Search results for " matematici"

showing 10 items of 273 documents

Fixed points of nonlinear sigma models in d>2

2009

Using Wilsonian methods, we study the renormalization group flow of the Nonlinear Sigma Model in any dimension $d$, restricting our attention to terms with two derivatives. At one loop we always find a Ricci flow. When symmetries completely fix the internal metric, we compute the beta function of the single remaining coupling, without any further approximation. For $d>2$ and positive curvature, there is a nontrivial fixed point, which could be used to define an ultraviolet limit, in spite of the perturbative nonrenormalizability of the theory. Potential applications are briefly mentioned.

High Energy Physics - TheoryPhysicsNuclear and High Energy PhysicsWilson loopSigma modelFixed pointRenormalization groupCurvatureSettore FIS/02 - Fisica Teorica Modelli e Metodi Matematicisymbols.namesakeFlow (mathematics)Quantum electrodynamicssymbolsLimit (mathematics)Beta functionMathematical physicsPhysics Letters B
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Spatial correlations of field observables in two half-spaces separated by a movable perfect mirror

2023

We consider a system of two cavities separated by a reflecting boundary of finite mass that is free to move, and bounded to its equilibrium position by a harmonic potential. This yields an effective mirror-field interaction, as well as an effective interaction between the field modes mediated by the movable boundary. Two massless scalar fields are defined in each cavity. We consider the second-order interacting ground state of the system, that contains virtual excitations of both mirror's degrees of freedom and of the scalar fields. We investigate the correlation functions between field observables in the two cavities, and find that the squared scalar fields in the two cavities, in the inte…

High Energy Physics - TheoryQuantum PhysicsSettore FIS/02 - Fisica Teorica Modelli E Metodi MatematiciHigh Energy Physics - Theory (hep-th)FOS: Physical sciencesVacuum Field Fluctuations Dynamical Casimir Effect Quantum Field TheoryQuantum Physics (quant-ph)Settore FIS/03 - Fisica Della Materia
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Critical reflections on asymptotically safe gravity

2020

Asymptotic safety is a theoretical proposal for the ultraviolet completion of quantum field theories, in particular for quantum gravity. Significant progress on this program has led to a first characterization of the Reuter fixed point. Further advancement in our understanding of the nature of quantum spacetime requires addressing a number of open questions and challenges. Here, we aim at providing a critical reflection on the state of the art in the asymptotic safety program, specifying and elaborating on open questions of both technical and conceptual nature. We also point out systematic pathways, in various stages of practical implementation, towards answering them. Finally, we also take…

High Energy Physics - TheoryReflection (computer programming)Computer scienceEffective field theoryMaterials Science (miscellaneous)Asymptotic safety in quantum gravityBiophysicsGeneral Physics and AstronomyUnitarityFixed pointQuantum spacetime01 natural sciences530General Relativity and Quantum CosmologyTheoretical High Energy Physics0103 physical sciencesCalculusddc:530High Energy PhysicsQuantum gravitationQuantum field theoryPhysical and Theoretical Chemistry010306 general physicsRunning couplingsMathematical PhysicsStructure (mathematical logic)ObservablesObservablelcsh:QC1-999Asymptotic safetySettore FIS/02 - Fisica Teorica Modelli e Metodi MatematiciQuantum gravityRenormalization grouplcsh:Physics
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Oh, wait, O8 de Sitter may be unstable!

2021

We analyze the stability of four-dimensional de Sitter vacua constructed by compactifying massive Type IIA supergravity in the presence of two O8 sources [1]. When embedded in String Theory the first source has a clear interpretation as an O8$_-$ plane, but the second one could correspond to either an O8$_+$ plane or to an O8$_-$ plane with 16 D8-branes on top. We find that this latter solution has a tachyonic instability, corresponding to the D8-branes moving away from the O8$_-$ plane. We comment on the possible ways of distinguishing between these sources.

High Energy Physics - Theoryvacuum state: de SitterNuclear and High Energy PhysicsSettore FIS/02 - Fisica Teorica Modelli E Metodi Matematicidimension: 4compactificationSuperstring VacuaFOS: Physical sciencesD-braneString theory01 natural sciencessupergravity: Type IIADe Sitter universeFlux compactifications0103 physical sciencesC++ string handlingBrane cosmologylcsh:Nuclear and particle physics. Atomic energy. RadioactivityD-brane010306 general physicsMathematical physicsPhysicsCompactification (physics)010308 nuclear & particles physicsPlane (geometry)[PHYS.HTHE]Physics [physics]/High Energy Physics - Theory [hep-th]Supergravitytachyon: stabilitySuperstring Vacua D-branes Flux compactificationsHigh Energy Physics - Theory (hep-th)D-branesstringlcsh:QC770-798
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Multi-boson block factorization of fermions

2017

The numerical computations of many quantities of theoretical and phenomenological interest are plagued by statistical errors which increase exponentially with the distance of the sources in the relevant correlators. Notable examples are baryon masses and matrix elements, the hadronic vacuum polarization and the light-by-light scattering contributions to the muon g-2, and the form factors of semileptonic B decays. Reliable and precise determinations of these quantities are very difficult if not impractical with state-of-the-art standard Monte Carlo integration schemes. I will review a recent proposal for factorizing the fermion determinant in lattice QCD that leads to a local action in the g…

