Publication detail

Regular Model Checking Using Inference of Regular Languages

HABERMEHL, P. VOJNAR, T.

Original Title

Regular Model Checking Using Inference of Regular Languages

Type

article in a collection out of WoS and Scopus

Language

English

Original Abstract

Regular model checking is a method for verifying infinite-state systems based on coding their configurations as words over a finite alphabet, sets of configurations as finite automata, and transitions as finite transducers. We introduce a new general approach to regular model checking based on inference of regular languages. The method builds upon the observation that for infinite-state systems whose behaviour can be modelled using length-preserving transducers,  there is a finite computation for obtaining all reachable  configurations up to a certain length n. These configurations are a (positive) sample of the reachable configurations of the given system, whereas~all other words up to length n are a negative sample. Then, methods of inference of regular languages can be used to generalise the sample to the full reachability set (or an overapproximation of it). We have implemented our method in a prototype tool which shows that our approach is competitive on a number of concrete examples. Furthermore, in contrast to all other existing regular model checking methods, termination is guaranteed in general for all systems with regular sets of reachable configurations. The method can be applied in a similar way to dealing with reachability relations instead of reachability sets too.

Keywords

formal verification, model checking, parametric systems, infinite-state systems, automata theory, inference of regular languages

Authors

HABERMEHL, P.; VOJNAR, T.

Released

4. 9. 2004

Location

London

Pages from

61

Pages to

71

Pages count

11

BibTex

@inproceedings{BUT192526,
  author="Peter {Habermehl} and Tomáš {Vojnar}",
  title="Regular Model Checking Using Inference of Regular Languages",
  booktitle="Proceedings of 6th International Workshop on Verification of Infinite-State Systems -- INFINITY 2004",
  year="2004",
  pages="61--71",
  address="London"
}