Minimum Initial Marking Estimation in Labeled Petri Nets With Unobservable Transitions

In the literature, researchers have been studying the minimum initial marking (MIM) estimation problem in the labeled Petri nets with observable transitions. This paper extends the results to labeled Petri nets with unobservable transitions (with certain special structure) and proposes algorithms for the MIM estimation (MIM-UT). In particular, we assume that the Petri net structure is given and the unobservable transitions in the net are contact-free. Based on the observation of a sequence of labels, our objective is to find the set of MIM(s) that is(are) able to produce this sequence and has(have) the smallest total number of tokens. An algorithm is developed to find the set of MIM(s) with polynomial complexity in the length of the observed label sequence. Two heuristic algorithms are also proposed to reduce the computational complexity. An illustrative example is also provided to demonstrate the proposed algorithms and compare their performance.

[1]  Hongye Su,et al.  An improved approach to test diagnosability of bounded petri nets , 2017, IEEE/CAA Journal of Automatica Sinica.

[2]  Dimitris Kiritsis,et al.  Petri net techniques for process planning cost estimation , 1999 .

[3]  MengChu Zhou,et al.  Deadlock Prevention for a Class of Petri Nets With Uncontrollable and Unobservable Transitions , 2012, IEEE Transactions on Systems, Man, and Cybernetics - Part A: Systems and Humans.

[4]  MengChu Zhou,et al.  Emergency Traffic-Light Control System Design for Intersections Subject to Accidents , 2016, IEEE Transactions on Intelligent Transportation Systems.

[5]  B. Cherki,et al.  State and firing sequence estimation of Petri Net application to: Manufacturing sysems , 2013, 2013 International Conference on Control, Decision and Information Technologies (CoDIT).

[6]  Christos G. Cassandras,et al.  Introduction to Discrete Event Systems , 1999, The Kluwer International Series on Discrete Event Dynamic Systems.

[7]  Alessandro Giua,et al.  Marking Estimation of Petri Nets With Silent Transitions , 2007, IEEE Transactions on Automatic Control.

[8]  Toshimasa Watanabe,et al.  A heuristic algorithm for the minimum initial marking problem of Petri nets , 1997, 1997 IEEE International Conference on Systems, Man, and Cybernetics. Computational Cybernetics and Simulation.

[9]  Christoforos N. Hadjicostis,et al.  Least-Cost Transition Firing Sequence Estimation in Labeled Petri Nets With Unobservable Transitions , 2011, IEEE Transactions on Automation Science and Engineering.

[10]  Rong Su,et al.  Polynomial approach to optimal one-wafer cyclic scheduling of treelike hybrid multi-cluster tools via Petri nets , 2018, IEEE/CAA Journal of Automatica Sinica.

[11]  Bo Huang,et al.  Supervisor Synthesis for FMS Based on Critical Activity Places , 2019, IEEE Transactions on Systems, Man, and Cybernetics: Systems.

[12]  Xiaoyu Lu,et al.  Hybrid Petri nets for modeling and analysis of microgrid systems , 2016, IEEE/CAA Journal of Automatica Sinica.

[13]  Christoforos N. Hadjicostis,et al.  Minimum initial marking estimation in labeled Petri nets , 2009, 2009 American Control Conference.

[14]  Patrice Bonhomme Marking Estimation of P-Time Petri Nets With Unobservable Transitions , 2015, IEEE Transactions on Systems, Man, and Cybernetics: Systems.

[15]  Tadao Murata,et al.  Petri nets: Properties, analysis and applications , 1989, Proc. IEEE.