Search results for "Quantum cellular automaton"

showing 10 items of 24 documents

Research of Complex Forms in Cellular Automata by Evolutionary Algorithms

2004

This paper presents an evolutionary approach for the search for new complex cellular automata. Two evolutionary algorithms are used: the first one discovers rules supporting gliders and periodic patterns, and the second one discovers glider guns in cellular automata. An automaton allowing us to simulate AND and NOT gates is discovered. The results are a step toward the general simulation of Boolean circuits by this automaton and show that the evolutionary approach is a promising technic for searching for cellular automata that support universal computation.

Block cellular automatonTheoryofComputation_COMPUTATIONBYABSTRACTDEVICESComputer sciencebusiness.industryBoolean circuitComputationGrowCut algorithmContinuous automatonTimed automatonNonlinear Sciences::Cellular Automata and Lattice GasesCellular automatonAutomatonMobile automatonStochastic cellular automatonElementary cellular automatonDeterministic automatonContinuous spatial automatonAutomata theoryArtificial intelligencebusinessComputer Science::Formal Languages and Automata TheoryAsynchronous cellular automatonQuantum cellular automaton
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Superiority Of One-Way And Realtime Quantum Machines

2012

In automata theory, quantum computation has been widely examined for finite state machines, known as quantum finite automata (QFAs), and less attention has been given to QFAs augmented with counters or stacks. In this paper, we focus on such generalizations of QFAs where the input head operates in one-way or realtime mode, and present some new results regarding their superiority over their classical counterparts. Our first result is about the nondeterministic acceptance mode: Each quantum model architecturally intermediate between realtime finite state automaton and one-way pushdown automaton (one-way finite automaton, realtime and one-way finite automata with one-counter, and realtime push…

Discrete mathematicsFinite-state machineTheoryofComputation_COMPUTATIONBYABSTRACTDEVICESGeneral MathematicsPushdown automaton0102 computer and information sciences02 engineering and technologyω-automaton01 natural sciencesComputer Science ApplicationsNondeterministic algorithmTheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES010201 computation theory & mathematics0202 electrical engineering electronic engineering information engineeringQuantum finite automataAutomata theory020201 artificial intelligence & image processingAlgorithmSoftwareComputer Science::Formal Languages and Automata TheoryQuantum cellular automatonMathematicsQuantum computer
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Language Recognition Power and Succinctness of Affine Automata

2016

In this work we study a non-linear generalization based on affine transformations of probabilistic and quantum automata proposed recently by Diaz-Caro and Yakaryilmaz [6] referred as affine automata. First, we present efficient simulations of probabilistic and quantum automata by means of affine automata which allows us to characterize the class of exclusive stochastic languages. Then, we initiate a study on the succintness of affine automata. In particular, we show that an infinite family of unary regular languages can be recognized by 2-state affine automata, whereas the number of states of any quantum and probabilistic automata cannot be bounded. Finally, we present the characterization …

Discrete mathematicsNested word0102 computer and information sciences02 engineering and technologyω-automatonNonlinear Sciences::Cellular Automata and Lattice Gases01 natural sciencesMobile automaton010201 computation theory & mathematicsContinuous spatial automaton0202 electrical engineering electronic engineering information engineeringAutomata theoryQuantum finite automata020201 artificial intelligence & image processingAffine transformationComputer Science::Formal Languages and Automata TheoryMathematicsQuantum cellular automaton
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Quantum Pushdown Automata

2000

Quantum finite automata, as well as quantum pushdown automata were first introduced by C. Moore, J. P. Crutchfield [13]. In this paper we introduce the notion of quantum pushdown automata (QPA) in a non-equivalent way, including unitarity criteria, by using the definition of quantum finite automata of [11]. It is established that the unitarity criteria of QPA are not equivalent to the corresponding unitarity criteria of quantum Turing machines [4]. We show that QPA can recognize every regular language. Finally we present some simple languages recognized by QPA, two of them are not recognizable by deterministic pushdown automata and one seems to be not recognizable by probabilistic pushdown …

Discrete mathematicsNested wordComputer scienceDeterministic context-free grammarContext-free languagePushdown automatonNonlinear Sciences::Cellular Automata and Lattice GasesEmbedded pushdown automatonDeterministic pushdown automatonTuring machinesymbols.namesakeRegular languageDeterministic automatonProbabilistic automatonsymbolsQuantum finite automataAutomata theoryComputer Science::Formal Languages and Automata TheoryQuantum cellular automaton
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Postselection Finite Quantum Automata

2010

Postselection for quantum computing devices was introduced by S. Aaronson[2] as an excitingly efficient tool to solve long standing problems of computational complexity related to classical computing devices only. This was a surprising usage of notions of quantum computation. We introduce Aaronson's type postselection in quantum finite automata. There are several nonequivalent definitions of quantumfinite automata. Nearly all of them recognize only regular languages but not all regular languages. We prove that PALINDROMES can be recognized by MM-quantum finite automata with postselection. At first we prove by a direct construction that the complement of this language can be recognized this …

Discrete mathematicsNested wordTheoretical computer scienceComputer Science::Computational Complexityω-automatonNonlinear Sciences::Cellular Automata and Lattice GasesDeterministic finite automatonDFA minimizationQuantum finite automataAutomata theoryNondeterministic finite automatonComputer Science::Formal Languages and Automata TheoryMathematicsQuantum cellular automaton
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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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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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Superiority of exact quantum automata for promise problems

2011

In this note, we present an infinite family of promise problems which can be solved exactly by just tuning transition amplitudes of a two-state quantum finite automata operating in realtime mode, whereas the size of the corresponding classical automata grow without bound.

FOS: Computer and information sciencesFormal Languages and Automata Theory (cs.FL)Timed automatonFOS: Physical sciencesComputer Science - Formal Languages and Automata Theory0102 computer and information sciencesω-automatonComputational Complexity (cs.CC)01 natural sciencesTheoretical Computer ScienceDeterministic automatonApplied mathematicsQuantum finite automataTwo-way deterministic finite automatonNondeterministic finite automaton0101 mathematicsMathematicsDiscrete mathematicsQuantum Physics010102 general mathematicsComputer Science ApplicationsComputer Science - Computational Complexity010201 computation theory & mathematicsSignal ProcessingAutomata theoryQuantum Physics (quant-ph)Computer Science::Formal Languages and Automata TheoryInformation SystemsQuantum cellular automaton
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Mathematical logic and quantum finite state automata

2009

AbstractThis paper is a review of the connection between formulas of logic and quantum finite-state automata in respect to the language recognition and acceptance probability of quantum finite-state automata. As is well known, logic has had a great impact on classical computation, it is promising to study the relation between quantum finite-state automata and mathematical logic. After a brief introduction to the connection between classical computation and logic, the required background of the logic and quantum finite-state automata is provided and the results of the connection between quantum finite-state automata and logic are presented.

General Computer ScienceMeasure-many quantum finite-state automataComputational logicMultimodal logicQuantum dot cellular automatonIntermediate logicMeasure-once quantum finite-state automataNonlinear Sciences::Cellular Automata and Lattice GasesTheoretical Computer ScienceAlgebraTheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGESModular logicComputerSystemsOrganization_MISCELLANEOUSComputer Science::Logic in Computer ScienceQuantum finite automataDynamic logic (modal logic)Automata theoryQuantum finite-state automataFirst-order logicAlgorithmComputer Science::Formal Languages and Automata TheoryMathematicsQuantum cellular automatonComputer Science(all)Theoretical Computer Science
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