Your search keyword '"modelo de Ising"' showing total 17 results

1. Simulação de sistemas com agentes autônomos – Modelo de Sznajd como exemplo ilustrativo

Author

Cícero Julião and Samuel S. de Albuquerque

Subjects

Modelo de Sznajd, Modelo de Ising, Sociofísica, Agentes autônomos, Physics, QC1-999

Abstract

Além das abordagens analítica e experimental de sistemas naturais, simulações computacionais são uma ferramenta poderosa na descoberta, análise e descrição em pesquisas científicas. Simulações com agentes autônomos são especialmente úteis quando temos comportamentos micro e macroscópicos específicos. O Modelo de Sznajd é um bom começo para estudantes e pesquisadores interessados em utilizar tais abordagens.

Published

2022

2. Ising spin glass in a random network with a Gaussian random field

Author

S. G. Magalhaes, R. Erichsen, and Alexandre H. da Silveira

Subjects

Random graph, Physics, Phase transition, Random field, Spin glass, Statistical Mechanics (cond-mat.stat-mech), Gaussian, Transformações de fase, FOS: Physical sciences, Modelo de ising, Disordered Systems and Neural Networks (cond-mat.dis-nn), Condensed Matter - Disordered Systems and Neural Networks, 01 natural sciences, Stability (probability), Campo aleatório gaussiano, 010305 fluids & plasmas, Gaussian random field, symbols.namesake, 0103 physical sciences, symbols, Statistical physics, 010306 general physics, Random variable, Condensed Matter - Statistical Mechanics

Abstract

We investigate thermodynamic phase transitions of the joint presence of spin glass (SG) and random field (RF) using a random graph model that allows us to deal with the quenched disorder. Therefore, the connectivity becomes a controllable parameter in our theory, allowing us to answer what the differences are between this description and the mean-field theory i.e., the fully connected theory. We have considered the random network random field Ising model where the spin exchange interaction as well as the RF are random variables following a Gaussian distribution. The results were found within the replica symmetric (RS) approximation, whose stability is obtained using the two-replica method. This also puts our work in the context of a broader discussion, which is the RS stability as a function of the connectivity. In particular, our results show that for small connectivity there is a region at zero temperature where the RS solution remains stable above a given value of the magnetic field no matter the strength of RF. Consequently, our results show important differences with the crossover between the RF and SG regimes predicted by the fully connected theory.

Published

2021

3. Phase transitions in hard-core lattice gases on the honeycomb lattice

Author

Filipe da Cunha Thewes and Heitor Carpes Marques Fernandes

Subjects

Physics, Phase transition, Statistical Mechanics (cond-mat.stat-mech), Condensed matter physics, Transformações de fase, FOS: Physical sciences, Modelo de ising, Computational Physics (physics.comp-ph), Condensed Matter - Soft Condensed Matter, Renormalization group, 01 natural sciences, 010305 fluids & plasmas, Método de Monte Carlo, Lattice (order), 0103 physical sciences, Soft Condensed Matter (cond-mat.soft), Ising model, 010306 general physics, Physics - Computational Physics, Scaling, Critical exponent, Condensed Matter - Statistical Mechanics, Phase diagram, Potts model

Abstract

We study lattice gas systems on the honeycomb lattice where particles exclude neighboring sites up to order $k$ ($k=1\ldots5$) from being occupied by another particle. Monte Carlo simulations were used to obtain phase diagrams and characterize phase transitions as the system orders at high packing fractions. For systems with first neighbors exclusion (1NN), we confirm previous results suggesting a continuous transition in the 2D-Ising universality class. Exclusion up to second neighbors (2NN) lead the system to a two-step melting process where, first, a high density columnar phase undergoes a first order phase transition with non-standard scaling to a solid-like phase with short range ordered domains and, then, to fluid-like configurations with no sign of a second phase transition. 3NN exclusion, surprisingly, shows no phase transition to an ordered phase as density is increased, staying disordered even to packing fractions up to 0.98. The 4NN model undergoes a continuous phase transition with critical exponents close to the 3-state Potts model. The 5NN system undergoes two first order phase transitions, both with non-standard scaling. We, also, propose a conjecture concerning the possibility of more than one phase transition for systems with exclusion regions further than 5NN based on geometrical aspects of symmetries., 14 pages, 28 figures

