Matlab limitation in fsolve using function input
Show older comments
Hello,
I tried to loop for time value (T) inside my fsolve, but fsolve is pretty unforgiving.
The time loop does not seem working.
When I plot, it gives the same values (h=x(1) and theta=x(2) does not change over time which should change)!
Please see the the script that uses for loop for time (T). T is input for fsolve. :
x0 = [.1, .1];
options = optimoptions('fsolve','Display','iter');
dt=0.01;
Nt=1/dt+1;
Tarray = [0:dt:1];
T = 0;
for nt=1:Nt
[x,fval] = fsolve(@torder1,x0,options,T)
T=T+dt;
h(nt)=x(1);
theta(nt) = x(2);
plot(Tarray,h,'*')
hold on
plot(Tarray,theta,'+')
end
and the function for fsolve:
function F=torder1(x,T)
x_1=[0:0.01:1];
b=0.6;
%$ sol(1) = h; sol(2) =theta;
clear x_1;
syms x_1 h theta kappa
f_1(x_1,h,theta,kappa) = 1/2*(1-( (h+(1-b)*theta)^2/(h+(x_1-b)*theta-kappa*x_1*(1-x_1))^2 ));
f_2(x_1,h,theta,kappa) = (x_1-b)/2*( 1-( (h+(1-b)*theta)^2/(h+(x_1-b)*theta-kappa*x_1*(1-x_1))^2 ));
kappa =1;
f_11 = 1-( (h+(x_1-b)*theta)^2/(h+(x_1-b)*theta-1*x_1*(1-x_1))^2 );
f_21 = (x_1-b)/2*( 1-( (h+(1-b)*theta)^2/(h+(x_1-b)*theta-x_1*(1-x_1))^2 ));
fint_1 = int(f_11, x_1);
fint_2 = int(f_21, x_1);
x_1=1;
upper_1=subs(fint_1);
upper_2=subs(fint_2);
clear x_1;
x_1=0;
lower_1=subs(fint_1);
lower_2=subs(fint_2);
clear x_1;
integral_result_1old=upper_1-lower_1;
integral_result_2old=upper_2-lower_2;
h0 = kappa *b*(1-b);
theta0 = kappa*(1-2*b);
integral_result_1 = subs(integral_result_1old, {h, theta}, {x(1), x(2)});
integral_result_2 = subs(integral_result_2old, {h, theta}, {x(1), x(2)});
F = [double(x(1) - integral_result_1*T^2 -h0);
double(x(2) - integral_result_2*T^2 - theta0)];
Accepted Answer
Walter Roberson
on 22 Aug 2016
Edited: Walter Roberson
on 22 Aug 2016
fsolve() is for real values, but solutions to your equations are strictly complex, except at T = 0.
You might be getting false results from fsolve(), with it either giving up or finding something that appears to come out within constraints.
For example, if you
fsolve(@(x) x^2+1, rand)
then you will get a small negative real-valued answer that MATLAB finds to be within the tolerances, when the right answer should be something close to sqrt(-1)
11 Comments
Meva
on 23 Aug 2016
Torsten
on 23 Aug 2016
Solve for real and imaginary part of your solution separately.
E.g. if you want to solve
z^2+1=0,
solve
real(z^2+1) = x^2-y^2+1 = 0
imag(z^2+1) = 2*x*y = 0
for
z = x+1I*y
Best wishes
Torsten.
Meva
on 23 Aug 2016
Torsten
on 23 Aug 2016
No, do it in FSOLVE the way I showed you above.
Best wishes
Torsten.
Meva
on 23 Aug 2016
Walter Roberson
on 23 Aug 2016
You do not need to separate the real and imaginary parts. You can probably use vpasolve()
X = sym('x', [1,2]);
T = 1/100;
F = torder1(X,T);
sols = vpasolve(F, X);
sols.x1
sols.x2
Note: this will find at most one solution per vpasolve, and the solutions for adjacent T values will not necessarily be "close" to each other. For example if the function is more or less symmetric around 0 in one of the variables, then you might get either root for any one fsolve().
Walter Roberson
on 27 Aug 2016
I sleep. I have drive failures. I have network failures. I have appointments.
Meva
on 31 Aug 2016
More Answers (1)
Alan Weiss
on 22 Aug 2016
I think that you need to replace your line
[x,fval] = fsolve(@torder1,x0,options,T)
with
[x,fval] = fsolve(@(x)torder1(x,T),x0,options)
Alan Weiss
MATLAB mathematical toolbox documentation
3 Comments
Meva
on 22 Aug 2016
John D'Errico
on 22 Aug 2016
Edited: John D'Errico
on 22 Aug 2016
But that is not what Alan suggested. There is a difference between these lines:
[x,fval] = fsolve(@torder1(x,T),x0,options)
[x,fval] = fsolve(@(x)torder1(x,T),x0,options)
Alan suggested the second, but you then tried the first.
Meva
on 22 Aug 2016
Categories
Find more on Programming in Help Center and File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
