Recognizable Graph Languages for Checking Invariants

Authors

  • Christoph Blume
  • Sander Bruggink
  • Barbara König

DOI:

https://doi.org/10.14279/tuj.eceasst.29.408

Abstract

We generalize the order-theoretic variant of the Myhill-Nerode theorem to graph languages, and characterize the recognizable graph languages as the class of languages for which the Myhill-Nerode quasi order is a well quasi order. In the second part of the paper we restrict our attention to graphs of bounded interface size, and use Myhill-Nerode quasi orders to verify that, for such bounded graphs, a recognizable graph property is an invariant of a graph transformation system. A recognizable graph property is a recognizable graph language, given as an automaton functor. Finally, we present an algorithm to approximate the Myhill-Nerode ordering.

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Published

2010-07-22

How to Cite

[1]
C. Blume, S. Bruggink, and B. König, “Recognizable Graph Languages for Checking Invariants”, eceasst, vol. 29, Jul. 2010.

Issue

Vol. 29 (2010): Graph Transformation and Visual Modeling Techniques 2010

Section

Articles

License

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.