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1	Phases and Phase Transitions in Quantum Ferromagnets Sang, Yan 14 January 2015 (has links) In this dissertation we study the phases and phase transition properties of quantum ferromagnets and related magnetic materials. We first investigate the effects of an external magnetic field on the Goldstone mode of a helical magnet, such as MnSi. The field introduces a qualitatively new term into the dispersion relation of the Goldstone mode, which in turn changes the temperature dependences of the contributions of the Goldstone mode to thermodynamic and transport properties. We then study how the phase transition properties of quantum ferromagnets evolve with increasing quenched disorder. We find that there are three distinct regimes for different amounts of disorder. When the disorder is small enough, the quantum ferromagnetic phase transitions is generically of first order. If the disorder is in an intermediate region, the ferromagnetic phase transition is of second order and effectively characterized by mean-field critical exponents. If the disorder is strong enough the ferromagnetic phase transitions are continuous and are characterized by non-mean-field critical exponents. Quantum ferromagnets Quantum phase transitions
2	Crossovers and phase transitions in Bose-Fermi mixtures Kimene Kaya, Boniface Dimitri Christel 04 1900 (has links) Thesis (MSc)--Stellenbosch University, 2014. / ENGLISH ABSTRACT: We present a theoretical approach that allows for the description of trapped Bose-Fermi mixtures with a tunable interspecies interaction in the vicinity of a Feshbach resonance magnetic field.The many-body physics of the system is treated at equilibrium using the well-established mean-field and local density approximations. This reduces the physics locally to that of a homogeneous system. We observe a rich local phase structure exhibiting both first and second order phase transitions between the normal and BEC phases. We also consider the global properties of the mixture at a fixed number of particles and investigate how the density profiles and the populations of the various particle species depend on the detuning and trap profile. / AFRIKAANSE OPSOMMING: Ons beskou ’n teoretiese beskrywing van gevangde Bose-Fermi mengsels met ’n verstelbare interspesie wisselwerking in die teenwoordigheid van ’n magneties-geïnduseerde Feshbach resonansie. Die veeldeeltjiefisika van die sisteem word by ekwilibrium binne die welbekende gemiddelde-veld en lokale-digtheid benaderings hanteer. Sodoende word die fisika lokaal tot die van ’n homogene sisteem gereduseer. Ons neem ’n ryk fase-struktuur waar met beide eerste- en tweede-orde fase-oorgange tussen die normale en BEK fases. Ons beskou ook die globale eienskappe van die mengsel by ’n vaste totale aantal deeltjies en ondersoek hoe die digtheidsprofiele en deeltjiegetalle van die afstemming en die profiel van die val afhang. Quantum phase transitions Bosons Fermions UCTD Dissertations -- Physics Theses -- Physics
3	QUANTUM PHASE TRANSITIONS AND TOPOLOGICAL ORDERS IN SPIN CHAINS AND LADDERS Pandey, Toplal 17 March 2014 (has links) Dimerized antiferromagnetic spin-1/2 chains and ladders demonstrate quantum critical phase transition, the existence or absence of which is dependent on the dimerization and the dimerization pattern of the chain and the ladder, respectively. The gapped phases can not be distinguished by the conventional Landau long-range order parameters. However, they possess non-local topological string order parameters which can be used to classify different phases. We utilize the self-consistent free fermionic approximation and some standard results for exactly solved models to analytically calculate the string order parameters of dimerized spin chains. As a complement parameter the gapped phases possess the topological number, called the winding number and they are characterized by different integer values of the winding number. In order to calculate the string order parameters and winding numbers in dimerized spin chains and two-leg ladders we use analytical methods such as the Jordan-Wigner transformation, mean-field approximation, duality transformations, and some standard results available for the exactly 1D solve models. It is shown that the winding number provides the complementary framework to the string order parameter to characterize the topological gapped phases. Quantum phase transitions topological orders spin chains ladders
4	Quantum phase transitions in disordered superconductors and detection of modulated superfluidity in imbalanced Fermi gases Swanson, Mason 04 November 2014 (has links) No description available. Physics
5	Kvantové kritické jevy v konečných systémech / Kvantové kritické jevy v konečných systémech Kloc, Michal January 2013 (has links) Singularities in quantum spectra - ground state and excited-state quantum phase transitions - are often connected with singularities in the classical limit of the system and have influence on other properties, such as quantum entanglement, as well. In the first part of the thesis we study quantum phase transitions within the U(2)-based Lipkin model. The relation between quasistationary points of the classical potential and the respective singularities in the spectrum is shown. In the second part, a system of two-level atoms interacting with electromagnetic field in an optical cavity is studied within two simplified models (non-integrable Dicke model and its integrable approximation known as Jaynes-Cummings model). The behaviour of quantum entanglement in these models is shown with a focus on the vicinity of the singular points.