Published

2020

4. Thermodynamic collapse in a lattice-gas model for a two-component system of penetrable particles

Author

Yan Levin and Derek Frydel

Subjects

Particle number, Transformações de fase, FOS: Physical sciences, Binary number, Condensed Matter - Soft Condensed Matter, Simple harmonic motion, 01 natural sciences, 010305 fluids & plasmas, symbols.namesake, Método de Monte Carlo, Lattice (order), 0103 physical sciences, Cluster (physics), Método de Gauss, 010306 general physics, Condensed Matter - Statistical Mechanics, Physics, Particle system, Condensed Matter - Materials Science, Statistical Mechanics (cond-mat.stat-mech), Materials Science (cond-mat.mtrl-sci), Modelo de ising, Classical mechanics, symbols, Soft Condensed Matter (cond-mat.soft), Hamiltonian (quantum mechanics), Gaussian network model

Abstract

We study a lattice-gas model of penetrable particles on a square-lattice substrate with same-site and nearest-neighbor interactions. Penetrability implies that the number of particles occupying a single lattice site is unlimited and the model itself is intended as a simple representation of penetrable particles encountered in realistic soft-matter systems. Our specific focus is on a binary mixture, where particles of the same species repel and those of the opposite species attract each other. As a consequence of penetrability and the unlimited occupation of each site, the system exhibits thermodynamic collapse, which in simulations is manifested by an emergence of extremely dense clusters scattered throughout the system with energy of a cluster $E\propto -n^2$ where $n$ is the number of particles in a cluster. After transforming a particle system into a spin system, in the large density limit the Hamiltonian recovers a simple harmonic form, resulting in the discrete Gaussian model used in the past to model the roughening transition of interfaces. For finite densities, due to the presence of a non-harmonic term, the system is approximated using a variational Gaussian model.

Published

2020

5. Phase transitions in atypical systems induced by a condensation transition on graphs

Author

Edgar Guzmán-González, Fernando L. Metz, and Isaac Pérez Castillo

Subjects

Physics, Random graph, Physics - Physics and Society, Phase transition, Statistical Mechanics (cond-mat.stat-mech), Transformações de fase, Processos randômicos, FOS: Physical sciences, Second moment of area, Modelo de ising, Disordered Systems and Neural Networks (cond-mat.dis-nn), Physics and Society (physics.soc-ph), Condensed Matter - Disordered Systems and Neural Networks, 01 natural sciences, 010305 fluids & plasmas, Critical line, 0103 physical sciences, Ising model, Adjacency matrix, Graphical model, Statistical physics, 010306 general physics, Condensed Matter - Statistical Mechanics, Eigenvalues and eigenvectors

Abstract

Random graphs undergo structural phase transitions that are crucial for dynamical processes and cooperative behavior of models defined on graphs. In this work we investigate the impact of a first-order structural transition on the thermodynamics of the Ising model defined on Erd\"os-R\'enyi random graphs, as well as on the eigenvalue distribution of the adjacency matrix of the same graphical model. The structural transition in question yields graph samples exhibiting condensation, characterized by a large number of nodes having degrees in a narrow interval. We show that this condensation transition induces distinct thermodynamic first-order transitions between the paramagnetic and the ferromagnetic phases of the Ising model. The condensation transition also leads to an abrupt change in the global eigenvalue statistics of the adjacency matrix, which renders the second moment of the eigenvalue distribution discontinuous. As a side result, we derive the critical line determining the percolation transition in Erd\"os-R\'enyi graph samples that feature condensation of degrees., Comment: 11 pages, 4 figures

Published

2020

6. Dynamical cluster size heterogeneity

Author

André Rodrigues de la Rocha, Jeferson J. Arenzon, Paulo Murilo Castro de Oliveira, and Amanda de Azevedo-Lopes

Subjects

Physics, Spins, Statistical Mechanics (cond-mat.stat-mech), Transformações de fase, FOS: Physical sciences, Single parameter, Modelo de ising, Condensed Matter - Soft Condensed Matter, 01 natural sciences, 010305 fluids & plasmas, Criticality, Critical point (thermodynamics), 0103 physical sciences, Thermal, Thermodynamic limit, Cluster size, Percolação, Soft Condensed Matter (cond-mat.soft), Statistical physics, 010306 general physics, Merge (version control), Condensed Matter - Statistical Mechanics

