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Anti-unification for unranked terms and hedges

We study anti-unification for unranked terms and hedges that may contain term and hedge variables. The anti-unification problem of two hedges -1 and -2 is concerned with finding their generalization, a hedge q such that both -1 and -2 are instances of q under some substitutions. Hedge variables help to fill in gaps in generalizations, while term variables abstract single (sub)terms with different top function symbols. First, we design a complete and minimal algorithm to compute least general generalizations. Then, we improve the efficiency of the algorithm by restricting possible alternatives permitted in the generalizations. The restrictions are imposed with the help of a rigidity function, which is a parameter in the improved algorithm and selects certain common subsequences from the hedges to be generalized. The obtained rigid anti-unification algorithm is further made more precise by permitting combination of hedge and term variables in generalizations. Finally, we indicate a possible application of the algorithm in software engineering

This research has been partially supported by the Spanish Ministerio de Economía y Competitividad under the projects HeLo (TIN2012-33042) and TASSAT (TIN2010-20967-C04-01), by the EC FP6 for Integrated Infrastructures Initiatives under the project SCIEnce (contract No. 026133), by the Austrian Science Fund (FWF) under the project SToUT (P 24087-N18), and by the Generalitat de Catalunya under the grant AGAUR 2009-SGR-1434

Springer Verlag

Director: Ministerio de Economía y Competitividad (Espanya)
Generalitat de Catalunya. Agència de Gestió d’Ajuts Universitaris i de Recerca
Autor: Kutsia, Temur
Levy, Jordi
Villaret i Ausellé, Mateu
Resum: We study anti-unification for unranked terms and hedges that may contain term and hedge variables. The anti-unification problem of two hedges -1 and -2 is concerned with finding their generalization, a hedge q such that both -1 and -2 are instances of q under some substitutions. Hedge variables help to fill in gaps in generalizations, while term variables abstract single (sub)terms with different top function symbols. First, we design a complete and minimal algorithm to compute least general generalizations. Then, we improve the efficiency of the algorithm by restricting possible alternatives permitted in the generalizations. The restrictions are imposed with the help of a rigidity function, which is a parameter in the improved algorithm and selects certain common subsequences from the hedges to be generalized. The obtained rigid anti-unification algorithm is further made more precise by permitting combination of hedge and term variables in generalizations. Finally, we indicate a possible application of the algorithm in software engineering
This research has been partially supported by the Spanish Ministerio de Economía y Competitividad under the projects HeLo (TIN2012-33042) and TASSAT (TIN2010-20967-C04-01), by the EC FP6 for Integrated Infrastructures Initiatives under the project SCIEnce (contract No. 026133), by the Austrian Science Fund (FWF) under the project SToUT (P 24087-N18), and by the Generalitat de Catalunya under the grant AGAUR 2009-SGR-1434
Accés al document: http://hdl.handle.net/2072/299918
Llenguatge: eng
Editor: Springer Verlag
Drets: Attribution 3.0 Spain
URI Drets: http://creativecommons.org/licenses/by/3.0/es/
Matèria: Algorismes computacionals
Computer algorithms
Lògica matemàtica
Logic, Symbolic and mathematical
Complexitat computacional
Computational complexity
Títol: Anti-unification for unranked terms and hedges
Tipus: info:eu-repo/semantics/article
Repositori: Recercat

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