Open AccessConstructing Induction Rules for Deductive Synthesis Proofs
Author(s) -
Alan Bundy,
Lucas Dixon,
Jeremy Gow,
Jacques Fleuriot
Publication year - 2006
Publication title -
electronic notes in theoretical computer science
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.242
H-Index - 60
ISSN - 1571-0661
DOI - 10.1016/j.entcs.2005.08.003
Subject(s) - mathematical proof , computer science , recursion (computer science) , mathematical induction , deductive database , novelty , programming language , theoretical computer science , deductive reasoning , mathematics , artificial intelligence , philosophy , theology , geometry
We describe novel computational techniques for constructing induction rules for deductive synthesis proofs. Deductive synthesis holds out the promise of automated construction of correct computer programs from specifications of their desired behaviour. Synthesis of programs with iteration or recursion requires inductive proof, but standard techniques for the construction of appropriate induction rules are restricted to recycling the recursive structure of the specifications. What is needed is induction rule construction techniques that can introduce novel recursive structures. We show that a combination of rippling and the use of meta-variables as a least-commitment device can provide such novelty
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