Abstract

Only recently the essential role of the percolation critical point has been considered on the dynamical properties of connected regions of aligned spins (domains) after a sudden temperature quench. In equilibrium, it is possible to resolve the contribution to criticality by the thermal and percolative effects (on finite lattices, while in the thermodynamic limit they merge at a single critical temperature) by studying the cluster size heterogeneity, $H_{\scriptstyle\rm eq}(T)$, a measure of how different the domains are in size. We here extend this equilibrium measure and study its temporal evolution, $H(t)$, after driving the system out of equilibrium by a sudden quench in temperature. We show that this single parameter is able to detect and well separate the different time regimes, related to the two time scales in the problem, the short, percolative and the long, coarsening one., Comment: 7 pages

Published

2020

7. Layered Systems at the Mean Field Critical Temperature

Author

Errico Presutti, Domingos H. U. Marchetti, Luiz Renato Fontes, Immacolata Merola, and Maria Eulalia Vares

Subjects

Physics, Phase transition, 60K35, 82B20, Condensed matter physics, Coupling strength, Kac potentials Lebowitz–Penrose free energy functional Phase transition, Probability (math.PR), FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Horizontal line test, k-nearest neighbors algorithm, Ferromagnetism, Mean field theory, FOS: Mathematics, Ising model, MODELO DE ISING, Mathematics - Probability, Mathematical Physics

Abstract

We consider the Ising model on $\mathbb Z\times \mathbb Z$ where on each horizontal line $\{(x,i), x\in \mathbb Z\}$, the interaction is given by a ferromagnetic Kac potential with coupling strength $J_\gamma(x,y)\sim \gamma J(\gamma (x-y))$ at the mean field critical temperature. We then add a nearest neighbor ferromagnetic vertical interaction of strength $\epsilon$ and prove that for every $\epsilon >0$ the systems exhibits phase transition provided $\gamma>0$ is small enough., Comment: 35 pages

Published

2015

8. Two universality classes of the Ziff-Gulari-Barshad model with CO desorption via time-dependent Monte Carlo simulations

Author

Henrique A. Fernandes, Alinne Borges Bernardi, and Roberto da Silva

Subjects

Physics, Phase transition, Monte Carlo method, Transformações de fase, Modelo de ising, Renormalization group, 01 natural sciences, Directed percolation, 010305 fluids & plasmas, Universality (dynamical systems), Método de Monte Carlo, Lattice (order), 0103 physical sciences, Exponent, Ising model, 010306 general physics, Mathematical physics

Abstract

We study the behavior of the phase transitions of the Ziff-Gullari-Barshad (ZGB) model when the $CO$ molecules are adsorbed on the catalytic surface with a rate $y$ and desorbed from the surface with a rate $k$. We employ large-scale nonequilibrium Monte Carlo simulations along with an optimization technique based on the coefficient of determination, in order to obtain an overview of the phase transitions of the model in the whole spectrum of $y$ and $k$: ($0\leq y\leq 1$ and $0\leq k\leq 1$) with precision $\Delta y=\Delta k=0.001$. Sucessive refinements reveal a region of points belonging to the directed percolation universality class whereas the exponents $\theta $ and $\beta /\nu_{\parallel }$ obtained agree with those of this universality class. On the other hand, the effects of allowing the $CO$ desorption from the lattice on the discontinuous phase transition point of the original ZGB model suggest the emergence of an Ising-like point previously predicted in Ref. \cite{tome1993}. We show that such a point appears after a sequence of two lines of pseudo-critical points which leads to a unique peak of the coefficient of determination curve in $y_{c}=0.554$ and $k_{c}=0.064$. In this point, the exponent $\theta $ agrees with the value found for Ising model.

Published

2018

9. Slicing the three-dimensional Ising model: Critical equilibrium and coarsening dynamics

Author

Leticia F. Cugliandolo, Marco Picco, and Jeferson J. Arenzon

Subjects

Physics, Phase transition, Condensed matter physics, Dinâmica de spin, Structure (category theory), Ferromagnetismo, Modelo de ising, Torus, 01 natural sciences, Paramagnetismo, Domain (mathematical analysis), 010305 fluids & plasmas, Simple (abstract algebra), Phase (matter), 0103 physical sciences, Ising model, Statistical physics, 010306 general physics, Dominios magneticos, Spin-½

Abstract

We study the evolution of spin clusters on two-dimensional slices of the three-dimensional Ising model in contact with a heat bath after a sudden quench to a subcritical temperature. We analyze the evolution of some simple initial configurations, such as a sphere and a torus, of one phase embedded into the other, to confirm that their area disappears linearly with time and to establish the temperature dependence of the prefactor in each case. Two generic kinds of initial states are later used: equilibrium configurations either at infinite temperature or at the paramagnetic-ferromagnetic phase transition. We investigate the morphological domain structure of the coarsening configurations on two-dimensional slices of the three-dimensional system, compared with the behavior of the bidimensional model.

