estimation of parameters by using lsqnonlin for system of differential equations
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time = data(:,1);
A_data= data(:,2);
beta0 = 0.5;
alpha0 = 0.004;
gamma0 = 0.1;
upsilon0 = 0.13;
epsilon0= 0.07;
lamda0= 0.1;
sigma0= 0.07;
kappa0= 0.03;
nu0 = 0.0001;
xi0 = 0.0002;
lb =[0,0,0,0,0,0,0,0,0,0]; ub = [1,1,1,1,1,1,1,1,1,1];
B0 = [beta0; alpha0; gamma0; upsilon0; epsilon0; lamda0; sigma0; kappa0; nu0; xi0 ];
options = optimoptions(@lsqnonlin,'Algorithm','trust-region-reflective');
[B,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqnonlin(@Kinetics,B0,time,A_data,lb,ub,options );
disp(B)
function Av = Kinetics(B,time);
plot(time,A_data,time,Av)
function A = Kinetics(B, t)
x0 = [1217378052,100,3,2,1,1,1,1];
[T,Av] = ode45(@DifEq, t, x0);
function dA = DifEq(t, x)
N = 1390000000;
pi = 70000;
zeta = 0.1;
eta = 0.2;
theta = 0.3;
iota = 0.3;
delta = 0.1;
rho = 0.5;
mu = 0.0000425;
beta = B(1);
alpha =B(2);
gamma = B(3);
upsilon =B(4);
epsilon = B(5);
lamda = B(6);
sigma = B(7);
kappa = B(8);
nu = B(9);
xi = B(10);
xdot = zeros(8,1);
xdot(1) = pi -beta*(zeta*x(3)+eta*x(4)+theta*x(5)+iota*x(6))*(x(1)/N) -mu*x(1);
xdot(2) = beta*(zeta*x(3)+eta*x(4)+theta*x(5)+iota*x(6))*(x(1)/N) -(delta+mu)*x(2);
xdot(3) = rho*delta*x(2)-(lamda+gamma+nu+mu)*x(3);
xdot(4) = (1-rho)*delta*x(2)-(sigma+kappa+mu)*x(4);
xdot(5) = lamda*x(3) + sigma*x(4)-(alpha+upsilon+mu)*x(5);
xdot(6) = alpha*x(6) + kappa*x(4)- (epsilon+xi+mu)*x(6);
xdot(7) = gamma*x(3) + upsilon*x(5) + epsilon*x(6);
xdot(8) = nu*x(3) + xi*x(6);
dA = xdot;
end
A = Av(:,1);
end
i got an error;
Error using lsqnonlin (line 190)
Invalid datatype. Options argument must be created with OPTIMOPTIONS.
Error in error_14bmodel (line 19)
[B,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqnonlin(@Kinetics,B0,time,A_data,lb,ub,options );
i am fresher of matlab .i requesting you sir please help anyone how to resolve this error
if possible please refer some covid 19 or malaria,dengue hepities b models sir
thank you sir
Antworten (4)
Torsten
am 2 Apr. 2022
[B,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqnonlin(@Kinetics,B0,time,A_data,lb,ub,options );
This is not the correct call to lsqnonlin, but to lsqcurvefit.
3 Kommentare
Torsten
am 2 Apr. 2022
You modify this by calling lsqcurvefit instead of lsqnonlin:
[B,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqcurvefit(@Kinetics,B0,time,A_data,lb,ub,options );
Star Strider
am 2 Apr. 2022
I recognise my code.
It should have the correct lsqcurvefit call, so all you need to do is substitute your differnetial equations and data into it.
