understanding DDE23 function format
Afficher commentaires plus anciens
I look at this example https://www.mathworks.com/help/matlab/math/dde-with-constant-delays.html
DDE23 function has a format of
ddex1de(t,y,Z)
How should one understand Z?
Réponse acceptée
Guru Mohanty
le 4 Mai 2020
I understand you are trying to solve system of differential equation using ‘dde23’. To do this you need to do following steps.
- Define constant delays.
In this system of equation there are two lags i.e. (t-1) and (t-0.2).
lags = [1 0.2];
2. Define Solution History.
It Defines the first solution from which the solver starts iterations.
function s = history(t)
s = ones(3,1);
end
3. Form the equation.
function dydt = ddex1de(t,y,Z)
ylag1 = Z(:,1);
ylag2 = Z(:,2);
dydt = [ylag1(1);
ylag1(1)+ylag2(2);
y(2)];
end
Here In the call to ddex1de,
‘t’ is a scalar indicates the current ‘t’ in the equation
‘y’ is a column vector approximates y(t)
‘Z’ is a column vector approximates y(t – αj) for delay αj= lags(J).
In the following example Solution history is [1;1;1]. So Approximate values of lag ie ‘Z’ will be a matrix of size 3x2.In ‘Z’ Row defines the number of equations and column defines Number of lags.
4. Solve using ‘dde23’.
tspan = [0 5];
sol = dde23(@ddefun, lags, @history, tspan);
2 commentaires
Guru Mohanty
le 4 Mai 2020
As it is a System of 3 Equations, 'y', 'dydt', 'ylag1' 'ylag2' have dimension 3x1. There are two constant Delay present, So The dimention of 'Z' is 3x2.
Plus de réponses (0)
Catégories
En savoir plus sur Logical dans Centre d'aide et File Exchange
Produits
le 1 Mai 2020
le 4 Mai 2020
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
