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Article type: Research Article
Authors: Llorens, M.; * | Oliver, J.; * | Silva, J.; *; † | Tamarit, S.; *
Affiliations: VRAIN, Departamento de Sistemas Informáticos y Computación, Universitat Politècnica de València, Valencia, Spain, [email protected], [email protected], [email protected]
Correspondence: [†] Address for correspondence: VRAIN, Departamento de Sistemas Informáticos y Computación. Universitat Politècnica de València. Valencia, Spain.
Note: [*] This work has been partially supported by the EU (FEDER) and the Spanish MCI/AEI under grant PID2019-104735RB-C41 and by the European Union’s Horizon 2020 research and innovation programme under grant agreement No 952215 (Tailor).
Abstract: Context:Petri net slicing is a technique to reduce the size of a Petri net to ease the analysis or understanding of the original Petri net. Objective:Presenting two new Petri net slicing algorithms to isolate those places and transitions of a Petri net (the slice) that may contribute tokens to one or more places given (the slicing criterion). Method:The two algorithms proposed are formalized. The maximality of the first algorithm and the minimality of the second algorithm are formally proven. Both algorithms together with three other state-of-the-art algorithms have been implemented and integrated into a single tool so that we have been able to carry out a fair empirical evaluation. Results:Besides the two new Petri net slicing algorithms, a public, free, and open-source implementation of five algorithms is reported. The results of an empirical evaluation of the new algorithms and the slices they produce are also presented. Conclusions:The first algorithm collects all places and transitions that may contribute tokens (in any computation) to the slicing criterion, while the second algorithm collects the places and transitions needed to fire the shortest transition sequence that contributes tokens to some place in the slicing criterion. Therefore, the net computed by the first algorithm can reproduce any computation that contributes tokens to any place of interest. In contrast, the second algorithm loses this possibility, but it often produces a much more reduced subnet (which still can reproduce some computations that contribute tokens to some places of interest). The first algorithm is proven maximal, and the second one is proven minimal.
Keywords: Petri nets, Program slicing, Petri net slicing
DOI: 10.3233/FI-222148
Journal: Fundamenta Informaticae, vol. 188, no. 4, pp. 239-267, 2022
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