Expectation of inverse of complex Gaussian variables

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mingcheng nie
mingcheng nie el 3 de En. de 2023
Editada: Paul el 27 de Oct. de 2024 a las 16:08
Hi there, I just have a mathematic problem. If we consider a Gaussian complex random variable vector , where each element in follows zeros mean and variance γ. Is there any close form with γ for ? where is the norm-2 operation. I have asked the same question in MathOverflow at https://mathoverflow.net/questions/436733/expectation-of-inverse-of-complex-gaussian-variables?noredirect=1#comment1125524_436733.
the people in mathoverflow showed that this expectation is infinity mathematically. But in matlab, we can find out that the above expectation can converge to a certain value. So there must be some error that I couldn't find out and misunderstanding. Really appreciate for any comments!
clc;close all;clear all;
num_loop=5000;
N=5;Eh=0;
for i=1:num_loop
h=sqrt(1/2)*(randn(N,1)+1i*randn(N,1));
Eh=Eh+1/norm(h)^2;
end
Eh=Eh/num_loop
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Paul
Paul el 3 de En. de 2023
Editada: Paul el 3 de En. de 2023
@Bruno Luong
Then I guess you disagree with the commen on the mathoverflow page?
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Bruno Luong
Bruno Luong el 3 de En. de 2023
@Paul I see I miss to read the comment, thanks. I stand corrected.

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Matt J
Matt J el 3 de En. de 2023
Editada: Matt J el 3 de En. de 2023
So there must be some error that I couldn't find out and misunderstanding.
The misunderstanding is that the expectation is infinite for when n=1, but for higher dimensions, it is finite. The general formula can be derived by adapting the material from here, leading to,
The integral can be evaluated for n>1 by integration by parts.
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mingcheng nie
mingcheng nie el 15 de Oct. de 2024
@Matt J@Paul Sorry guys I have an add-on question. What if in this question, n > 1, but each entry in has different variance, i.e., , is different for i= 1....n. Here, each entry of is still complex Gaussian with zero mean. How would the answer presented above changed in this siutation? I still assume there exist a closed-form solution as from the simulation I got fixed results.
Thank you guys so much for your patience!
Paul
Paul el 27 de Oct. de 2024 a las 13:54
Editada: Paul el 27 de Oct. de 2024 a las 16:08
If you can find the probability density function for the sum of independent, normal random variables that are not identically distributed, then you can try to proceed as shown above. Maybe there is a closed form expression. As to finding that density function, maybe this link will be of use. I think, but am not positive, that the Generalized Chi-Squared Distribution is what you're looking for.

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