Capture-avoiding substitution as a nominal algebra

Author:

Gabbay Murdoch J.1,Mathijssen Aad2

Affiliation:

1. School of Mathematical and Computer Sciences, Heriot-Watt University, Edinburgh, Scotland, UK

2. Department of Mathematics and Computer Science, Eindhoven University of Technology, Eindhoven, The Netherlands

Abstract

Abstract Substitution is fundamental to the theory of logic and computation. Is substitution something that we define on syntax on a case-by-case basis, or can we turn the idea of substitution into a mathematical object? We give axioms for substitution and prove them sound and complete with respect to a canonical model. As corollaries we obtain a useful conservativity result, and prove that equality-up-to-substitution is a decidable relation on terms. These results involve subtle use of techniques both from rewriting and algebra. A special feature of our method is the use of nominal techniques. These give us access to a stronger assertion language, which includes so-called ‘freshness’ or ‘capture-avoidance’ conditions. This means that the sense in which we axiomatise substitution (and prove soundness and completeness) is particularly strong, while remaining quite general.

Publisher

Association for Computing Machinery (ACM)

Subject

Theoretical Computer Science,Software

Reference31 articles.

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3. A Course in Universal Algebra

4. On the Notion of Substitution

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