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2013 | OriginalPaper | Chapter

Hierarchic Superposition with Weak Abstraction

Authors : Peter Baumgartner, Uwe Waldmann

Published in: Automated Deduction – CADE-24

Publisher: Springer Berlin Heidelberg

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Many applications of automated deduction require reasoning in first-order logic modulo background theories, in particular some form of integer arithmetic. A major unsolved research challenge is to design theorem provers that are “reasonably complete” even in the presence of free function symbols ranging into a background theory sort. The hierarchic superposition calculus of Bachmair, Ganzinger, and Waldmann already supports such symbols, but, as we demonstrate, not optimally. This paper aims to rectify the situation by introducing a novel form of clause abstraction, a core component in the hierarchic superposition calculus for transforming clauses into a form needed for internal operation. We argue for the benefits of the resulting calculus and provide a new completeness result for the fragment where all background-sorted terms are ground.

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previous chapter The Tree Width of Separation Logic with Recursive Definitions

next chapter Completeness and Decidability Results for First-Order Clauses with Indices

Title: Hierarchic Superposition with Weak Abstraction
Authors: Peter Baumgartner
Uwe Waldmann
Publisher: Springer Berlin Heidelberg
Book: Automated Deduction – CADE-24
Print ISBN: 978-3-642-38573-5

Electronic ISBN: 978-3-642-38574-2

Copyright Year: 2013
DOI: https://doi.org/10.1007/978-3-642-38574-2_3

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