Generating Compressed Combinatory Proof Structures -- An Approach to Automated First-Order Theorem Proving
Proc. of the Workshop on Practical Aspects of Automated Reasoning 2022 (PAAR 2022), CEUR-WS.org/Vol-3201/paper12.pdf Representing a proof tree by a combinator term that reduces to the tree lets subtle forms of duplication within the tree materialize as duplicated subterms of the combinator term. In...
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Zusammenfassung: | Proc. of the Workshop on Practical Aspects of Automated Reasoning
2022 (PAAR 2022), CEUR-WS.org/Vol-3201/paper12.pdf Representing a proof tree by a combinator term that reduces to the tree lets
subtle forms of duplication within the tree materialize as duplicated subterms
of the combinator term. In a DAG representation of the combinator term these
straightforwardly factor into shared subgraphs. To search for proofs,
combinator terms can be enumerated, like clausal tableaux, interwoven with
unification of formulas that are associated with nodes of the enumerated
structures. To restrict the search space, the enumeration can be based on proof
schemas defined as parameterized combinator terms. We introduce here this
"combinator term as proof structure" approach to automated first-order proving,
present an implementation and first experimental results. The approach builds
on a term view of proof structures rooted in condensed detachment and the
connection method. It realizes features known from the connection structure
calculus, which has not been implemented so far. |
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DOI: | 10.48550/arxiv.2209.12592 |