Search results for "Formal languages"

showing 10 items of 322 documents

On the size of transducers for bidirectional decoding of prefix codes

2012

In a previous paper [L. Giambruno and S. Mantaci, Theoret. Comput. Sci. 411 (2010) 1785–1792] a bideterministic transducer is defined for the bidirectional deciphering of words by the method introduced by Girod [ IEEE Commun. Lett. 3 (1999) 245–247]. Such a method is defined using prefix codes. Moreover a coding method, inspired by the Girod’s one, is introduced, and a transducer that allows both right-to-left and left-to-right decoding by this method is defined. It is proved also that this transducer is minimal. Here we consider the number of states of such a transducer, related to some features of the considered prefix code X . We find some bounds of such a number of states in relation wi…

Discrete mathematicsPrefix codeBlock codeSettore INF/01 - InformaticaGeneral MathematicsConcatenated error correction codeprefix codeList decodingSerial concatenated convolutional codesSequential decodingLinear codeComputer Science ApplicationsPrefixbilateral decodingVariable length codetransducersAlgorithmComputer Science::Formal Languages and Automata TheorySoftwareMathematics

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DEFECT THEOREMS FOR TREES

2000

We generalize different notions of a rank of a set of words to sets of trees. We prove that almost all of those ranks can be used to formulate a defect theorem. However, as we show, the prefix rank forms an exception.

Discrete mathematicsPrefixCombinatoricsSet (abstract data type)Combinatorics on wordsAlgebra and Number TheoryComputational Theory and MathematicsInformationSystems_INFORMATIONSTORAGEANDRETRIEVALRank (graph theory)Computer Science::Formal Languages and Automata TheoryInformation SystemsTheoretical Computer ScienceMathematicsDevelopments In Language Theory

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Quantum Finite Multitape Automata

1999

Quantum finite automata were introduced by C. Moore, J. P. Crutchfield [4], and by A. Kondacs and J. Watrous [3]. This notion is not a generalization of the deterministic finite automata. Moreover, in [3] it was proved that not all regular languages can be recognized by quantum finite automata. A. Ambainis and R. Freivalds [1] proved that for some languages quantum finite automata may be exponentially more concise rather than both deterministic and probabilistic finite automata. In this paper we introduce the notion of quantum finite multitape automata and prove that there is a language recognized by a quantum finite automaton but not by deterministic or probabilistic finite automata. This …

Discrete mathematicsProbabilistic finite automataFinite-state machineNested wordComputer scienceDeterministic context-free grammarTimed automatonω-automatonNonlinear Sciences::Cellular Automata and Lattice GasesAutomatonMobile automatonNondeterministic finite automaton with ε-movesDeterministic finite automatonDFA minimizationRegular languageDeterministic automatonProbabilistic automatonContinuous spatial automatonAutomata theoryQuantum finite automataTwo-way deterministic finite automatonNondeterministic finite automatonComputer Science::Formal Languages and Automata TheoryQuantum cellular automaton

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Probabilistic Reversible Automata and Quantum Automata

2002

To study relationship between quantum finite automata and probabilistic finite automata, we introduce a notion of probabilistic reversible automata (PRA, or doubly stochastic automata). We find that there is a strong relationship between different possible models of PRA and corresponding models of quantum finite automata. We also propose a classification of reversible finite 1-way automata.

Discrete mathematicsProbabilistic finite automataNested wordComputer scienceTimed automatonω-automatonNonlinear Sciences::Cellular Automata and Lattice GasesMobile automatonAutomatonStochastic cellular automatonDeterministic finite automatonDFA minimizationContinuous spatial automatonAutomata theoryQuantum finite automataNondeterministic finite automatonComputer Science::Formal Languages and Automata TheoryQuantum cellular automaton

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Implications of quantum automata for contextuality

2014

We construct zero error quantum finite automata (QFAs) for promise problems which cannot be solved by bounded error probabilistic finite automata (PFAs). Here is a summary of our results: There is a promise problem solvable by an exact two way QFA in exponential expected time but not by any bounded error sublogarithmic space probabilistic Turing machine (PTM). There is a promise problem solvable by an exact two way QFA in quadratic expected time but not by any bounded error o(loglogn) space PTMs in polynomial expected time. The same problem can be solvable by a one way Las Vegas (or exact two way) QFA with quantum head in linear (expected) time. There is a promise problem solvable by a Las …

Discrete mathematicsProbabilistic finite automataTheoryofComputation_COMPUTATIONBYABSTRACTDEVICESQuantum automata0102 computer and information sciencesConstruct (python library)Nonlinear Sciences::Cellular Automata and Lattice Gases01 natural sciencesKochen–Specker theoremTheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES010201 computation theory & mathematics0103 physical sciencesQuantum finite automataPromise problem010306 general physicsComputer Science::Formal Languages and Automata TheoryMathematics

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Quantum Finite State Transducers

2001

We introduce quantum finite state transducers (qfst), and study the class of relations which they compute. It turns out that they share many features with probabilistic finite state transducers, especially regarding undecidability of emptiness (at least for low probability of success). However, like their 'little brothers', the quantum finite automata, the power of qfst is incomparable to that of their probabilistic counterpart. This we show by discussing a number of characteristic examples.

