Search results for "Heisenberg model"

showing 10 items of 33 documents

Classical Heisenberg antiferromagnets with nearest and next-nearest neighbor interactions on the face-centered cubic lattice: a model for EuTe?

1989

Magnetic properties of the Heisenberg antiferromagnet with spin quantum numberS→∞ on the face-centered cubic lattice are studied as function of temperature and magnetic field, using molecular field approximation and Monte Carlo methods. In order to model Europiumtelluride, we use isotropic exchange interactions between nearest- and nextnearest neighbors; the values of these exchange constants are taken from experiments. In addition, a pseudo-dipolar anisotropy (truncated after the next-nearest neighbor distance) is included; the molecular field calculations also are performed with the full dipolar of real EuTe in two respects: the structure in zero magnetic field involves 8 sublattices in t…

PhysicsMagnetizationDipoleCondensed matter physicsHeisenberg modelExchange interactionAntiferromagnetismGeneral Materials ScienceCubic crystal systemCondensed Matter PhysicsElectronic Optical and Magnetic Materialsk-nearest neighbors algorithmMagnetic fieldZeitschrift f�r Physik B Condensed Matter
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Ground-state properties of generalized Heisenberg chains with composite spin.

1988

We consider in detail the ground-state properties of recently introduced generalized Heisenberg models which can have several spin operators at each site and which interpolate smoothly between Heisenberg chains of different spin lengths. We show that the mappings to field-theoretical models used to describe the critical properties of the Heisenberg model remain valid in the composite-spin model. In models which interpolate between the spin-(1/2 and the spin-1 behavior, these mappings predict an extended singlet phase around the isotropic antiferromagnetic point whenever the models move away from the spin-(1/2 point. Numerical calculations on finite chains seem to confirm the existence of th…

PhysicsMathematical modelHeisenberg modelQuantum mechanicsIsotropyCondensed Matter::Strongly Correlated ElectronsSinglet stateAngular momentum operatorGround stateMathematical OperatorsSpin-½Physical review. B, Condensed matter
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A Note on the algebraic approach to the «almost» mean-field Heisenberg model

1993

We generalize to an «almost» mean-field Heisenberg model the algebraic approach already formulated for Ising models. We show that there exists a family of «relevant» states on which the algebraic dynamics αt can be defined. © 1993 Società Italiana di Fisica.

PhysicsPhysics and Astronomy (all)Mean field theoryHeisenberg modelAlgebraic methodExistential quantificationIsing modelAlgebraic numberAlgebraic methodSettore MAT/07 - Fisica MatematicaMathematical physicsIl Nuovo Cimento B Series 11
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Analyzing the enforcement of a high-spin ground state for a metallacrown single-molecule magnet

2016

We have studied element-selective magnetic properties of the hetero- and homometallic metallacrowns $\mathrm{Cu}{(\mathrm{II})}_{2}[12\ensuremath{-}{\mathrm{MC}}_{YN(Shi)}\ensuremath{-}4]$ ($Y=\text{Cu}$, Fe, in short ${\mathrm{CuCu}}_{4}$ and ${\mathrm{CuFe}}_{4}$). These metallacrowns comprise four Fe or Cu ions surrounding a central Cu ion. Using x-ray magnetic circular dichroism we have probed local symmetries, electronic configuration, orbital and spin magnetic moments of the magnetic ions. The ratio between the Cu and Fe moment of $\ensuremath{-}0.11$ is independent of temperature in the range of 15 K to 90 K. The Cu moment shows antiparallel to the Fe moment. For ${\mathrm{CuCu}}_{4}…

PhysicsQuantitative Biology::Neurons and CognitionMagnetic momentMagnetic circular dichroismHeisenberg model010402 general chemistry01 natural sciences0104 chemical sciencesIonCrystallographyNuclear magnetic resonance0103 physical sciencesSingle-molecule magnetElectron configuration010306 general physicsGround stateMetallacrownPhysical Review B
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Numerical tests of conjectures of conformal field theory for three-dimensional systems

