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High density shot noise and gaussianity

Published online by Cambridge University Press:  14 July 2016

A. Papoulis
A. Papoulis*
Affiliation:
Polytechnic Institute of Brooklyn
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Abstract

The distance from Gaussianity of the shot noise process is considered, where ti are the random times of a Poisson process with average density λ(t). With F(x) the distribution function of x(t) and G(x) that of a normal process with the same mean and variance as x(t) it is shown that where If the process x(t) is stationary with λ(t) =λ and h(t, τ) = h(t – τ) and the function h(t) is bandlimited by ωc, then the above yields

Type
Research Papers
Information
Journal of Applied Probability , Volume 8 , Issue 1 , March 1971 , pp. 118 - 127
Copyright
Copyright © Applied Probability Trust 1971 

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References

[1] Blanc-Lapierre, A. and Fortet, R. (1953) Théorie des Fonctions Aléatoires. Masson et Cie, Paris.Google Scholar
[2] Rosenblatt, M. (1956) A central limit theorem and a strong mixing condition. Proc. Nat. Acad. Sci., USA 42, 4347.CrossRefGoogle Scholar
[3] Rosenblatt, M. (1961) Some comments on band-pass filters. Quart. J. Appl. Math. 18, 387393.CrossRefGoogle Scholar
[4] Papoulis, A. (1965) Probability, Random Variables, and Stochastic Processes. McGrawHill Book Co., New York.Google Scholar
[5] Doob, J. L. (1953) Stochastic Processes. John Wiley and Sons, Inc., New York.Google Scholar
[6] Papoulis, A. (1967) Limits on band-limited signals. Proc. IEEE, 55, 16771686.Google Scholar
[7] Papoulis, A. (1965) IEEE Trans. Information Theory, IT–11, 593594.Google Scholar
[8] Bergstrom, H. (1949) On the central limit theorem in the case of not equally distributed random variables. Skand. Aktuarietidsk. 32, 3762.Google Scholar
[9] Sapogov, N. A. (1959) The independent components of the sum of random variables distributed approximately normally. Vestnik Leningrad. Univ. 19, 78105.Google Scholar
[10] Mallows, C. L (1967) Linear processes are nearly Gaussian. J. Appl. Prob. 4, 313329.Google Scholar