How do I fit two equations that explain two parts of a curve?
이전 댓글 표시
Hi,my equations are: y(t)={(a/b)*(1-exp(-b(x-x_start)),for x_start <= x < x_end %equ1 and {c*exp(-b(x-xend)),for x > x_end %equ2
Here I do not know a,b and c. The idea is that since both equations have b in common, I would like to know how fitting these equations I can get one single value for b. I already fitted these equations individually, but I obtained two values of b, which are different from each fit.
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John D'Errico
2015년 2월 17일
I predict that your next question will be why is my curvefit not continuous at the break point? I.e., at x_end, the pair of functions will not be continuous.
채택된 답변
Sean de Wolski
2015년 2월 17일
Break the data into two pieces and do the curve fit
xlow = x(x<x_end);
ylow = y*x<x_end);
xhigh = x(x>x_end); % Note you have nothing for x==x_end
yhigh = y(x>x_end);
Now do the curve fit - either with the Curve Fitting App, lsqcurvefit or fitnlm.
댓글 수: 7
mdjupin
2015년 2월 17일
Sean de Wolski
2015년 2월 17일
No, you would have to solve for one and use that value of b for both with mine (i.e. not solve for it in the second equation). In order to find b that works for both equations, I don't know how to do that as there is a discontinuity in the fitting function. A global optim solver would probably be best doing both curve fits with it at once..
mdjupin
2015년 2월 18일
Torsten
2015년 2월 18일
Use lsqnonlin and define the f_i as
f_i = y_i -(p(1)/p(2))*(1-exp(-p(2)(x_i - x_start)) for x_start <= x_i < x_end
and
f_i = y_i -{p(3)*exp(-p(2)(x_i-xend)) for x_i > x_end
(x_i,y_i) are your measurement data.
Best wishes
Torsten.
mdjupin
2015년 2월 23일
Torsten
2015년 2월 23일
You programmed it as
function call
xdata=[...];
ydata=[...];
xstart=...;
xend=...;
p0=[1 1 1];
p = lsqnonlin(@(p)myfun(xdata,ydata,xstart,xend,p),p0);
function F = myfun(xdata,ydata,xstart,xend,p)
for i=1:length(xdata)
if (xdata(i) >= xstart) && (xdata(i) < xend)
F(i) = ydata(i)-(p(1)/p(2))*(1-exp(-p(2)(xdata(i)-xstart));
else
F(i)=ydata(i)-(p(3)*exp(-p(2)(xdata(i)-xend));
end
end
?
Best wishes
Torsten.
mdjupin
2015년 2월 24일
추가 답변 (1개)
Joep
2015년 2월 17일
This is very simple solution which works in some cases one thing you need to noticed is the 1-based indexing of matlab.
a=10; b=20; c=-1; d=-3;
for x=1:a
t(x)=x;
y(x)=c*x;
end
for x=a:b
t(x)=t;
y(x)=d*x.^2;
end
figure
plot(t,y)
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