1999

The concept of conformal field theory provides a general classification of statistical systems on two-dimensional geometries at the point of a continuous phase transition. Considering the finite-size scaling of certain special observables, one thus obtains not only the critical exponents but even the corresponding amplitudes of the divergences analytically. A first numerical analysis brought up the question whether analogous results can be obtained for those systems on three-dimensional manifolds. Using Monte Carlo simulations based on the Wolff single-cluster update algorithm we investigate the scaling properties of O(n) symmetric classical spin models on a three-dimensional, hyper-cylindr…

PhysicsStatistical Mechanics (cond-mat.stat-mech)Conformal field theoryHeisenberg modelMonte Carlo methodFOS: Physical sciencesGeneral Physics and AstronomyObservableIsing modelBoundary value problemCritical exponentScalingCondensed Matter - Statistical MechanicsMathematical physics
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Thermodynamics of the two-dimensional Heisenberg classical honeycomb lattice

1998

In this article we adapt a previous work concerning the two-dimensional (2D) Heisenberg classical square lattice [Physica B 245, 263 (1998)] to the case of a honeycomb lattice. Closed-form expressions of the main thermodynamic functions of interest are derived in the zero-field limit. Notably, near absolute zero (i.e., the critical temperature), we derive the values of the critical exponents $\ensuremath{\alpha}=0,\ensuremath{\eta}=\ensuremath{-}1,\ensuremath{\gamma}=3,$ and $\ensuremath{\nu}=1,$ as for the square lattice, thus proving their universal character. A very simple model allows one to give a good description of the low-temperature behaviors of the product $\ensuremath{\chi}T.$ Fo…

Physics[PHYS]Physics [physics]010405 organic chemistryHeisenberg modelThermodynamics010402 general chemistryClassical XY model01 natural sciencesSquare lattice0104 chemical sciencesLattice (order)AntiferromagnetismCritical exponentAbsolute zeroLattice model (physics)ComputingMilieux_MISCELLANEOUS
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A universal tensor network algorithm for any infinite lattice

2018

We present a general graph-based Projected Entangled-Pair State (gPEPS) algorithm to approximate ground states of nearest-neighbor local Hamiltonians on any lattice or graph of infinite size. By introducing the structural-matrix which codifies the details of tensor networks on any graphs in any dimension $d$, we are able to produce a code that can be essentially launched to simulate any lattice. We further introduce an optimized algorithm to compute simple tensor updates as well as expectation values and correlators with a mean-field-like effective environments. Though not being variational, this strategy allows to cope with PEPS of very large bond dimension (e.g., $D=100$), and produces re…

Quantum phase transitionPhysicsStrongly Correlated Electrons (cond-mat.str-el)Heisenberg modelFOS: Physical sciences02 engineering and technology021001 nanoscience & nanotechnology01 natural sciencesSquare latticeCondensed Matter - Strongly Correlated ElectronsLattice (order)0103 physical sciencesIsing modelHexagonal latticeCondensed Matter::Strongly Correlated ElectronsTensorStatistical physics010306 general physics0210 nano-technologyPotts model
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The classical two-dimensional Heisenberg model revisited: An $SU(2)$-symmetric tensor network study

2021

The classical Heisenberg model in two spatial dimensions constitutes one of the most paradigmatic spin models, taking an important role in statistical and condensed matter physics to understand magnetism. Still, despite its paradigmatic character and the widely accepted ban of a (continuous) spontaneous symmetry breaking, controversies remain whether the model exhibits a phase transition at finite temperature. Importantly, the model can be interpreted as a lattice discretization of the $O(3)$ non-linear sigma model in $1+1$ dimensions, one of the simplest quantum field theories encompassing crucial features of celebrated higher-dimensional ones (like quantum chromodynamics in $3+1$ dimensio…