An updated version of that code is:
t=[0.1
0.2
0.4
0.6
0.8
1
1.5
2
3
4
5
6];
c=[0.902 0.06997 0.02463 0.00218
0.8072 0.1353 0.0482 0.008192
0.6757 0.2123 0.0864 0.0289
0.5569 0.2789 0.1063 0.06233
0.4297 0.3292 0.1476 0.09756
0.3774 0.3457 0.1485 0.1255
0.2149 0.3486 0.1821 0.2526
0.141 0.3254 0.194 0.3401
0.04921 0.2445 0.1742 0.5277
0.0178 0.1728 0.1732 0.6323
0.006431 0.1091 0.1137 0.7702
0.002595 0.08301 0.08224 0.835];
theta0=rand(6,1);
[theta,Rsdnrm,Rsd,ExFlg,OptmInfo,Lmda,Jmat]=lsqcurvefit(@kinetics,theta0,t,c,zeros(size(theta0)));
fprintf(1,'\tRate Constants:\n')
for k1 = 1:length(theta)
fprintf(1, '\t\tTheta(%d) = %8.5f\n', k1, theta(k1))
end
tv = linspace(min(t), max(t));
Cfit = kinetics(theta, tv);
figure
hd = plot(t, c, 'p');
for k1 = 1:size(c,2)
CV(k1,:) = hd(k1).Color;
hd(k1).MarkerFaceColor = CV(k1,:);
end
hold on
hlp = plot(tv, Cfit);
for k1 = 1:size(c,2)
hlp(k1).Color = CV(k1,:);
end
hold off
grid
xlabel('Time')
ylabel('Concentration')
legend(hlp, compose('C_%d',1:size(c,2)), 'Location','N')
function C=kinetics(theta,t)
c0=[1;0;0;0];
[T,Cv]=ode45(@DifEq,t,c0);
%
function dC=DifEq(t,c)
dcdt=zeros(4,1);
dcdt(1)=-theta(1).*c(1)-theta(2).*c(1);
dcdt(2)= theta(1).*c(1)+theta(4).*c(3)-theta(3).*c(2)-theta(5).*c(2);
dcdt(3)= theta(2).*c(1)+theta(3).*c(2)-theta(4).*c(3)+theta(6).*c(4);
dcdt(4)= theta(5).*c(2)-theta(6).*c(4);
dC=dcdt;
end
C=Cv;
end
.
37 Kommentare
Torsten
am 7 Apr. 2022
Why do you plot in "kinetics" and not in your script when lsqnonlin has finished ?
After you got the parameters from lsqnonlin, you can call "kinetics" to get Cv for your plot:
c_data= [503,502,575,513,484,376,405,406,339,490,444,397,341,397,341,356,387,359,346];
time = [1 2 3 4 5 7 9 11 13 15 17 21 25 30 40 50 60];
beta0 = 0.5;
alpha0 = 0.004;
gamma0 = 0.1;
upsilon0 = 0.13;
epsilon0= 0.07;
lamda0= 0.1;
sigma0= 0.07;
kappa0= 0.03;
nu0 = 0.0001;
xi0 = 0.0002;
lb =[0,0,0,0,0,0,0,0,0,0]; ub = [1,1,1,1,1,1,1,1,1,1];
p0 = [beta0; alpha0; gamma0; upsilon0; epsilon0; lamda0; sigma0; kappa0; nu0; xi0 ];
options = optimoptions(@lsqnonlin,'Algorithm','trust-region-reflective');
[p,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqnonlin(@(p) kinetics(p,time,c_data),p0,lb,ub,options );
c_data_minus_Cv=kinetics(p,time,c_data);
Cv = c_data - c_data_minus_Cv;
plot(time,c_data, time,Cv)
Torsten
am 13 Apr. 2022
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time = data(:,1);
c_data= data(:,2);
beta0 = 0.5;
alpha0 = 0.004;
gamma0 = 0.1;
upsilon0 = 0.13;
epsilon0= 0.07;
lamda0= 0.1;
sigma0= 0.07;
kappa0= 0.03;
nu0 = 0.0001;
xi0 = 0.0002;
lb =[0,0,0,0,0,0,0,0,0,0]; ub = [1,1,1,1,1,1,1,1,1,1];
p0 = [beta0; alpha0; gamma0; upsilon0; epsilon0; lamda0; sigma0; kappa0; nu0; xi0 ];
options = optimoptions(@lsqnonlin,'Algorithm','trust-region-reflective');
[p,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqnonlin(@(p) immanuel(p,time,c_data),p0,lb,ub,options );
disp(p)
Cdata_minus_Cv =immanuel(p,time,c_data);
Cv = c_data-Cdata_minus_Cv;
plot(time,[c_data,Cv])
function C=immanuel(p,time,c_data)
c0 = [1217378052,100,10,5,3,3,1,1];
[T,Cv]=ode45(@DifEq,time,c0);
function dC=DifEq(time,c)
N = 1390000000;
pi = 150;
zeta = 0.1;
eta = 0.2;
theta = 0.3;
iota = 0.3;
delta = 0.1;
rho = 0.5;
mu = 0.0000425;
beta = p(1);
alpha =p(2);
gamma = p(3);
upsilon =p(4);
epsilon = p(5);
lamda = p(6);
sigma = p(7);
kappa = p(8);
nu = p(9);
xi = p(10);
dcdt = zeros(8,1);
dcdt(1) = pi -beta*(zeta*c(3)+eta*c(4)+theta*c(5)+iota*c(6))*(c(1)/N) -mu*c(1);
dcdt(2) = beta*(zeta*c(3)+eta*c(4)+theta*c(5)+iota*c(6))*(c(1)/N) -(delta+mu)*c(2);
dcdt(3) = rho*delta*c(2)-(lamda+gamma+nu+mu)*c(3);
dcdt(4) = (1-rho)*delta*c(2)-(sigma+kappa+mu)*c(4);
dcdt(5) = lamda*c(3) + sigma*c(4)-(alpha+upsilon+mu)*c(5);
dcdt(6) = alpha*c(6) + kappa*c(4)- (epsilon+xi+mu)*c(6);
dcdt(7) = gamma*c(3) + upsilon*c(5) + epsilon*c(6);
dcdt(8) = nu*c(3) + xi*c(6);
dC = dcdt;
end
C=c_data-Cv(:,2);
end
15 Kommentare
Pavl M.
