Wei Wei, Ting He, et al.
IEEE J-SAC
We consider a token ring local area network (LAN) with an infinite number of nodes uniformly distributed around the ring. A token that circulates around the ring at a constant speed stops to “serve” fixed length packets that are generated by the nodes. We assume that the cumulative arrival process of packets constitutes a two-dimensional Poisson process. Given a fixed point on the ring, called the origin, we obtain the first-order statistics of the interarrival times of packets at the origin in the form of their Laplace—Stieltjes transform. © 1992 IEEE
Wei Wei, Ting He, et al.
IEEE J-SAC
Dakshi Agrawal, Mandis S. Beigi, et al.
IM 2007
Chi Harold Liu, Kin K. Leung, et al.
SPIE Defense, Security, and Sensing 2009
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WCNC 2008