Team:Colombia/Modeling/Scripting

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Scripting

RALSTONIA DIFFERENTIAL EQUATION SOLUTION

These scripts create the differential equations, find the steady state concetrations and then solve them by a 4th order Runge Kutta:


DIFFERANTIAL EQUATIONS DECLARATIONS

%THIS CODE CREATE ALL THE DIFFERENTIAL EQUATIONS FOR THE SYSTEM FOR %RASTONIA

function y=ecuaDifR(t,v)                        
                                                        %---------Parameters------%
global alfS   %Basal concentration of the sensor phcS
global alfRA   %Basal concnetration of the comple pchA-pchR 
global alfR   %Basal concentration of LuxR
global alfI   %Basal concentration of CI 
global alfCI  %Basal concentration of CI 
global alfHA  %Basal concnetration of HipA7
global alfHB  %Basal concnetration of HipB 
global alfAS   %Basal concnetration of Salycilic acid 
global gammaS   %Degradation of the sensor pchS
global gammaRA   %Degradation of the complex pchR-pchA
global gammaR   %Degradation of LuxR
global gammaI   %Degradation of LuxI 
global gammaCI  %Degradation of CI 
global gammaHA  %Degradation of HipA7
global gammaHB  %Degradation of HipB 
global gammaAS  %Dergradation of Salycilic acid 
global mOHS     %Kinetic constant for the detection of 3-OH-PAME by the sensor pchS (phosphorylation)
global mSFR     %Kinetic constant for the phosphorylation of the complex pchR-pchA by the sensor
global mA       %Kinetic constant for the activation of the promoter by the pchA
global mIR      %Kinetic constant for the formation of the complex LuxILuxR
global mI       %Constant that represent the union of the complex LuxILuxR with the promoter
global mHAHB    %Kinetic constant for the inhibition of HipA7 
global betaI     %Max production of LuxI
global betaCI    %Max production of CI 
global betaHB    %Max peoduction of HipB
global betaHA    %Max production of HipA7 
global betaAS    %Max production of Salicylic acid
global kA       %Constant k of the hill ecuation for the promoter promoted by pchA
global kIR      %Constant k of the hill equiation for the promorer prmoted by the complex luxIluxR
global kCI      %Constant k of the hill equation for the promoter promoted by CI 
global hA      %Hill constant for the promoters promoted by pchA 
global hIR     %Hill constant for the promoter promoted by the complex IR
global hCI     %Hill constant fot the promoter CI 
global eI       %Export factor of LuxI
global jI       %Import factor of LuxI
global deltaI   %Difusion of LuxI outside the cell 
global eAS     %Export of Salicylic acid  
global numcel  %number of cells 

if (t<(10) || ((t)>20))
    
    OH=0;
    
else
    
    OH=15;
    
    
end                  
                    %------ Variables%------
                       
S=v(1); %Cocentration of the sensor pchS the cell
SF=v(2); %Concentration of phosphorylated sensor the cell
RA=v(3);  %Concentration of the comple pchR-pchA
A=v(4);  %Concentratio of the promoter avtivator pchA
Ii=v(5); %Concentration of LuxI inside the cell
Io=v(6); %Concentration of LuI outsied the cell
IR=v(7); %Concentration of the complex LuxI-LuxR 
R=v(8);%Concentration of the protein CI 
CI=v(9);%Concentration of HipA7
HB=v(10);%Concnetratio of HipB
HA=v(11);%Concentration of salicylic acid
AS=v(12); %Concentratio of quitin monomers
                                                 
