Title :
Generalization of queueing network product form solutions to stochastic Petri nets
Author :
Florin, Gerard ; Natkin, Stéphane
Author_Institution :
Centre d´´Etudes et de Recherche en Inf. du CNAM, Paris, France
fDate :
2/1/1991 12:00:00 AM
Abstract :
A new solution is given for the steady-state probability computation of closed synchronized queuing networks. A closed synchronized queuing network is a particular Markov stochastic Petri net (a bounded and monovaluated Petri net with a strongly connected reachability graph and constant firing rates independent of markings). It is shown that the steady-state probability distribution can be expressed using matrix products. The results generalize the Gordon-Newell theorem. The solution is similar to the Gordon-Newell product form using matrix and vectors instead of scalars. A prototype solver developed from this result is presented
Keywords :
Petri nets; performance evaluation; queueing theory; Gordon-Newell theorem; Markov stochastic Petri net; closed synchronized queuing networks; constant firing rates; matrix products; performance evaluation; queueing network product form solutions; steady-state probability; stochastic Petri nets; strongly connected reachability graph; Algorithm design and analysis; Computer networks; Helium; Network theory (graphs); Petri nets; Probability distribution; Prototypes; Queueing analysis; Steady-state; Stochastic processes;
Journal_Title :
Software Engineering, IEEE Transactions on
