why my cdf does not match cumsum(pdf)
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x=1D array of 100 discrete values that I calculate Rayleigh pdf and cdf as below
pdfrayl = 2 * x .* exp(-x .^ 2);
cdfrayl = 1 - exp(-x .^ 2);
Now I plot following two lines:
plot(x, cdfrayl)
hold on;
plot(x, cumsum(pdfrayl )/ sum(pdfrayl))
I expected them to match exactly, but they don't. Can anybody please explain why they don't match?
Réponse acceptée
Wayne King
le 15 Sep 2012
It does not appear to me that you are approximating the Riemann sum of the integral of the PDF correctly here.
x = 0:0.01:10;
y = x/4.*exp(-x.^2/8);
% \Delta x for the Riemann sum
dx = 10/length(x);
yc = cumsum(y).*dx;
yct = 1-exp(-x.^2/8);
plot(x,yc,'r-.','linewidth',2);
hold on;
plot(x,yct,'b');
legend('Approximation of CDF','True CDF', ...
'Location','SouthEast');
Plus de réponses (1)
Russ Adheaux
le 15 Sep 2012
0 votes
3 commentaires
Wayne King
le 15 Sep 2012
The dx is coming the length of the interval max(x)-min(x) divided by the number of points. Yes, you would have to sort the x. Do you know the ecdf function?
Star Strider
le 15 Sep 2012
For unevenly spaced, monotonically-increasing x-data, I suggest trapz or cumtrapz, specifying both x and y data as arguments. It then allows you to integrate with respect to any x-variable spacing, and is more accurate than cumsum.
Russ Adheaux
le 19 Sep 2012
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le 15 Sep 2012
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