How to fit the cdf to a function?

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Hozifa
Hozifa on 22 Feb 2023
Edited: William Rose on 23 Feb 2023
Hi there,
I want my code to give the exponential fit as a function of the x-axis values, in my code, the fit function depends on the generated linespace,
Mnay thanks,
clear
clc
z=[
0
0
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8.2000
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11.7000
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12.0000
12.2000
12.3400
12.4300
12.6000
12.9700
13.2100
13.2900
13.3400
13.3800
14.4000
15.4500
15.8200
15.9900
16.2600
16.4200
16.4400
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17.6100
17.7000
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20.8100
21.4000
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22.4000
22.4300
22.4700
22.5000
22.5000
22.5000
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23.7500
24.1100
24.4800
24.6000
24.7000
26.0900
26.3000
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26.4500
26.4800
26.5100
27.0000
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28.3900
28.8500
29.5000
29.8500
30.3000
30.3000
31.0000
31.3000
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33.1000
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33.6500
33.9000
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36.2400
36.6000
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40.2800
40.3000
40.6200
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42.7100
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43.6500
43.8000
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46.6000
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49.4100
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49.6800
49.8500
50.3000
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72.9000
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72.9000
72.9000
72.9000
73.0000
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73.0000
73.0000
73.3000
73.3000
73.3000
73.3000
73.3000
73.3000
73.3000
73.3000
73.3000
73.3800
73.4000
73.4000
73.4000
73.4000
73.4000
73.4000
73.4000
73.4000
73.4000
73.4200
73.4500
73.6000
73.6000
73.6000
73.6000
73.6000
73.6000
73.6000
73.6000
];
cdfplot(z)
hold on
x = linspace(0,1,length(z));
% x=z;
fitfunc = fittype(@(B,C,x) 0.4*exp(B*x.^C));
x0 = [10 0.5];
f = fit(x',z,fitfunc,'StartPoint',x0)
coeffvals = coeffvalues(f)
plot(f(x),x,'-r',z,x,'b.')
% legend('fitted curve','data')
legend('LOS','Exponential fit')
set(findall(gcf,'type','line'),'LineWidth',1)
set(gca,'fontweight','bold','FontSize',12)
xlabel('Inter cluster delay (ns)','fontweight','bold','fontsize',12)
ylabel ('Probability','fontweight','bold','fontsize',12)

Accepted Answer

William Rose
William Rose on 22 Feb 2023
Edited: William Rose on 23 Feb 2023
[edit: correct spelling and grammar]
I put the data in a text file so it is not in your code. It appears that the data are interpreted as being samples of a random variable, which have been sorted into ascending order.
Your question and the comments in the code indicate you want to fit an exponential distribution to the data:
The max. likelihood estimate (MLE) for lambda is 1/mean(x)
Therefore I have computed the CDF with this estimate, and I have added it to the plot. Of course your data shows signs of thresholding and saturation, which violate the assumptions used in the MLE derivation. Thresholding and saturation are types of data censoring. Google, or search matlab answers, for more info on advanced strategies for fitting censored data, if that is of interest.
In the code below, I computed the MLE and added the corresponding CDF to the plot. This method of fitting does not depend on a generated linespace vector, which was your original concern.
z=load('statdata.txt');
cdfplot(z)
hold on
x = linspace(0,1,length(z));
fitfunc = fittype(@(B,C,x) 0.4*exp(B*x.^C));
x0 = [10 0.5];
f = fit(x',z,fitfunc,'StartPoint',x0)
f =
General model: f(x) = 0.4*exp(B*x.^C) Coefficients (with 95% confidence bounds): B = 5.426 (5.396, 5.456) C = 0.582 (0.5531, 0.611)
coeffvals = coeffvalues(f)
coeffvals = 1×2
5.4257 0.5820
lambda=1/mean(z); %MLE for exponential distribution
cdf_mle=1-exp(-lambda*[1:100]); %CDF using MLE for lambda
plot(f(x),x,'-r',z,x,'b.',[1:100],cdf_mle,'-g')
% legend('fitted curve','data')
legend('','Exponential fit','LOS','MLE')
set(findall(gcf,'type','line'),'LineWidth',1)
set(gca,'fontweight','bold','FontSize',12)
xlabel('Inter cluster delay (ns)','fontweight','bold','fontsize',12)
ylabel ('Probability','fontweight','bold','fontsize',12)

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