Search results for "algebraic number theory"

showing 5 items of 5 documents

Non-commutative Ring Learning with Errors from Cyclic Algebras

2022

AbstractThe Learning with Errors (LWE) problem is the fundamental backbone of modern lattice-based cryptography, allowing one to establish cryptography on the hardness of well-studied computational problems. However, schemes based on LWE are often impractical, so Ring LWE was introduced as a form of ‘structured’ LWE, trading off a hard to quantify loss of security for an increase in efficiency by working over a well-chosen ring. Another popular variant, Module LWE, generalizes this exchange by implementing a module structure over a ring. In this work, we introduce a novel variant of LWE over cyclic algebras (CLWE) to replicate the addition of the ring structure taking LWE to Ring LWE by add…

algebraic number theorylukuteoriaApplied Mathematicsparantaminen (paremmaksi muuttaminen)algebrapost-quantum cryptographykryptografiaComputer Science Applicationsnon-commutative algebralatticessalausvirheetvirheanalyysiSoftwarelearning with errorstietojärjestelmätJournal of Cryptology
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Skaitļu teorija: lekcijas, lasītas Latvijas Universitātes Matemātikas un dabas zinātņu fakultātē

1936

Lekcijas sakārtojis Fogels, Ernests ; rediģējis Lūsis, Arvīds.

Algebraic number theoryNumber theoryAritmētiskās funkcijas:MATHEMATICS::Applied mathematics::Numerical analysis [Research Subject Categories]Arithmetic functionsNumbers rationalMatemātikaKongruenti skaitļiAlgebriskā skaitļu teorijaSkaitļu teorijaSkaitļi racionālie
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Quantum systems with fractal spectra

2002

Abstract We study Hamiltonians with singular spectra of Cantor type with a constant ratio of dissection and show strict connections between the decay properties of the states in the singular subspace and the algebraic number theory. More specifically, we study the decay properties of free n-particle systems and the computability of decaying and non-decaying states in the singular continuous subspace.

General MathematicsApplied MathematicsAlgebraic number theoryComputabilityMathematical analysisGeneral Physics and AstronomyStatistical and Nonlinear PhysicsType (model theory)Spectral lineFractalHigh Energy Physics::ExperimentConstant (mathematics)QuantumSubspace topologyMathematical physicsMathematicsChaos, Solitons & Fractals
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On Computability of Decaying and Nondecaying States in Quantum Systems with Cantor Spectra

2003

We study Hamiltonians with singular spectra of Cantor type with a constant ratio of dissection. The decay properties of the states in such systems depend on the nature of the dissection rate that can be characterized in terms of the algebraic number theory. We show that in spite of simplicity of the considered model the computational modeling of nondecaying states is in general impossible.

Physics and Astronomy (miscellaneous)General MathematicsAlgebraic number theoryComputabilitymedia_common.quotation_subjectType (model theory)Spectral lineQuantum mechanicsQuantum systemSimplicityConstant (mathematics)Quantummedia_commonMathematicsMathematical physicsInternational Journal of Theoretical Physics
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Arithmetic hyperbolicity and a stacky Chevalley-Weil theorem

2020

We prove an analogue for algebraic stacks of Hermite-Minkowski's finiteness theorem from algebraic number theory, and establish a Chevalley-Weil type theorem for integral points on stacks. As an application of our results, we prove analogues of the Shafarevich conjecture for some surfaces of general type.

Pure mathematicsConjectureMathematics - Number TheoryGeneral MathematicsAlgebraic number theory010102 general mathematicsType (model theory)01 natural sciencesMathematics - Algebraic Geometry0103 physical sciencesFOS: MathematicsNumber Theory (math.NT)010307 mathematical physics0101 mathematicsAlgebraic numberAlgebraic Geometry (math.AG)Mathematics
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