Usmeravanje pretrage u automatskom dokazivanju teorema

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Usmeravanje pretrage u automatskom dokazivanju teorema

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dc.contributor.advisor Janičić, Predrag
dc.contributor.author Nikolić, Mladen
dc.date.accessioned 2013-05-08T08:44:58Z
dc.date.available 2013-05-08T08:44:58Z
dc.date.issued 2013
dc.identifier.uri http://hdl.handle.net/123456789/2584
dc.description.abstract In this thesis the problem of guiding search in automated theorem proving is considered. The thesis consists of two parts that have the CDCL search system, the system intensively used by modern SAT solvers, as their common topic. In the rst part of the thesis a simple approach to guiding search is considered | guiding by the selection of the solver, its heuristics, and their parameters, based on the properties of an instance to be solved. The basis of the proposed methods for algorithm selection is syntactical similarity of formulae which is re ected in their graph structure. This graph similarity is established and analyzed by using an original graph similarity measure (which turned out to be useful in other contexts, too). Yet, practical approaches to measuring similarity of formulae are based on their numerical features due to the computational complexity issues. Two simple methods for algorithm selection, based on k nearest neighbors, were proposed. The rst technique, ArgoSmArT is based on classi cation of instance in one of the prede ned families for which the e cient algorithms are known. The instance is solved by algorithm corresponding to the family to which the instance was classi ed. The second technique, ArgoSmArT k-NN is based on nding several similar instances in the training set for which the solving times by all considered algorithms are known. The instance is solved by the algorithm that behaves the best on those instances. ArgoSmArT technique is better suited for con guration selection of a SAT solver, and ArgoSmArT k-NN for SAT solver selection. ArgoSmArT k-NN technique showed to be more e cient than the most important and very complex system for SAT solver selection | SATzilla system. Apart from CNF SAT solver selection, the problem of non-CNF SAT solver selection is considered. The focus was not on solver selection techniques, since the proposed techniques are directly applicable, but on the attributes that can be used to describe non-CNF SAT instances, which have not been proposed earlier. The results in this domain are positive, but still limited. The main reason for that is the lack of greater number of non-CNF SAT solver of di erent behaviour, which is not surprising, having in mind that this kind of solvers is in its early stage of development. Apart from construction of e cient SAT solver selection system, the methodology of SAT solver comparison, based on statistical hypothesis testing is proposed. The need for such a methodology comes from great run time variations of single instance solving by a solver, which can result in di erent SAT solver orderings when one tries to compare their performance or rank them, as experimentally demonstrated. The proposed methodology gives the estimate of statistical signi cance of the performed test and the estimate of the e ect size, for instance the probability of a solver being faster than another. The second part of the thesis is concerned with generalizing CDCL search system to fragments of rst order logic. The proposed system can be used as a basis for e cient proving in some fragment if the rules of resolution and factoring are speci ed for that fragment. These rules are de ned for an extension of coherent logic. The soundness and completeness of the system are proved. The system has several distinguishing features which are a consequence of previously performed analysis of challenges in coherent logic theorem proving. The system enables rst order reasoning, instead of ground one characteristic for all existing coherent logic provers. Moreover, it introduces backjumps and lemma learning. The special attention in system design was paid to the possibility of generating readable proofs by the prover implementing the system. This possibility is one of the greatest qualities of coherent logic, but it is not easy to achieve if CDCL search system is used. One of the properties of the system that came from the need for generation of readable proofs is preservation of quanti ers in proving process which is rather unusual for existing CDCL systems. Another advantage of the proposed CDCL system is the possibility of transfer of heuristics which are already successfully employed in SAT solving to other domains. Based on the proposed system, the proof procedure Calypso for extended coherent logic was de ned which can also be used in standard coherent logic. The extension of Rete algorithm which enables detection of con icts and literals to be propagated or decided is proposed. Procedure Claypso is implemented in C++. It was evaluated on a representative coherent logic problems and it showed superior to other coherent logic provers and also the prover Vampire, the most e cient prover for rst order logic. Based on the results presented in this thesis, it can be concluded that the main hypothesis of this work, that the search system used in CDCL SAT solvers can be signi cantly improved by simple guiding and that it can be successfully formulated for fragments of rst order logic such as coherent logic, was con rmed and that the concrete answers on how to do that were provided. en_US
dc.description.provenance Submitted by Slavisha Milisavljevic (slavisha) on 2013-05-08T08:44:58Z No. of bitstreams: 1 nikolic_mladen.pdf: 1448541 bytes, checksum: 10daea125dffa7d9e3c0d0b98b05c751 (MD5) en
dc.description.provenance Made available in DSpace on 2013-05-08T08:44:58Z (GMT). No. of bitstreams: 1 nikolic_mladen.pdf: 1448541 bytes, checksum: 10daea125dffa7d9e3c0d0b98b05c751 (MD5) Previous issue date: 2013 en
dc.format.mimetype PDF en_US
dc.language.iso sr en_US
dc.publisher Belgrade en_US
dc.title Usmeravanje pretrage u automatskom dokazivanju teorema en_US
mf.author.birth-date 1981-07-03
mf.author.birth-place Belgrade en_US
mf.author.birth-country Serbia en_US
mf.author.residence-state Serbian en_US
mf.author.citizenship Serbian en_US
mf.author.nationality Serbian en_US
mf.subject.area Računarstvo i informatika en_US
mf.subject.keywords automatsko dokazivanje teorema, pretraga, SAT rešavači en_US
mf.subject.subarea Automatsko dokazivanje teorema en_US
mf.contributor.committee Marić, Filip
mf.contributor.committee Ognjanović, Zoran
mf.university.faculty Mathematical en_US
mf.document.references 101 en_US
mf.document.pages 133 en_US
mf.document.location Belgrade en_US
mf.document.genealogy-project No en_US
mf.author.parent Stevan en_US
mf.university Belgrade en_US

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