Supplementary variable approach applied to the transient analysis of age-MRSPNs

In order to assist the performance evaluation of complex stochastic models, automatic program tools have been developed for a long time. An effective model description language, supported by several software tools, is the stochastic Petri Net (SPN). But the attention to the analytical description and the numerical analysis of non-Markovian stochastic Petri Net models arose only recently. There are different theoretical approaches and numerical methods considered in recent works, such as the Markov renewal theory and the supplementary variable approach, but to find the most effective way of the analysis of such models is still a hot research topic. The supplementary variable approach was successfully applied to the transient and steady state analysis of Markov Regenerative Stochastic Petri Nets (MSRPN) when the pre-emption policy associated with the Petri Net (PN) transitions was preemptive repeat different (prd), but it was not applicable with other pre-emption mechanisms. In this paper we extend the applicability of the supplementary variable approach to a class of MRSPNs in which preemptive resume (prs) policy can also be assigned to the transitions of the PN.

[1]  Christoph Lindemann An Improved Numerical Algorithm for Calculating Steady-State Solutions of Deterministic and Stochastic Petri Net Models , 1993, Perform. Evaluation.

[2]  Christoph Lindemann,et al.  DSPNexpress: A Software Package for the Efficient Solution of Deterministic and Stochastic Petri Nets , 1993, Perform. Evaluation.

[3]  Reinhard German,et al.  Analysis of Stochastic Petri Nets by the Method of Supplementary Variables , 1994, Perform. Evaluation.

[4]  Marco Ajmone Marsan,et al.  A class of generalised stochastic petri nets for the performance evaluation of multiprocessor systems , 1983, SIGMETRICS '83.

[5]  Miklós Telek,et al.  Non-Exponential Stochastic Petri Nets: an Overview of Methods and Techniques , 1997 .

[6]  Andrea Bobbio,et al.  Markov regenerative SPN with non-overlapping activity cycles , 1995, Proceedings of 1995 IEEE International Computer Performance and Dependability Symposium.

[7]  D. Cox The analysis of non-Markovian stochastic processes by the inclusion of supplementary variables , 1955, Mathematical Proceedings of the Cambridge Philosophical Society.

[8]  Hoon Choi,et al.  Markov Regenerative Stochastic Petri Nets , 1994, Perform. Evaluation.

[9]  Miklós Telek,et al.  Markov Regenerative Stochastic Petri Nets with Age Type General Transitions , 1995, Application and Theory of Petri Nets.

[10]  Kishor S. Trivedi,et al.  Preemptive repeat identical transitions in Markov regenerative stochastic Petri nets , 1995, Proceedings 6th International Workshop on Petri Nets and Performance Models.

[11]  Kishor S. Trivedi,et al.  Transient analysis of Markov regenerative stochastic Petri nets: a comparison of approaches , 1995, Proceedings 6th International Workshop on Petri Nets and Performance Models.

[12]  Miklós Telek,et al.  Combined Preemption Policies in MRSPN , 1995 .

[13]  Marco Ajmone Marsan,et al.  On Petri nets with deterministic and exponentially distributed firing times , 1986, European Workshop on Applications and Theory of Petri Nets.

[14]  Reinhard German,et al.  A fourth-order algorithm with automatic stepsize control for the transient analysis of DSPNs , 1997, Proceedings of the Seventh International Workshop on Petri Nets and Performance Models.

[15]  Marco Ajmone Marsan,et al.  The Effect of Execution Policies on the Semantics and Analysis of Stochastic Petri Nets , 1989, IEEE Trans. Software Eng..

[16]  Gianfranco Ciardo,et al.  A Characterization of the Stochastic Process Underlying a Stochastic Petri Net , 1994, IEEE Trans. Software Eng..

[17]  Kishor S. Trivedi,et al.  Steady State Analysis of Markov Regenerative SPN with Age Memory Policy , 1995, MMB.

[18]  Reinhard German,et al.  New results for the analysis of deterministic and stochastic Petri nets , 1995, Proceedings of 1995 IEEE International Computer Performance and Dependability Symposium.