High Energy Physics::Latticeaction: local01 natural sciencesHigh Energy Physics - Phenomenology (hep-ph)Vacuum polarizationcorrelation functionQuantum Chromodynamics Lattice gauge theory Computational PhysicsMonte CarloBosonPhysicsform factorPhysicsHigh Energy Physics - Lattice (hep-lat)lattice field theoryPropagatorpropagator [quark]hep-phParticle Physics - Latticestatistical [error]Lattice QCDFIS/02 - FISICA TEORICA MODELLI E METODI MATEMATICIHigh Energy Physics - Phenomenologyerror: statisticalquark: factorizationquark: propagatorMonte Carlo integrationQuarkParticle physicsQC1-999fermion: determinantdeterminant [fermion]FOS: Physical scienceshep-latbaryon: massHigh Energy Physics - LatticeFactorization0103 physical sciencesmagnetic moment [muon]hadronic [vacuum polarization]010306 general physicsnumerical calculationsParticle Physics - Phenomenologymuon: magnetic moment010308 nuclear & particles physicsvacuum polarization: hadronicHigh Energy Physics::Phenomenologyphoton photon: scatteringB: decaylocal [action]Fermiondecay [B]mass [baryon]scattering [photon photon]gauge field theoryHigh Energy Physics::Experimentfactorization [quark]
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Study of the Effects of Nuclear Motion on High Harmonic Generation in Simple Molecules

2010

High order harmonic generationSettore FIS/02 - Fisica Teorica Modelli E Metodi MatematiciNuclear motionSettore FIS/03 - Fisica Della Materia
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Universality of Schmidt decomposition and particle identity

2017

Schmidt decomposition is a widely employed tool of quantum theory which plays a key role for distinguishable particles in scenarios such as entanglement characterization, theory of measurement and state purification. Yet, it is held not to exist for identical particles, an open problem forbidding its application to analyze such many-body quantum systems. Here we prove, using a newly developed approach, that the Schmidt decomposition exists for identical particles and is thus universal. We find that it is affected by single-particle measurement localization and state overlap. We study paradigmatic two-particle systems where identical qubits and qutrits are located in the same place or in sep…

Identical ParticleQutritSettore FIS/02 - Fisica Teorica Modelli E Metodi MatematiciSchmidt decompositionIdentical Particles; Schmidt Decomposition; Quantum Entanglement; Qubit; QutritOpen problemFOS: Physical sciences02 engineering and technologyQuantum entanglement01 natural sciencesArticleSettore FIS/03 - Fisica Della MateriaSchmidt Decomposition0103 physical sciencesStatistical physicsQuantum information010306 general physicsQuantumPhysicsQuantum PhysicsMultidisciplinaryQuantum Physics021001 nanoscience & nanotechnologyUniversality (dynamical systems)QubitQubitQuantum Entanglement0210 nano-technologyQuantum Physics (quant-ph)Identical particles
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Radon transform as a set of probability distributions

2009

It is proved that the Radon transform of the Wigner function gives the probability distributions related to measuring the observable operators obtained as linear combinations of position and momentum of the relevant particle. The generalization to an arbitrary number of degrees of freedom is given.

Integral transformsOptical tomographySettore FIS/02 - Fisica Teorica Modelli E Metodi MatematiciRadon transformCharacteristic function (probability theory)Mathematical analysisWigner semicircle distributionCondensed Matter PhysicsConvolution of probability distributionsAtomic and Molecular Physics and OpticsSettore FIS/03 - Fisica Della MateriaRegular conditional probabilityProbability distributionWigner distribution functionQuantum tomographyMathematical PhysicsMathematicsK-distribution
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Learning, regularization and ill-posed inverse problems

2005

Many works have shown that strong connections relate learning from examples to regularization techniques for ill-posed inverse problems. Nevertheless by now there was no formal evidence neither that learning from examples could be seen as an inverse problem nor that theoretical results in learning theory could be independently derived using tools from regularization theory. In this paper we provide a positive answer to both questions. Indeed, considering the square loss, we translate the learning problem in the language of regularization theory and show that consistency results and optimal regularization parameter choice can be derived by the discretization of the corresponding inverse prob…

Inverse problemsRegularization theoryStatistical LearningIll-Posed Inverse ProblemsSettore FIS/02 - Fisica Teorica Modelli E Metodi MatematiciLearning theory; Inverse problems; Regularization TheoryLearning theoryStatistical Learning; Regularization theory; Ill-Posed Inverse ProblemsMachine learningRegularization TheorySettore FIS/03 - Fisica Della Materia
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Voltage drop across Josephson junctions for L\'evy noise detection

2020

We propose to characterize L\'evy-distributed stochastic fluctuations through the measurement of the average voltage drop across a current-biased Josephson junction. We show that the noise induced switching process in the Josephson washboard potential can be exploited to reveal and characterize L\'evy fluctuations, also if embedded in a thermal noisy background. The measurement of the average voltage drop as a function of the noise intensity allows to infer the value of the stability index that characterizes L\'evy-distributed fluctuations. An analytical estimate of the average velocity in the case of a L\'evy-driven escape process from a metastable state well agrees with the numerical calc…

Josephson effectPhysicsWork (thermodynamics)Settore FIS/02 - Fisica Teorica Modelli E Metodi MatematiciCondensed Matter - Mesoscale and Nanoscale PhysicsCondensed Matter - SuperconductivityFunction (mathematics)Condensed Matter::Mesoscopic Systems and Quantum Hall EffectSignalLévy noiseJosephson junctionCondensed Matter::SuperconductivityMetastabilityThermalstochastic processesStatistical physicsVoltage dropQuantum tunnelling
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