Title :
Transient analysis of superposed GSPNs
Author_Institution :
Inf. IV, Dortmund Univ., Germany
Abstract :
The paper considers transient analysis using randomization for superposed generalized stochastic Petri nets (GSPNs). Since state space explosion implies that space is the bottleneck for numerical analysis, superposed GSPNs profit from the structured representation known for its associated Markov chain. This moves the bottleneck for analysis from space for generator matrices to space for iteration vectors. Hence a variation of randomization is presented which allows to reduce space requirements for iteration vectors. An additional and welcome side effect is that during an initial phase, this algorithm avoids useless multiplications involving states with zero probability. Furthermore, it accommodates to adaptive randomization in a natural way. Although the algorithm has been developed for superposed GSPNs, it applies to continuous time Markov chains in a more general setting
Keywords :
Markov processes; Petri nets; iterative methods; matrix algebra; randomised algorithms; state-space methods; adaptive randomization; algorithm; associated Markov chain; continuous time Markov chains; generator matrices; iteration vectors; numerical analysis bottleneck; randomization; space requirements; state space explosion; structured representation; superposed generalized stochastic Petri nets; transient analysis; Algebra; Explosions; Functional analysis; Numerical analysis; Performance analysis; Petri nets; State-space methods; Stochastic processes; Stochastic systems; Transient analysis;
Journal_Title :
Software Engineering, IEEE Transactions on
