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How to code integral part in diff. eqn with 0 to inf limit ?

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Rakesh
Rakesh 2022 年 10 月 15 日
コメント済み: Torsten 2022 年 10 月 16 日
I want to code the above differential equation in matlab. But the only problem I am facing is how to code the integral part. I tried a lot but didn't get success. Please see below my trial code. Many thanks in advance.
function unbounded
clear;
global theta
t0 = 0; t1 = 5;
options=ddeset('MaxStep',0.001,'RelTol',6,'AbsTol',7);
sol = ddesd(@qvnn, @delay, [-0.2 0.5 0.4 -0.4 0 0 0 0 0.5 0.5 0.5 0.5 0 0 0 0 0.1 0.9], [t0, t1], options);
% plot(sol.y(17,:),sol.y(18,:),'r');
plot(sol.y(17,:),'r');
%xlabel('$q_1(t)$','Interpreter','latex');
%ylabel('$q_2(t)$','Interpreter','latex');
% legend('q_1(t)','q_2(t)','Location','northeast')
% plot(sol.x,sol.y(5,:),'g',sol.x,sol.y(6,:),'c',sol.x,sol.y(7,:),'r',sol.x,sol.y(8,:),'b');
function d = delay(t,~)
d = [t-exp(t)./(exp(t)+1),5];
end
function dy = qvnn(t,y,Z)
ylag = Z(:,1);
ylag2 = Z(:,2);
dy = zeros(18,1);
%first system
dy(1)=y(3);
dy(3)=-8*y(3)-(1+1/(y(1).*y(1)+1))*(0.5*y(1)-0.125*tanh(y(1))-0.175*tanh(y(2))-0.1*tanh(ylag(1))-0.15*tanh(ylag(2)))+0.2*y(5)+0.4*y(6);
dy(2)=y(4);
dy(4)=-10.4*y(4)-(1+1/(y(2).*y(2)+1))*(0.5*y(2)+0.4*tanh(y(1))+0.2*tanh(y(1))+0.05*tanh(y(2))+0.0755*tanh(ylag(1))+0.05*tanh(ylag(2)))-0.3*y(7)+0.6*y(8);
% second system
dy(9)=y(10);
dy(10)=-8*y(10)-(1+1/(y(9).*y(9)+1))*(0.5*y(9)-0.125*tanh(y(9))-0.175*tanh(y(11))-0.1*tanh(ylag(9))-0.15*tanh(ylag(11)))+0.2*y(13)+0.4*y(14)-10*y(17);
dy(11)=y(12);
dy(12)=-10.4*y(12)-(1+1/(y(11).*y(11)+1))*(0.5*y(11)+0.4*tanh(y(9))+0.2*tanh(y(9))+0.05*tanh(y(11))+0.0755*tanh(ylag(9))+0.05*tanh(ylag(11)))-0.3*y(15)+0.6*y(16)-12*y(18);
%%%%%%%%%%%%%%%% integral part %%%%%%%
a = y(1);
b = y(2);
c = y(9);
d = y(11);
f1 = @(t, theta)sin(2*theta)./(1+theta^2).*tanh(a(t-theta));
f2 = @(t, theta)sin(2*theta)./(1+theta^2).*tanh(b(t-theta));
f3 = @(t, theta)sin(2*theta)./(1+theta^2).*tanh(c(t-theta));
f4 = @(t, theta)sin(2*theta)./(1+theta^2).*tanh(d(t-theta));
y(5) = integral(f1,0, inf);
y(6) = integral(f2,0, inf);
y(7) = integral(f1,0, inf);
y(8) = integral(f2,0, inf);
y(13) = integral(f3,0, inf);
y(14) = integral(f4,0, inf);
y(15) = integral(f3,0, inf);
y(16) = integral(f4,0, inf);
%%%%%%%%%% we don't know how to define the unbounded intgral part which is give below %%%%%%%%%%%%%%
% y(5)=integration_{0,Inf}*sin(2*theta)./(1+theta^2)*tanh(tdiff(1))*dtheta;
% y(6)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(2)(t-\theta))* d\theta;
% y(7)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(1)(t-\theta))* d\theta;
% y(8)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(2)(t-\theta))* d\theta;
% y(13)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(9)(t-\theta))* d\theta;
% y(14)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(11)(t-\theta))* d\theta;
% y(15)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(9)(t-\theta))* d\theta;
% y(16)= integration_{0,Inf}*sin(2*theta)/(1+theta^2)*tanh(y(11)(t-\theta))* d\theta;
%%%%%%%%%%%%%%%%%%%%%%%%%%% error= y(t)-x(t-\tau) %%%%%%%%%%%%%%%%%
dy(17)=dy(9)-dylag2(1);
dy(18)=dy(11)-dylag2(2);
end
end
  9 件のコメント
7 件の古いコメントを表示
Rakesh
Rakesh 2022 年 10 月 16 日
@Torsten I am searching for such a solver in the File Exchange. Hoping to get the solution.
Torsten
Torsten 2022 年 10 月 16 日
To be honest: I doubt you will find a suitable solver since - additionally to the integral - your equation contains delays for the w_i.
If it were only the integral part, IDSOLVER might have worked:
https://www.sciencedirect.com/science/article/abs/pii/S0010465513003093?via%3Dihub

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