Sigma modelSpontaneous symmetry breakingQC1-999Lattice (group)General Physics and AstronomyFOS: Physical sciencesClassical Heisenberg modelQuantum Materials53001 natural sciences010305 fluids & plasmasTheoretical physicsHigh Energy Physics - Lattice0103 physical sciencesSymmetric tensorTensorQuantum field theory010306 general physicsclassical Heisenberg modelCondensed Matter - Statistical MechanicsPhysicsQuantum PhysicsStatistical Mechanics (cond-mat.stat-mech)Heisenberg modelPhysics500 Naturwissenschaften und Mathematik::530 Physik::530 PhysikHigh Energy Physics - Lattice (hep-lat)magnetismstatistical and condensed matter physicsQuantum Physics (quant-ph)
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Asymptotics of correlation functions of the Heisenberg-Ising chain in the easy-axis regime

2016

We analyze the long-time large-distance asymptotics of the longitudinal correlation functions of the Heisenberg-Ising chain in the easy-axis regime. We show that in this regime the leading asymptotics of the dynamical two-point functions is entirely determined by the two-spinon contribution to their form factor expansion. Its explicit form is obtained from a saddle-point analysis of the corresponding double integral. It describes the propagation of a wave front with velocity $v_{c_1}$ which is found to be the maximal possible group velocity. Like in wave propagation in dispersive media the wave front is preceded by a precursor running ahead with velocity $v_{c_2}$. As a special case we obta…

Statistics and ProbabilityHigh Energy Physics - Theory[PHYS.COND.GAS]Physics [physics]/Condensed Matter [cond-mat]/Quantum Gases [cond-mat.quant-gas]Correlation functionsWave propagationExact asymptotic resultsGeneral Physics and AstronomyFOS: Physical sciences01 natural sciences010305 fluids & plasmas[ PHYS.COND.GAS ] Physics [physics]/Condensed Matter [cond-mat]/Quantum Gases [cond-mat.quant-gas][ PHYS.HTHE ] Physics [physics]/High Energy Physics - Theory [hep-th]Condensed Matter - Strongly Correlated ElectronsQuantum spin chain0103 physical sciencesQuantum communication010306 general physicsDispersion (water waves)Mathematical PhysicsSaddlePhysicsStrongly Correlated Electrons (cond-mat.str-el)[PHYS.HTHE]Physics [physics]/High Energy Physics - Theory [hep-th]Heisenberg modelMultiple integralMathematical analysisForm factor (quantum field theory)Statistical and Nonlinear PhysicsFunction (mathematics)High Energy Physics - Theory (hep-th)Quantum Gases (cond-mat.quant-gas)Modeling and Simulation[ PHYS.COND.CM-SCE ] Physics [physics]/Condensed Matter [cond-mat]/Strongly Correlated Electrons [cond-mat.str-el]Group velocity[PHYS.COND.CM-SCE]Physics [physics]/Condensed Matter [cond-mat]/Strongly Correlated Electrons [cond-mat.str-el]Condensed Matter - Quantum Gases
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Thermodynamic properties of a classical d-dimensional spin-S Heisenberg ferromagnet with long-range interactions via the spectral density method

2003

The thermodynamic properties of a classical d-dimensional spin-S Heisenberg ferromagnet, with long-range interactions decaying as $r^{-p}$ and in the presence of an external magnetic field, is investigated by means of the spectral density method in the framework of classical statistical mechanics. We find that long-range order exists at finite temperature for $dd$ with $d>2$, consistently with known theorems. Besides, the related critical temperature is determined and a study of the critical properties is performed.

Statistics and ProbabilityPhysicsCondensed matter physicsStatistical Mechanics (cond-mat.stat-mech)Heisenberg modelOrder (ring theory)Spectral densityFOS: Physical sciencesStatistical mechanicsClassical Heisenberg modelCondensed Matter PhysicsMagnetic fieldFerromagnetismQuantum mechanicsCondensed Matter - Statistical MechanicsSpin-½
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