From Hyperedge Replacement to Separation Logic and Back

Authors

  • Mike Dodds
  • Detlef Plump

DOI:

https://doi.org/10.14279/tuj.eceasst.16.237

Abstract

Hyperedge-replacement grammars and separation-logic formulas both define classes of graph-like structures. In this paper, we relate the different formalisms by effectively translating restricted hyperedge-replacement grammars into formulas of a fragment of separation-logic with recursive predicates, and vice versa. The translations preserve the classes of specified graphs, and hence the two approaches are of equivalent power. It follows that our fragment of separation-logic inherits properties of hyperedge-replacement grammars, such as inexpressibility results. We also show that several operators of full separation logic cannot be expressed using hyperedge replacement.

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Published

2009-07-04

How to Cite

[1]
M. Dodds and D. Plump, “From Hyperedge Replacement to Separation Logic and Back”, eceasst, vol. 16, Jul. 2009.

Issue

Vol. 16 (2009): International Conference on Graph Transformation 2008 - Doctoral Symposium

Section

Articles

License

Creative Commons License

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