Interference Functionals in Poisson Networks

Interference Functionals in Poisson Networks

We propose and prove a theorem that allows the calculation of a class of functionals on Poisson point processes that have the form of expected values of sum-products of functions. In proving the theorem, we present a variant of the Campbell-Mecke theorem from stochastic geometry. We proceed to apply...

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Veröffentlicht in:IEEE transactions on information theory 2016-01, Vol.62 (1), p.370-383
Hauptverfasser: Schilcher, Udo, Toumpis, Stavros, Haenggi, Martin, Crismani, Alessandro, Brandner, Gunther, Bettstetter, Christian
Format: Artikel
Sprache:eng
Schlagworte:
correlation
Electric noise
Expected values
Functionals
Functions (mathematics)
Geometry
Interference
Mathematical analysis
Multiaccess communication
Nakagami fading
Networks
Poisson distribution
Poisson point process
Rayleigh channels
Rayleigh fading
stochastic geometry
Stochastic models
Stochastic processes
Stochasticity
Theorems
time diversity
Wireless networks
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Beschreibung
Zusammenfassung:We propose and prove a theorem that allows the calculation of a class of functionals on Poisson point processes that have the form of expected values of sum-products of functions. In proving the theorem, we present a variant of the Campbell-Mecke theorem from stochastic geometry. We proceed to apply our result in the calculation of expected values involving interference in wireless Poisson networks. Based on this, we derive outage probabilities for transmissions in a Poisson network with Nakagami fading. Our results extend the stochastic geometry toolbox used for the mathematical analysis of interference-limited wireless networks.
ISSN:0018-9448
1557-9654
DOI:10.1109/TIT.2015.2501799