnimation, plotGraph\)]
In the following example we want to create a folder and plot the graphs.
- \(createFolder = 1\)
- \(showAnimation = 0\)
- \(plotGraph = 1\)
In the following example we want to show the cell animation.
- \(createFolder = 0\)
- \(showAnimation = 1\)
- \(plotGraph = 0\)
In the following example we want to show the cell animation and save the images in a folder.
With the images you can create gif animations.
- \(createFolder = 1\)
- \(showAnimation = 1\)
- \(plotGraph = 0\)
Folder name
The \(folderName\) variable is a string containing the folder name where results folder are stored in the disk.
You can use \(folderName =\) '\(Results\)' for example.Output
Four types of output are generated.- raw data : all the useful informations.
- folder creation : if chosen in the \(action\) variable, a folder is created.
- graphs : if chosen in the \(action\) variable, graphs are generated.
- animation : if chosen in the \(action\) variable, cell animation is generated.
Raw data
- \(mainTic\) : start of the program.
- \(MC_0\) : initial number of mother cells in the medium.
- \(DC_0\) : initial number of differentiated cells in the medium.
- \(pasDistributionTimeEvent\) : resolution for the graph time event distribution plot (see the \(initVariables\) function).
- \(frameRate\) : animation framerate (see the \(initVariables\) function).
- \(timeShowPopulation\) : simulation time between two animations (see the \(initVariables\) function).
- \(simulationTime\) : fermentation period \(t\).
- \(resultFolderName\) : folder where the results folder are created.
- \(\mu_{1}\) : mother cell differentiation time mean.
- \(\sigma_{1}\) : mother cell differentiation time standard deviation.
- \(\mu_{2}\) : mother cell doubling time mean.
- \(\sigma_{2}\) : mother cell doubling time standard deviation.
- \(\mu_{3}\) : differentiated cell doubling time mean.
- \(\sigma_{3}\) : differentiated cell doubling time standard deviation.
- \(k_{4}\) : rate constant of the differentiated cell vitamin production.
- \(cVitamin\) : vitamin counter.
- \(time\) : main timer containing the simulation time.
- \(createFolder\) : action boolean.
- \(showPopulationBool\) : action boolean.
- \(plotGraph\) : action boolean.
- \(input\) : input array.
- \(cTime1\) : time distribution counter 1 (see the \(randEvent\) function).
- \(cTime2\) : time distribution counter 2 (see the \(randEvent\) function).
- \(cTime3\) : time distribution counter 3 (see the \(randEvent\) function).
- \(counterEvent\) : event counter.
- \(timerShow\) : time animation counter.
- \(sizeMat\) : real box size (in pixels).
- \(nextEvent\) : next event type.
- \(time1Array\) : time distribution array 1 (see the \(initTimeEvent\) function).
- \(time2Array\) : time distribution array 2 (see the \(initTimeEvent\) function).
- \(time3Array\) : time distribution array 3 (see the \(initTimeEvent\) function).
- \(cell\) : structure containing all the cells informations.
- \(sizeMatCell\) : cells box size (in pixels).
- \(timeNextEvent\) : time before the next event.
- \(saveTime\) : array containing the simulation time evolution.
- \(saveNbrMC\) : array containing the mother cells time evolution.
- \(saveNbrDC\) : array containing the differentiated cells time evolution.
- \(saveNbrVitamin\) : array containing the vitamin time evolution.
- \(folderName\) : folder where the results are stored. The pattern is the following : \(resultFolderName/DD-MM-YY\_hh\_mm\_ss\_mss\).
- \(imgType\) : image type (see the \(initilization\) function).
- \(parametersFileName\) : parameters file name where the parameters are saved (see the \(initilization\) function).
- \(parametersDoc\) : file object where the parameters are saved.
- \(maxMC\) : maximum number of mother cells.
- \(maxDC\) : maximum number of differentiated cells.
- \(maxVitamin\) : maximum number of vitamins.
- \(timeSpent\) : computation time (in seconds).
Folder creation
If the \(action\) variable \(createFolder\) is set, the program will save important results in this folder.
- \(parameters.txt\) : text file containing differents simulation parameters and results.
- \(data.mat\) : MATLAB file containing the raw data structure. To load the file, use this formula : \(load('data.mat')\).
Graphs
If the \(action\) variable \(plotGraph\) is set, the program will show the graphs.
Moreover if the \(action\) variable \(createFolder\) is set, the program will save the graphs in the folder.Animation
If the \(action\) variable \(showAnimation\) is set, the program will show the cell animation.
Moreover if the \(action\) variable \(createFolder\) is set, the program will save the images in the folder.Examples
We present here some results obtained with the program. For more details about the model see the modeling page.Time evolution of mother cells, differentiated cells and vitamin
Graphs
As explained in the modeling page the program give these results.
Animation
Here is an example with mother cells (black) and differentiated cells (red).
This image is the cell input.
The result is the following animation after a conversion in a gif file.
The mother cells are in orange and the differentiated cells are in yellow.
Vitamin optimization
This program is designed to maximize the vitamin production. Here are some results.
Deterministic and stochastic vitamin optimization comparison
Here is a comparison between the two models.
Conclusion
Feel free to use and modify this program. The source code is available in GitHub : iGEM Paris Bettencourt 2015 under the GNU General Public License version 3.0. For more informations concerning the model see the modeling page.