Published

2014

10. Phase Transitions in Ferromagnetic Ising Models with spatially dependent magnetic fields

Author

Errico Presutti, Leandro Cioletti, Marzio Cassandro, and Rodrigo Bissacot

Subjects

Physics, Phase transition, Condensed matter physics, Probability (math.PR), FOS: Physical sciences, Statistical and Nonlinear Physics, State (functional analysis), Mathematical Physics (math-ph), Space (mathematics), k-nearest neighbors algorithm, Magnetic field, Ferromagnetism, FOS: Mathematics, Ising model, MODELO DE ISING, Mathematical Physics, Mathematics - Probability

Abstract

In this paper we study the nearest neighbor Ising model with ferromagnetic interactions in the presence of a space dependent magnetic field which vanishes as $|x|^{-\alpha}$, $\alpha >0$, as $|x|\to \infty$. We prove that in dimensions $d\ge 2$ for all $\beta$ large enough if $\alpha>1$ there is a phase transition while if $\alpha, Comment: to appear in Communications in Mathematical Physics

Published

2014

11. Inverse transition in the dipolar frustrated Ising ferromagnet : the role of domain walls

Author

Orlando V. Billoni, Daniel A. Stariolo, and Luciana Araújo Velasque

Subjects

Anisotropia magnética perpendicular, Magnetic, Ciencias Físicas, Inverse, FOS: Physical sciences, Ferromagnetismo, purl.org/becyt/ford/1 [https], Symmetry breaking, Critical field, Frustração (Física), Condensed Matter - Statistical Mechanics, Films, Physics, Filmes finos magneticos, Condensed matter physics, Statistical Mechanics (cond-mat.stat-mech), Numerical analysis, Modelo de ising, Paredes de domínios magnéticos, purl.org/becyt/ford/1.3 [https], Condensed Matter Physics, Inverse symmetry-breaking, Electronic, Optical and Magnetic Materials, Ultrathin, Astronomía, Dipole, Mean field theory, Ferromagnetism, Entropia, Ising model, CIENCIAS NATURALES Y EXACTAS, Energia livre

Abstract

We present a theoretical study aimed to elucidate the origin of the inverse symmetry breaking transition observed in ultrathin magnetic films with perpendicular anisotropy. We study the behavior of the dipolar frustrated Ising model in a mean field approximation as well as two other models with simple domain walls. By a numerical analysis we show that the internal degrees of freedom of the domain walls are decisive for the presence of the inverse symmetry breaking transition. In particular, we show that in a sharp domain wall model the inverse transition is absent. At high temperatures the additional degrees of freedom of the extended domain walls increase the entropy of the system leading to a reduction of the free energy of the stripe phase. Upon lowering the temperature the domain walls become narrow and with the corresponding degrees of freedom effectively frozen, which eventually induces an inverse transition to the competing homogeneous phase. We also show that, for growing external field at constant temperature, the stripe width grows strongly when approaching the critical field line and diverges at the transition. These results indicate that the inverse transition is a continuous phase transition and that the domain wall profiles as well as the temperature has little effect on the critical behavior of the period of the domain as function of the applied field., Comment: 7 pages, 5 figures

Published

2014

12. Strong-disorder renormalization-group study of the one-dimensional tight-binding model

Author

Vladimir Dobrosavljevic, Eduardo Miranda, H. Javan Mard, and José A. Hoyos

Subjects

Diagonal, FOS: Physical sciences, 02 engineering and technology, 01 natural sciences, Condensed Matter::Disordered Systems and Neural Networks, Condensed Matter - Strongly Correlated Electrons, Tight binding, Critical point (thermodynamics), Quantum mechanics, Transfer-matrix method, 0103 physical sciences, MODELO DE ISING, 010306 general physics, Scaling, Physics, Strongly Correlated Electrons (cond-mat.str-el), Center (category theory), Disordered Systems and Neural Networks (cond-mat.dis-nn), Renormalization group, Condensed Matter - Disordered Systems and Neural Networks, 16. Peace & justice, 021001 nanoscience & nanotechnology, Condensed Matter Physics, Electronic, Optical and Magnetic Materials, Ising model, 0210 nano-technology