Discrete mathematicsPure mathematicsFinite-state machineDeterministic finite automatonComputer scienceComputer Science::Logic in Computer ScienceProbabilistic logicQuantum finite automataNondeterministic finite automatonState diagramQuantumComputer Science::Formal Languages and Automata TheoryQuantum computer

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Improved constructions of quantum automata

2008

We present a simple construction of quantum automata which achieve an exponential advantage over classical finite automata. Our automata use \frac{4}{\epsilon} \log 2p + O(1) states to recognize a language that requires p states classically. The construction is both substantially simpler and achieves a better constant in the front of \log p than the previously known construction of Ambainis and Freivalds (quant-ph/9802062). Similarly to Ambainis and Freivalds, our construction is by a probabilistic argument. We consider the possibility to derandomize it and present some results in this direction.

Discrete mathematicsQuantum PhysicsFinite-state machineTheoryofComputation_COMPUTATIONBYABSTRACTDEVICESGeneral Computer ScienceFOS: Physical sciencesω-automatonComputer Science::Computational ComplexityNonlinear Sciences::Cellular Automata and Lattice GasesMobile automatonTheoretical Computer ScienceQuantum finite automataQuantum computationAutomata theoryQuantum finite automataNondeterministic finite automatonExponential advantageQuantum Physics (quant-ph)Computer Science::Formal Languages and Automata TheoryMathematicsQuantum computerQuantum cellular automatonComputer Science(all)

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Improved constructions of mixed state quantum automata

2009

Quantum finite automata with mixed states are proved to be super-exponentially more concise rather than quantum finite automata with pure states. It was proved earlier by A. Ambainis and R. Freivalds that quantum finite automata with pure states can have an exponentially smaller number of states than deterministic finite automata recognizing the same language. There was an unpublished ''folk theorem'' proving that quantum finite automata with mixed states are no more super-exponentially more concise than deterministic finite automata. It was not known whether the super-exponential advantage of quantum automata is really achievable. We prove that there is an infinite sequence of distinct int…

Discrete mathematicsQuantum algorithmsNested wordPermutation groupsGeneral Computer Scienceω-automatonTheoretical Computer ScienceCombinatoricsDeterministic finite automatonDFA minimizationDeterministic automatonQuantum finite automataAutomata theoryNondeterministic finite automatonFinite automataComputer Science::Formal Languages and Automata TheoryMathematicsComputer Science(all)Theoretical Computer Science

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Circular sturmian words and Hopcroft’s algorithm

2009

AbstractIn order to analyze some extremal cases of Hopcroft’s algorithm, we investigate the relationships between the combinatorial properties of a circular sturmian word (x) and the run of the algorithm on the cyclic automaton Ax associated to (x). The combinatorial properties of words taken into account make use of sturmian morphisms and give rise to the notion of reduction tree of a circular sturmian word. We prove that the shape of this tree uniquely characterizes the word itself. The properties of the run of Hopcroft’s algorithm are expressed in terms of the derivation tree of the automaton, which is a tree that represents the refinement process that, in the execution of Hopcroft’s alg…

Discrete mathematicsReduction (recursion theory)Fibonacci numberGeneral Computer ScienceHopcroft'algorithmSturmian wordSturmian wordSturmian morphismsTheoretical Computer ScienceCombinatoricsTree (descriptive set theory)TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGESComputer Science::Discrete MathematicsDeterministic automatonHopcroft’s minimization algorithmCircular sturmian wordsTree automatonDeterministic finite state automataTime complexityAlgorithmComputer Science::Formal Languages and Automata TheoryWord (group theory)Computer Science(all)MathematicsTheoretical Computer Science

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General decidability theorems for infinite-state systems

2002

Over the last few years there has been an increasing research effort directed towards the automatic verification of infinite state systems. This paper is concerned with identifying general mathematical structures which can serve as sufficient conditions for achieving decidability. We present decidability results for a class of systems (called well-structured systems), which consist of a finite control part operating on an infinite data domain. The results assume that the data domain is equipped with a well-ordered and well-founded preorder such that the transition relation is "monotonic" (is a simulation) with respect to the preorder. We show that the following properties are decidable for …

Discrete mathematicsRelation (database)ReachabilityData domainPreorderMathematical structurePetri netComputer Science::Formal Languages and Automata TheoryAutomatonDecidabilityMathematics

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