Nonlinear least square minimization

5 Ansichten (letzte 30 Tage)
Manish
Manish am 20 Apr. 2011
I want to perform a nonlinear least square minimization of the form
Minimize(Sum((Y - F (X ; a, b, c))^2))
Where Y is a vector of response variable; X is a 5 element vector of parameter and a, b and c are vectors of input data. F has the following form:
F = X(5)* Scalar1.* Scalar2.* c;
Scalar 1 is defined as follows.
if X(2)<a<X(1)
Scalar1=((a-X(2))/((X(1)-X(2));
elseif a<=X(2)
Scalar1=0;
elseif a>=X(1)
Scalar1=1;
else
end;
The Scalar2 has a similar definition
if X(4)<b<X(3)
Scalar2 = ((-1)/(X(3)-X(4))).*(b-X(4))+1;
elseif b>=X(3)
Scalar2=0;
elseif b<=X(4)
Scalar2=1;
else
end;
As you can see, I have a function F whose very definition depends on the optimized parameters.
Can someone provide me any lead about where to look for any guidance to solve a problem like this. Any specific keyword/phrase that will help me Google search relevant books, articles will be of great help.

Melden Sie sich an, um diese Frage zu beantworten.

Akzeptierte Antwort

Steve Grikschat
Steve Grikschat am 20 Apr. 2011
Your answer looks ok. lsqnonlin is a good choice. You could also look at lsqcurvefit:
http://www.mathworks.com/help/toolbox/optim/ug/lsqcurvefit.html
which handles the the responses (Y) and fixed parameters (a,b,c - lsqcurvefit calls this X) automatically. The results would be the same (assuming you've set up lsqnonlin properly) since lsqcurvefit uses the same algorithms as lsqnonlin.
I can't be sure, but there could be problems with the non-smoothness of your function (the piecewise definition). If it works though, that's good.
  1 Kommentar
Manish
Manish am 20 Apr. 2011
Thanks a lot for your response. I have nonoverlapping bounds on different parameters, so i guess non-smoothness is not a problem.

Melden Sie sich an, um zu kommentieren.

Weitere Antworten (1)

Manish
Manish am 20 Apr. 2011
This is how I am defining my objective function
function F = myObjective(X, a, b, c, Y)
index1=a>=X(1);
index2=a<=X(2);
Scalar1=(a-X(2))./(X(1)-X(2));
Scalar1(index1)=1;
Scalar1(index2)=0;
index1=b<=X(4);
index2=b>=X(3);
Scalar2=(X(4)-b)./(X(3)-X(4));
Scalar2(index1)=1;
Scalar2(index2)=0;
F = Y-X(5).* Scalar1.*Scalar2.*c;
I then call 'F' with lsqnonlin.
It gives reasonable answers.
Can someone comment if this is correct.

Kategorien

Mehr zu Nonlinear Optimization 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