References
- Becha, T., Kara, R., Collart-Dutilleul, S., & Loiseau, J. J. (2013, September 11–13). Modelling, analysis and control of electroplating line modelled by P-time event graphs. In 6th International Conference on Management and Control of Production and Logistics (Vol. 46, Issue 24, pp. 311–316). Elsevier.
- Bonhomme, P. (2015). Marking estimation of P-time Petri nets with unobservable transitions. IEEE Transactions on Systems, Man, and Cybernetics: Systems, 45(3), 508–518. https://doi.org/10.1109/TSMC.2014.2353575
- Bonhomme, P. (2021). Decentralized state estimation and diagnosis of P-time labeled PNs systems. Journal of Discrete Event Dynamic Systems, 31(1), 137–162. https://doi.org/10.1007/s10626-020-00326-w
- Chouchane, A., & Declerck, P. (2022). Diagnosis on a sliding horizon for partially observable Petri nets. Kybernetika, International Journal of Institute of Information Theory and Automation of The Czech Academy of Science, 58(4), 479–497. https://doi.org/10.14736/kyb-2022-4-0479
- Chouchane, A., Declerck, P., Khedher, A., & Kamoun, A. (2018, December). Diagnostic based on estimation using linear programming for partially observable Petri nets with indistinguishable events. International Journal of Systems Science: Operations & Logistics. https://doi.org/10.1080/23302674.2018.1554169
- Collart-Dutilleul, S., Mhalla, A., Craye, E., & Benrejeb, M. (2013). Active robustness of a milk manufacturing workshop with time constraints. International Journal of Production Research, 51(1), 9–25. https://doi.org/10.1080/00207543.2011.640713
- Declerck, P. (2011). From extremal trajectories to consistency in P-time event graphs. IEEE Transactions on Automatic Control, 56(2):463–467. https://doi.org/10.1109/TAC.2010.2091297
- Declerck, P. (2013). Discrete event systems in dioid algebra and conventional algebra. Focus Series in Automation & Control, ISTE Ltd and John Wiley.
- Declerck, P. (2021). Counter approach for the estimation of optimal sequences in partially observable untimed Petri nets. Journal of Discrete Event Dynamic Systems, 31(4):489–512. https://doi.org/10.1007/s10626-021-00341-5
- Declerck, P., & Bonhomme, P. (2014, January). State estimation of timed labeled Petri nets with unobservable transitions. IEEE Transactions on Automation Science and Engineering, Special Issue on Discrete Event Systems for Automation, 11(1, ITASC9), 103–110. https://doi.org/10.1109/TASE.2013.2290314
- Declerck, P., Chouchane, A., & Bonhomme, P. (2017, April 5–7). A strategy for estimation in timed Petri nets. In CoDIT'17 - 4th edition in the series of the International Conference on Control, Decision and Information Technologies. (pp. 489–494). Barcelona, Spain. https://doi.org/10.1109/CoDIT.2017.8102640
- Dotoli, M., Fanti, M. P., & Mangini, A. M. (2009). Fault detection of discrete event systems by Petri nets and integer linear programming. Automatica, 45(11), 2665–2672. https://doi.org/10.1016/j.automatica.2009.07.021
- Komenda, J., Lahaye, S., & Boimond, J-L. (2016). Determinization of timed Petri nets behaviors. Journal of Discrete Event Dynamic Systems, 26(3), 413–437. https://doi.org/10.1007/s10626-015-0214-1
- Komenda, J., Lahaye, S., Boimond, J-L., & van den Boom, T. (2018). Max-plus algebra in the history of discrete event systems. Annual Reviews in Control, 45, 240–249. https://doi.org/10.1016/j.arcontrol.2018.04.004
- Li, L., Li, Y., Liu, B., & Wu, W. (2022). Least-cost transition sequence estimation in labeled time Petri net systems with unobservable transitions. International Journal of Control, 1–14. https://doi.org/10.1080/00207179.2022.2121764