Partial instantiation methods for inference in first-order logic

Hooker, J. N. ; Rago, G. ; Chandru, V. ; Shrivastava, A. (2002) Partial instantiation methods for inference in first-order logic Journal of Automated Reasoning, 28 (4). pp. 371-396. ISSN 0168-7433

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Related URL: http://dx.doi.org/10.1023/A:1015854101244

Abstract

Satisfiability algorithms for propositional logic have improved enormously in recently years. This improvement increases the attractiveness of satisfiability methods for first-order logic that reduce the problem to a series of ground-level satisfiability problems. R. Jeroslow introduced a partial instantiation method of this kind that differs radically from the standard resolution-based methods. This paper lays the theoretical groundwork for an extension of his method that is general enough and efficient enough for general logic programming with indefinite clauses. In particular we improve Jeroslow's approach by (1) extending it to logic with functions, (2) accelerating it through the use of satisfiers, as introduced by Gallo and Rago, and (3) simplifying it to obtain further speedup. We provide a similar development for a dual partial instantiation approach defined by Hooker and suggest a primal-dual strategy. We prove correctness of the primal and dual algorithms for full first-order logic with functions, as well as termination on unsatisfiable formulas. We also report some preliminary computational results.

Item Type:Article
Source:Copyright of this article belongs to Springer-Verlag.
Keywords:Satisfiability Algorithms; Primal-dual Strategy
ID Code:5470
Deposited On:19 Oct 2010 12:11
Last Modified:16 May 2016 15:58

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