Abstract

We formulate a strong-disorder renormalization-group (SDRG) approach to study the beta function of the tight-binding model in one dimension with both diagonal and off-diagonal disorder for states at the band center. We show that the SDRG method, when used to compute transport properties, yields exact results since it is identical to the transfer matrix method. The beta function is shown to be universal when only off-diagonal disorder is present even though single-parameter scaling is known to be violated. A different single-parameter scaling theory is formulated for this particular (particle-hole symmetric) case. Upon breaking particle-hole symmetry (by adding diagonal disorder), the beta function is shown to crossover from the universal behavior of the particle-hole symmetric case to the conventional non-universal one in agreement with the two-parameter scaling theory. We finally draw an analogy with the random transverse-field Ising chain in the paramagnetic phase. The particle-hole symmetric case corresponds to the critical point of the quantum Ising model while the generic case corresponds to the Griffiths paramagnetic phase., Comment: includes 12 pages, 4 figures

Published

2014

13. Termodinâmica do modelo de Ising com interações de alcance infinito via ensemble canônico generalizado

Author

Leandro G Rizzi and Rafael B Frigori

Subjects

modelo de Ising, interações de alcance infinito, ensemble canônico generalizado, Physics, QC1-999

Abstract

Apresentamos nesse trabalho a ideia de como ensembles generalizados podem ser utilizados para simplificar operacionalmente o estudo de sistemas físicos não aditivos. Como alternativa aos métodos tradicionais de integração direta ou teoria de campo médio, mostramos como a solução do modelo de Ising com interações de alcance infinito é obtida utilizando um ensemble canônico generalizado. Descrevemos como as propriedades termodinâmicas para esse modelo na presença de um campo magnético externo são encontradas por meio de simples equações paramétricas. Sem prejuízos a interpretação usual, obtemos um comportamento crítico identico ao observado nas abordagens tradicionais.

14. Nematic Phase in two-dimensional frustrated systems with power law decaying interactions

Author

Daniel A. Stariolo, Leonardo Rodrigues Ribeiro, and Daniel G. Barci

Subjects

Physics, Condensed matter physics, Spins, Statistical Mechanics (cond-mat.stat-mech), Ferromagnetismo, Inverse, FOS: Physical sciences, Modelo de ising, Hamiltonianos de spin, Suscetibilidade magnética, Antiferromagnetismo, Power law, symbols.namesake, Cálculos SCF, Ferromagnetism, Liquid crystal, Spin model, symbols, Antiferromagnetism, Condensed Matter::Strongly Correlated Electrons, Hamiltonian (quantum mechanics), Frustração (Física), Condensed Matter - Statistical Mechanics

Abstract

We address the problem of orientational order in frustrated interaction systems as a function of the relative range of the competing interactions. We study a spin model Hamiltonian with short range ferromagnetic interaction competing with an antiferromagnetic component that decays as a power law of the distance between spins, $1/r^\alpha$. These systems may develop a nematic phase between the isotropic disordered and stripe phases. We evaluate the nematic order parameter using a self-consistent mean field calculation. Our main result indicates that the nematic phase exists, at mean-field level, provided $0, Comment: 8 pages, 3 figures, version accepted for publication in PRE

Published

2013

15. Estudio Monte Carlo de un Ferrimagneto de Ising Mixto con Diferentes Anisotropías

Author

Nicolas De La Espriella, Gladys R Casiano, and César Ortega

Subjects

Physics, Phase transition, Condensed matter physics, Spins, temperaturas de compensación, temperaturas críticas, anisotropías de ión simple, Strategy and Management, Monte Carlo method, Exchange interaction, modelo de Ising, Geotechnical Engineering and Engineering Geology, Square lattice, Industrial and Manufacturing Engineering, Computer Science Applications, General Energy, Antiferromagnetism, Ising model, Monte Carlo, Food Science, Phase diagram

Abstract

Mediante simulaciones de Monte Carlo, se analizan las propiedades magnéticas de un modelo ferrimagnético de Ising mixto, con espines S = ±3/2, ±1/2 y σ = ±5/2, ±3/2, ±1/2 distribuidos sobre una red cuadrada, con diferentes anisotropías. Se supuso que la interacción de intercambio a primeros vecinos, J1, entre espines S y σ es antiferromagnética (J1 < 0). También, se consideró el efecto de las intensidades de las anisotropías de ión simple, debidas a los campos cristalinos de las subredes S y σ, Ds y Dct, respectivamente. Se investigó la existencia y dependencia de las temperaturas de compensación del modelo con respecto a las anisotropías de ión simple. Fijando el parámetro Ds y variando la intensidad de Dtj, aparecen posibles transiciones de fase de primer orden. Vl análisis de las temperaturas críticas se obtiene a través de los máximos del calor específico del sistema. Los diagramas de fase a temperaturas finitas se obtienen en el plano temperatura-anisotropía.

