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I'm trying to do some fitting with lsqcurvefit. I have a function like that:

function F = cdf_3p_model(a,data)
F=1-((1-a(5)-a(6)).*(exp(-abs(data)./a(1)))+((1-a(4)-a(6)).*(exp(-abs(data)./a(2))))+((1-a(4)-a(5)).*(exp(-abs(data)./a(3)))));

and

function [a residual] = cdf_fit_3p(x,y)
a0 = [10 1 0.1 0.3 0.3 0.3];
lb = [0 0 0 0 0 0];
ub = [];
curvefitoptions = optimset('Display','final','MaxFunEvals',100000,'MaxIter',50000);
[a, residual] = fmincon(@cdf_3p_model,a0,x,y,lb,ub,curvefitoptions);
end

I set the initial parameters, ub, lb but how do I also declare that:

a(1) > a(2) > a(3)
a(5) + a(6) +a(7) = 1
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3 Answers 3

up vote 2 down vote accepted

I think you have better chance using one of the minimization routines such as fmincon which allows you to specify constraints you might otherwise be unable to do. You can easily incorporate least-squares by taking the L2-norm of the difference between model and data

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Thanks a lot for your answer. It sounds quite easy, but I've just started with matlab and to be honest have no idea how to " incorporate least-squares by taking the L2-norm of the difference between model and data" :) could you please give some more hints? –  Art Nov 24 '11 at 6:01
    
maybe I was too technical. Say your data's real values is found in F in vector format, and the model approximation via fitting is Fm. The purpose of least squares is to minimize the distance (specifically "euclidean") between F and Fm. See Euclidean norm courtesy of wikipedia. So ultimately if you return the norm to fmincon, it will try to minimize it, thus performing your LS-approximation –  Rasman Nov 24 '11 at 16:10
    
as an extra hint regarding the constraints: function [c,ceq] = curvefitoptions(x). Set c = [x(2) -x(1); x(3) - x(2)] and ceq = x(5) + x(6) +x(7) - 1 –  Rasman Nov 24 '11 at 16:17

Normally I would say, "make clauses in your function that gives really terrible 'scores' when those conditions are not met." However, your conditions make the range of allowable parameters such a tiny, tiny subset of the range of possible numbers that I think you would cause lsqcurvefit to never converge if you do that. I would say lsqcurvefit is not the right solution for you.

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thanks for your opinion. So, what might be the better solution for me (who is not very fluid on math and matlab)? :) thanks! –  Art Nov 24 '11 at 5:54

You will have to calculate the parameters you "want" from a set of parameters that's more usable to MatLab.

For example, you can rewrite

a(1) > a(2) > a(3)
a(5) + a(6) + a(7) = 1

as

a(3) = p(1)
a(2) = p(1) + p(2)
a(1) = p(1) + p(2) + p(3)
a(4) = p(4)
a(5) = p(5)
a(6) = p(6)
a(7) = 1 - p(5) - p(6)

with

lb = [0 0 0 0 0 0]
ub = [Inf Inf Inf Inf 1 1]

Well, it's not perfect, because it allows a(7) as low as -1 instead of 0. But it includes your other constraints.

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