                                %---Equations---%
             
                                
dS=alfS- gammaS*S - mOHS*OH*S; %Change of the sensor pchS
dSF = mOHS *OH*S - mSFR *SF*RA ;  %Change of phosphorylated sensor
dRA=alfRA - gammaRA*RA - mSFR*SF*RA;%Change of the comple pchR-pchA
dA= mSFR*SF*RA-mA*A; %Change of the activator pchA inside the cell
dIi= alfI+ (betaI*(A^hA))/(kA^hA+(A^hA)) -gammaI*Ii +jI*Io- eI*Ii- mIR*Ii*R; %Change of LuxI inside the cell
dIo= numcel*(eI*Ii-jI*Io)-deltaI*Io; %Change of LuxI outside the cell
dIR= mIR*Ii*R - mI*IR;  %Change of the complex LuxI luxR
dR= alfR-gammaR*R -mIR*Ii*R +(betaI*(A^hA))/(kA^hA+(A^hA)); %Change of LuxR
dCI= alfCI -gammaCI*CI+ (betaCI*(CI^hCI))/(kCI^hCI+(CI^hCI)) +(betaCI*(IR^hIR))/(kIR^hIR+(IR^hIR));%Change of CI
dHB=alfHB-gammaHB*HB+(betaHB*(CI^hCI))/(kCI^hCI+(CI^hCI))+(betaHB*(IR^hIR))/(kIR^hIR+(IR^hIR))-mHAHB*HA^2*HB^2;  %Chanche of HipB 
dHA=alfHA-gammaHA*HA+ (betaHA*(CI^hCI))/(kCI^hCI+(CI^hCI))-mHAHB*HA^2*HB^2; %Change of HipA7
dAS=alfAS-gammaAS*AS +(betaAS*(CI^hCI))/(kCI^hCI+(CI^hCI))-eAS*AS+(betaAS*(IR^hIR))/(kIR^hIR+(IR^hIR));  %Change of Salicylic acid 
y1(1)=dS;
y1(2)=dSF;
y1(3)=dRA;
y1(4)=dA;
y1(5)=dIi;
y1(6)=dIo;
y1(7)=dIR;
y1(8)=dR;
y1(9)=dCI;
y1(10)=dHB;
y1(11)=dHA;
y1(12)=dAS; 
y=y1';         
                                               
end



RUNGE KUTTA

%FILE THAT SOLVES THE DIFFERENTIAL EQUATION AND GRAPHS THEM 
alfS=0.9;      %Basal concentration of the sensor pchS
alfRA=0.9;      %Basal concnetration of the complez pchA-pchR
alfR=0.6;      %Basal concentration of LuxR
alfI=0.4;      %Basal concentration of LuxI
alfCI=0.5;     %Basal concentration of CI
alfHA=1;     %Basal concnetration of HipA7
alfHB=0.4;     %Basal concnetration of HipB
alfAS=0.4;    %Basal concnetration of Salycilic acid
gammaS=1;    %Degradation of Chitinase inside the cell
gammaRA=1;    %Degradation of chitoporin
gammaR=1;    %Degradation of LuxR
gammaI=1;    %Degradation of LuxI
gammaCI=1;   %Degradation of CI
gammaHA=1;   %Degradation of HipA7
gammaHB=4;   %Degradation of HipB
gammaAS=1;   %Dergradation of Salycilic acid 
mOHS=4;      %Kinetic constant for the formation of the phoshorilation of the sensor
mSFR=2.6;     %Kinetic constant of the reaction of the phosphorilarion of the comple R
mA=3.5;     %Kinetic constant for the activation by A 
mIR=3;      %Kinetic constant for the formation of the complex LuxILuxR
mI=3;       %Constant that represent the union of the complex LuxILuxR with the promoter
mHAHB=12;    %Kinetic constant for the inhibition of HipA7
betaI=10;    %Max production of LuxI
betaCI=9.96;   %Max production of CI
betaHB=9.95;   %Max production of HipB
betaHA=10;   %Max production of HipA7
betaAS=11.2;   %Max production of Salicylic acid
kA=0.1;      %Constant k of the hill ecuation for the promoter promoted by S
kIR=0.39;     %Constant k of the hill equiation for the promorer prmoted by the complex luxIluxR
kCI=0.055;     %Cosntant k of the hill equation for the promoter promoted by CI
hA=1.2;     %Hill constant for the promoters promoted by S
hIR=3.4;    %Hill constant for the promoter promoted by the complex IR
hCI=2.3;    %Hill constant fot the promoter CI
eI=0.5;    %Export factor of LuxI
jI=0.8;    %Import factor of LuxI
deltaI=0.2;%Difusion of LuxI outside the cell 
eAS=0.8;
numcel=1;   %number of cells
%----%
h=100; %Tiempo maximo