Published

2012

16. Interplay between coarsening and nucleation in an Ising model with dipolar interactions

Author

Sergio A. Cannas, Mateus Fontana Michelon, Francisco A. Tamarit, and Daniel A. Stariolo

Subjects

Physics, Anisotropia magnética perpendicular, Statistical Mechanics (cond-mat.stat-mech), Condensed matter physics, Monocamadas, Nucleation, FOS: Physical sciences, Modelo de ising, Square-lattice Ising model, Condensed Matter - Soft Condensed Matter, Plateau (mathematics), Método de Monte Carlo, Liquid crystal, Filmes finos, Phase (matter), Metastability, Propriedades magnéticas, Soft Condensed Matter (cond-mat.soft), Relaxation (physics), Ising model, Condensed Matter - Statistical Mechanics

Abstract

We study the dynamical behavior of a square lattice Ising model with exchange and dipolar interactions by means of Monte Carlo simulations. After a sudden quench to low temperatures, we find that the system may undergo a coarsening process where stripe phases with different orientations compete, or alternatively it can relax initially to a metastable nematic phase and then decay to the equilibrium stripe phase through nucleation. We measure the distribution of equilibration times for both processes and compute their relative probability of occurrence as a function of temperature and system size. This peculiar relaxation mechanism is due to the strong metastability of the nematic phase, which goes deep into the low-temperature stripe phase. We also measure quasiequilibrium autocorrelations in a wide range of temperatures. They show a distinct decay to a plateau that we identify as due to a finite fraction of frozen spins in the nematic phase. We find indications that the plateau is a finite-size effect. Relaxation times as a function of temperature in the metastable region show super-Arrhenius behavior, suggesting a possible glassy behavior of the system at low temperatures.

Published

2008

17. Ising nematic phase in ultra-thin magnetic films: a Monte Carlo study

Author

Daniel A. Stariolo, Francisco A. Tamarit, Sergio A. Cannas, and Mateus Fontana Michelon

Subjects

Phase transition, Ferromagnetismo, FOS: Physical sciences, Anisotropia magnética, Condensed Matter::Materials Science, Método de Monte Carlo, Liquid crystal, Condensed Matter::Superconductivity, Phase (matter), Metastability, Monolayer, Anisotropy, Interações de troca (elétron), Fenomenos criticos, Condensed Matter - Statistical Mechanics, Physics, Condensed Matter - Materials Science, Condensed matter physics, Statistical Mechanics (cond-mat.stat-mech), Materials Science (cond-mat.mtrl-sci), Modelo de ising, Disordered Systems and Neural Networks (cond-mat.dis-nn), Condensed Matter - Disordered Systems and Neural Networks, Condensed Matter Physics, Electronic, Optical and Magnetic Materials, Esfriamento, Condensed Matter::Soft Condensed Matter, Ferromagnetism, Ising model, Condensed Matter::Strongly Correlated Electrons, Energia livre

Abstract

We study the critical properties of a two--dimensional Ising model with competing ferromagnetic exchange and dipolar interactions, which models an ultra-thin magnetic film with high out--of--plane anisotropy in the monolayer limit. We present numerical evidence showing that two different scenarios appear in the model for different values of the exchange to dipolar intensities ratio, namely, a single first order stripe - tetragonal phase transition or two phase transitions at different temperatures with an intermediate Ising nematic phase between the stripe and the tetragonal ones. Our results are very similar to those predicted by Abanov et al [Phys. Rev. B 51, 1023 (1995)], but suggest a much more complex critical behavior than the predicted by those authors for both the stripe-nematic and the nematic-tetragonal phase transitions. We also show that the presence of diverging free energy barriers at the stripe-nematic transition makes possible to obtain by slow cooling a metastable supercooled nematic state down to temperatures well below the transition one., Comment: 13 pages, 19 figures

Published

2005