The mathematics behind modelling

2 Ansichten (letzte 30 Tage)
Muse Riveria
Muse Riveria am 29 Dez. 2015
Beantwortet: MOUSSA DOUMBIA am 6 Jun. 2016
This is my first time using MATLAB and despite reading up on tutorials I am still confused in regards to how to utilise MATLAB. I am trying to simulate a SEIR model, which consists of a system of differential equations, for the spread of dengue fever in MATLAB with the following equations and parameters:
Thank you!!!
  2 Kommentare
John D'Errico
John D'Errico am 29 Dez. 2015
Please stop posting the identical question every hour just because you are in a hurry. I've now deleted most of your replicate questions.
Walter Roberson
Walter Roberson am 29 Dez. 2015
There was a Mathworks server problem this morning that prevented people from telling that their question had been posted.

Melden Sie sich an, um zu kommentieren.

Melden Sie sich an, um diese Frage zu beantworten.

Akzeptierte Antwort

Josh Meyer
Josh Meyer am 31 Dez. 2015
You have a system of 7 coupled ODEs. You will need to code the equations into a function, define the initial conditions and interval for integration, then use an ODE solver such as ODE45 to solve the equations numerically. I got you started on your function, but you'll need to fill in the gaps and double check it:
function dSdt = denguefeverODE(t,S)
% Define parameters
Nh =
Nm =
uh =
um =
Pmh =
Phm =
beta =
nu_h =
epsilon_m =
tau_h =
f =
% Define the equations. Each element in the output contains the answer for
% one equation, so there are 7 components. For ex. S(1) is Sh while dSdt(1)
% is dSh/dt, and S(7) is Im while dSdt(7) is dIm/dt.
dSdt = zeros(7,1);
dSdt(1) = uh*Nh - (beta*Pmh*(S(7)/Nh)+uh)*S(1);
dSdt(2) = beta*Pmh*(S(7)/Nh)*S(1) - (tau_h+uh)*S(2);
.
.
.
dSdt(7) = epsilon_m*S(6) - um*S(7);
Once you are ready to solve, the solver syntax is
tspan = [t0 tf]; % Change to initial and final times
y0 = [a b c d e f g]; % Need 7 initial conditions, 1 for each variable
[t,y] = ode45(@denguefeverODE, tspan, y0)
Then you can see all of the solution components with
plot(t,y)
More information here: http://www.mathworks.com/help/matlab/ordinary-differential-equations.html
  6 Kommentare
4 ältere Kommentare anzeigen
Walter Roberson
Walter Roberson am 7 Jan. 2016
We need your updated code including the code for denguefeverODE, and you should also post the complete error message including the traceback showing where the error is occurring.
Muse Riveria
Muse Riveria am 7 Jan. 2016
Bearbeitet: Muse Riveria am 16 Mär. 2016
>> denguefeverODE(t, S)
Undefined function or variable 't'.

Melden Sie sich an, um zu kommentieren.

Weitere Antworten (2)

Torsten
Torsten am 7 Jan. 2016
function main
to = 0;
tf = 100;
tspan = [to tf];
y0 = [5535002 50 50 0 0 0 0 ];
[t,S] = ode45(@denguefeverODE, tspan, y0);
plot(t,S)
title('Human Population Without Control')
xlabel('Time')
ylabel('Susceptible, Exposed, Infected, Recovered')
legend('Susceptible', 'Exposed', 'Infected', 'Recovered')
function dSdt = denguefeverODE(t,S)
Nh = 5535002;
Nm = 33210012;
uh = 0.0045;
um = 0.02941;
Pmh = 0.375;
Phm = 0.750;
beta = 1;
nu_h = 0.1666;
epsilon_m = 0.1;
tau_h = 0.1176;
f = 6;
dSdt = zeros(7,1);
dSdt(1) = uh*Nh - (beta*Pmh*(S(7)/Nh)+uh)*S(1);
dSdt(2) = beta*Pmh*(S(7)/Nh)*S(1) - (tau_h+uh)*S(2);
dSdt(3) = tau_h*S(2)-(nu_h+uh)*S(3);
dSdt(4) = nu_h*S(3)-uh*S(4);
dSdt(5) = um*Nm - (beta*Phm*(S(3)/Nh)+um)*S(5);
dSdt(6) = beta*Phm*(S(3)/Nh)*S(5);
dSdt(7) = epsilon_m*S(6) - um*S(7);
Best wishes
Torsten.
  7 Kommentare
5 ältere Kommentare anzeigen
Muse Riveria
Muse Riveria am 9 Jan. 2016
How to modify the equation, the article was used for reference as the data isn't completely applicable to the geographical location that used for this differential system. Would it be a simple task, or would it require the formation of more complicated subsequent equations?
Star Strider
Star Strider am 10 Jan. 2016
I doubt the DEs would change, since the epidemiology would be essentially the same, but the parameters likely would. (Islands in the Caribbean might be similar enough to not require any significant changes.) If you’re using them for a more northerly latitude in response to global warming, there are several changes you would have to consider. The human epidemiology would be the same, but you might have to consult with an entomologist with a particular interest in Aedes aegypti to determine what would have to change about the vectors.

Melden Sie sich an, um zu kommentieren.

MOUSSA DOUMBIA
MOUSSA DOUMBIA am 6 Jun. 2016
Can anybody provide me a sample of an optimal control problem with 3 different control functions?

Kategorien

Mehr zu Ordinary Differential Equations finden Sie in Help Center und File Exchange

Tags

Produkte

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by