%0 Conference Paper %1 conf/atva/LerouxS05 %A Leroux, Jérôme %A Sutre, Grégoire %B ATVA %D 2005 %E Peled, Doron A. %E Tsay, Yih-Kuen %I Springer %K modelchecking petrinetflatness petrinets %P 489-503 %T Flat Counter Automata Almost Everywhere! %U https://hal.archives-ouvertes.fr/hal-00346310/document %V 3707 %X This paper argues that flatness appears as a central notion in the verification of counter automata. A counter automaton is called flat when its control graph can be “replaced”, equivalently w.r.t. reachability, by another one with no nested loops. From a practical view point, we show that flatness is a necessary and sufficient condition for termination of accelerated symbolic model checking, a generic semi-algorithmic technique implemented in successful tools like FAST, LASH or TREX. From a theoretical view point, we prove that many known semilinear subclasses of counter automata are flat: reversal bounded counter machines, lossy vector addition systems with states, reversible Petri nets, persistent and conflict-free Petri nets, etc. Hence, for these subclasses, the semilinear reachability set can be computed using a uniform accelerated symbolic procedure (whereas previous algorithms were specifically designed for each subclass). %@ 3-540-29209-8

@inproceedings{conf/atva/LerouxS05, abstract = {This paper argues that flatness appears as a central notion in the verification of counter automata. A counter automaton is called flat when its control graph can be “replaced”, equivalently w.r.t. reachability, by another one with no nested loops. From a practical view point, we show that flatness is a necessary and sufficient condition for termination of accelerated symbolic model checking, a generic semi-algorithmic technique implemented in successful tools like FAST, LASH or TREX. From a theoretical view point, we prove that many known semilinear subclasses of counter automata are flat: reversal bounded counter machines, lossy vector addition systems with states, reversible Petri nets, persistent and conflict-free Petri nets, etc. Hence, for these subclasses, the semilinear reachability set can be computed using a uniform accelerated symbolic procedure (whereas previous algorithms were specifically designed for each subclass). }, added-at = {2020-01-16T10:45:49.000+0100}, author = {Leroux, Jérôme and Sutre, Grégoire}, biburl = {https://www.bibsonomy.org/bibtex/2de94724ec4b3e61caf56a98af6194bba/paves_intern}, booktitle = {ATVA}, crossref = {conf/atva/2005}, editor = {Peled, Doron A. and Tsay, Yih-Kuen}, ee = {https://doi.org/10.1007/11562948_36}, interhash = {e48301cca5d057e61e895ce1587ff717}, intrahash = {de94724ec4b3e61caf56a98af6194bba}, isbn = {3-540-29209-8}, keywords = {modelchecking petrinetflatness petrinets}, pages = {489-503}, publisher = {Springer}, series = {Lecture Notes in Computer Science}, timestamp = {2020-01-16T10:45:49.000+0100}, title = {Flat Counter Automata Almost Everywhere!}, url = {https://hal.archives-ouvertes.fr/hal-00346310/document}, volume = 3707, year = 2005 }