Bounded self-stabilizing Petri nets

Ludmila Cherkasova; Rodney R. Howell; Louis E. Rosier; R. Rodney Howell

doi:10.1007/3-540-56689-9_38

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Bounded self-stabilizing Petri nets

Ludmila Cherkasova, Rodney R. Howell, Louis E. Rosier and R. Rodney Howell

Advances in Petri Nets 1993, pp.26-50

Lecture Notes in Computer Science, Springer Berlin Heidelberg

2005-06-06

DOI: https://doi.org/10.1007/3-540-56689-9_38

Abstract

bounded Petri nets

computational complexity

Self-stabilization

We investigate the property of self-stabilization in bounded Petri nets. We give characterizations for both self-stabilizing bounded ordinary Petri nets (i.e., Petri nets without multiple arcs) and self-stabilizing bounded general Petri nets (i.e., Petri nets with multiple arcs). These characterizations allow us to determine the complexity of deciding self-stabilization for each of these classes. In particular, we show the self-stabilization problem to be PTIME-complete for bounded ordinary Petri nets and PSPACE-complete for bounded general Petri nets.

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Title: Bounded self-stabilizing Petri nets
Creators: Ludmila Cherkasova - Hewlett-Packard
Rodney R. Howell - Kansas State University
Louis E. Rosier - The University of Texas at Austin
R. Rodney Howell - UMMG Department of Pediatrics
Publication Details: Advances in Petri Nets 1993, pp.26-50
Series: Lecture Notes in Computer Science
Publisher: Springer Berlin Heidelberg; Berlin, Heidelberg
ISSN: 1611-3349
Academic Unit: Miller School of Medicine; Miller School of Medicine Administration; UMMG Department of Pediatrics
Language: English
Resource Type: Book chapter
Record Identifier: 991031740205502976