am 20 Nov. 2024 um 18:42
Bearbeitet: Pavl M.
am 20 Nov. 2024 um 19:50
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Where is original
E =;
Ia = ;
Is = ;
Q = ;
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clc
clear all
close all
data = [ 1 25
2 75
3 227
4 296
5 258
6 236
7 192
8 126
9 71
10 28
11 11
12 7];
time = data(1:12,1);
infected= data(1:12,2);
beta0 = 1;
lamdaa0= 0.019;
lamdas0= 0.0715;
etas0 = 0.03;
etaq0 = 0.04;
gammaa0 = 0.2;
gammaq0 = 0.13;
gammah0 = 0.07;
mua0 = 0.0001;
muh0 = 0.0002;
lb =[0,0,0,0,0,0,0,0,0,0];
ub = [1,1,1,1,1,1,1,1,1,1];
B0 = [beta0; lamdaa0; lamdas0; etas0; etaq0; gammaa0; gammaq0; gammah0; mua0; muh0 ];
options=optimset('MaxFunEvals', 1100, 'MaxIter', 1100, 'TolFun', 0.00001, 'TolX',0.00001,'Display','on');
[B,resnorm,RESIDUAL,exitflag,OUTPUT,LAMBDA,Jacobian] = lsqcurvefit(@diff1,B0,time,infected,lb,ub,options);
disp(B)
OUTPUT
C = RESIDUAL
plot(time,infected,time,C)
function C = diff1(B,time)
x0 = [1217378052,120,3,2,1,1,0];
[t,Cv] = ode45(@DifEq, time, x0);
function dC = DifEq(t, x)
N = 1390000000;
pi = 700 ;
zetaa = 0.1;
zetas = 0.2;
zetaq = 0.3;
zetah = 0.3;
omega = 0.2;
theta = 0.5;
mu = 0.0000425;
beta = B(1);
lamdaa= B(2);
lamdas = B(3);
etas = B(4);
etaq = B(5);
gammaa = B(6);
gammaq = B(7);
gammah = B(8);
mua = B(9);
muh = B(10);
%ToDo: update the parameters
E =0.521749;
Ia = 1;
Is = 1;
Q = 1;
xdot = zeros(7,1);
xdot(1) = pi -beta*(zetaa*x(3) +zetas*x(4) +zetaq*x(5)+zetah*x(6))*(x(1)/N) -mu*x(1);
xdot(2) = beta*(zetaa*x(3) +zetas*x(4) +zetaq*x(5)+zetah*x(6))*(x(1)/N) -(omega+mu)*x(2);
xdot(3) = theta*omega*x(2)-(lamdaa+gammaa+mua+mu)*x(3);
xdot(4) = (1-theta)*omega*E-(lamdas+etas+mu)*x(4);
xdot(5) = lamdaa*Ia+lamdas*Is-(etaq+gammaq+mu)*x(5);
xdot(6) = etas*Is+etaq*Q- (gammah+muh+mu)*x(6);
xdot(7) = gammaa*x(4) + gammaq*x(5) + gammah*x(6);
dC = xdot;
end
C = Cv(:,2);
end
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