m=0.01; %Longitud de paso [s] 

t=0:m:h; %Vector tiempo

xi=[1,1,1,1,1,1,1,1,1,1,1,1];

y=fsolve(@CondInR,xi);
conInd=y;

l=(0:m:h)'; %Vector de tiempo

x=zeros(length(l),length(conInd)); %Matriz de variables, en las columnas varia
%la variable y en las filas varia el tiempo

OH=zeros(1,length(l));

x(1,:)=conInd;

for k=1:length(l)-1
    
    xk=x(k,:); %Captura de la ultima posicion de la matirz, es decir, los
   %valores actuales de las variables
   
   k1=ecuaDifR(l(k),xk); %Primera pendiente del metodo de RK4
   k2=ecuaDifR(l(k)+m/2,xk+(m/2*k1)'); %Segunda pendiente del metodo de RK4
   k3=ecuaDifR(l(k)+m/2,xk+(m/2*k2)'); %Tercera pendiente del metodo de RK4
   k4=ecuaDifR(l(k)+m,xk+(m*k3)'); %Cuarta pendiente del metodo de RK4
   
   xk1=xk+m/6*(k1+2*k2+2*k3+k4)'; %Calculo de nuevos valores para las
   %variables
   
   %xk1=xk+m*ecuaDif(l(k),xk)'; %Method of Newton
   
   xk2=zeros(1,length(xk1));
   
   
   for p=1:length(xk1)
       
       if(xk1(p)<0.00000001)
           
           xk2(p)=0;
       else
           
           xk2(p)=xk1(p);
       end
       
   end
   
   
   x(k+1,:)=xk2; %Actualizacion del nuevo vector de variables en la matriz
   
    
   
end
for j=1:length(l)
    
    if (l(j)<(10) || l(j)>(20))
       
       OH(j)=0;
       
   else
       
       OH(j)=15;
       
       
   end
   
   
end
S=x(:,1);
SF=x(:,2);
RA=x(:,3);
A=x(:,4);
Ii=x(:,5);
Io=x(:,6);
IR=x(:,7);
R=x(:,8);
CI=x(:,9);
HB=x(:,10);
HA=x(:,11);
AS=x(:,12); 
figure(1) 
plot(l,S,l,SF)
legend('Sensor (pchS)',' Phosporilated pchS')
xlabel('Time')
ylabel('Concetratio (micromolar)')
title('Response of Sensor pchS')
figure(5)
plot(l,RA,l,A)
legend('Complex pchR-pchA','Activator pchA')
xlabel('Time')
ylabel('Concetration (micromolar)')
title('Activator response')
figure(2)
plot (l,R,l,Ii,l,Io,l,IR)
legend('LuxR','LuxI nside the cell','LuxI outside the cell','Complex(Lux-LuxR)')
xlabel('Time')
ylabel('Concetration (micromolar)')
title('LuxI-LuxR system response')
figure(3) 
plot (l,HA,l,HB) 
legend('Toxin HipA7','Antitoxin HipB')
xlabel('Time')
ylabel('Concetration (micromolar)')
title('Toxin-Antitoxin module')
figure(4) 
plot (l,OH,l,AS,l,CI) 
legend('3-OH-PAME','Salicylic acid','CI')
xlabel('Time')
ylabel('Concetration (micromolar)')
title('CI and Salicylic Acid response')

RUST DIFFERENTIAL EQUATION SOLUTION