adding two different distributions example:Gaussian and Poisson distribution

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Anusha S S
Anusha S S el 6 de Jun. de 2016
Comentada: Torsten el 8 de Jun. de 2016
if we add two different distributions namely gaussian which as mean and standard deviation as variables and Poisson distribution with lambda variable how to mathematically relate the resultant distribution(What distribution the resulting value will take) and how to code it
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Image Analyst
Image Analyst el 8 de Jun. de 2016
What does "relate" mean to you? The new distribution will be the sum of the two you summed. What else do you need to know?

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Torsten
Torsten el 6 de Jun. de 2016
Editada: Torsten el 6 de Jun. de 2016
If X ~ Poisson(lambda), Y ~ N(mu,sigma^2), X, Y independent and Z=X+Y, then the cdf of Z is given by
P(Z<=z) = sum_{k=0}^{k=oo} P(X=k) * P(Y<=z-k).
P(X=k) = lambda^k/k! * exp(-lambda)
P(Y<=z-k) = 0.5*(1+erf((z-k-mu)/sqrt(2*sigma^2))) (erf: error function)
If needed, you can get the pdf of Z by differentiating the sum with respect to z.
Best wishes
Torsten.
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Torsten
Torsten el 8 de Jun. de 2016
So to get the cfd F_Z of Z=X+Y, you have to evaluate the infinite sum
F_Z(z)= sum_{k=0}^{k=Inf} lambda^k/k!*exp(-lambda)*0.5*(1+erf((z-k-mu)/sqrt(2*sigma^2)))
for different values of z.
Make an attempt. If it does not work, post the code with the error message you get.
Best wishes
Torsten.

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