6	Magnetization and Transport Study of Disordered Weak Itinerant Ferromagnets Ubaid Kassis, Sara 20 July 2009 (has links) No description available. Physics Ferromagnet Nickel Vanadium Itinerant Disorder Griffiths phase Cluster glass Quantum Phase Transitions Quantum Critical Pointet Nickel Vanadium Itinerant Disorder Griffiths phase Cluster glass Quantum Phase Transitions
7	Quantização canônica e integração funcional no modelo esférico médio / Canonical quantization and functional integration in the mean spherical mode Bienzobaz, Paula Fernanda 16 April 2012 (has links) O modelo esférico desempenha um papel importante na mecânica estatística, pois ele permite a realização de cálculos exatos para estudar o comportamento crítico. Diferentes soluções do modelo esférico têm sido usadas para estudar o comportamento crítico de uma grande variedade de sistemas (com diversos tipos de desordem, com interações competitivas, de curto e de longo alcance, ferro e antiferromagnéticas, além de muitas outras situações). As soluções desses modelos apresentam uma série de anomalias a baixas temperaturas, inclusive resultados que contradizem a terceira lei da termodinâmica. Na década de 70, foi sugerido que esse comportamento anômalo a temperaturas muito baixas seria corrigido pela introdução de flutuações quânticas, que não eram levadas em conta nas soluções clássicas. De fato, a partir da quantização do modelo esférico e possível corrigir esse comportamento. Utilizamos então dois métodos distintos de quantização - quantização canônica e representação em termos de integrais funcionais - para construir versões quânticas do modelo esférico clássico, que podem ser investigadas analiticamente. Mostramos que essas formulações quânticas conduzem aos mesmos resultados. Em particular, analisamos as propriedades termodinâmicas de um modelo esférico médio\" quântico nas seguintes situações: (i) com inteirações de longo alcance, do tipo campo médio, que deve constituir um dos sistemas mais simples exibindo uma transição de fase quântica; (ii) com interações competitivas, entre primeiros e segundos vizinhos, numa situação em que ocorre um ponto multicrítico de Lifshitz; (iii) na presença de interações de longo alcance, tipo campo médio, e de um campo aleatório com média nula; (iv) na presença de desordem de sítios, como nos modelos de van Hemmen para um vidro de spin ou de Hopfield para uma rede neural com poucos padrões. Em todos esses casos há correção do comportamento anômalo a baixas temperaturas. Obtemos diagramas de fases e estudamos em cada caso a natureza das fases ordenadas. / The spherical model plays an important role in statistical mechanics, since it is amenable to exact calculations to investigate the critical behavior. Solutions of the spherical model have been used to investigate the critical behavior of a large variety os systems (with different types of disorder, with competing interactions, of short and long range, of ferro and antiferromagnetic nature, and many other situations). Solutions of these model systems display a number of anomalies at low temperatures, which include some violations of the third law of thermodynamics. In the seventies, it has been suggested that this anomalous behavior at very low temperatures would be corrected by the introduction of quantum uctuations, which were not taken into account by the classical solutions. In fact, the quantization of the spherical model leads to the correction of these effects. We then use two different methods of quantization, canonical quantization and representation in terms of functional integrals, which are still amenable to exact analytical calculations. We show that these quantum formulations lead to the same results. In particular, we analyze the thermodynamic properties of a quantum \\mean spherical model\" in the following situations: (i) with long-range, mean-field, interactions, which is perhaps the simplest model system that exhibits a quantum phase transition; (ii) with competing interactions between first and second neighbors, in which case there should be a Lifshitz multicritical point; (iii) in the presence of long-range interactions and of a random field of zero mean value; (iv) in the presence of disorder, such as the van Hemmen model for a spin glass or the Hopfield model for a neural network with just a few patterns. In all of these cases the anomalous behavior is corrected at low temperatures. We obtain a number of phase diagrams, and discuss the nature of the ordered phases. classical and quantum phase transitions Modelo esférico Spherical model
8	Experimental and Numerical Investigations of Ultra-Cold Atoms Rehn, Magnus January 2007 (has links) I have been one of the main responsible for building a new laboratory for Bose-Einstein condensation with 87Rb. In particular, the experimental setup has been designed for performing experiments with Bose-Einstein condensates load into optical lattices of variable geometries. All parts essential for Bose-Einstein condensation are in place. Atoms are collected in a magneto-optical trap, transferred to another vacuum chamber, with better vacuum, and trapped in another magneto-optical trap. Atoms are successfully transferred to a dark magnetic trap, and system for diagnostics with absorption imaging has been realized. We have not yet been able to form a Bose-Einstein condensate, due to a range of technical difficulties. Equipment for alignment of optical lattices with flexible geometry has been designed, built, and tested. This tool has been proven to work as desired, and there is a great potential for a range of unique experiments with Bose-Einstein condensates in optical lattices of various geometries, including superlattices and quasi-periodic lattices. Numerical studies have been made on anisotropic optical lattices, and the existence of a transition between a 2D superfluid phase and a 1D Mott-insulating phase has been confirmed. We have shown that the transition is of Berezinskii-Kosterlitz-Thouless type. In another numerical study it has been shown that using stimulated Raman transitions is a practical method for transferring atoms between states in a double optical lattice. Thus, it will be possible to transfer populations between the lattices, with further applications in qubit read/write operations. Ultracold atoms optical lattices Bose-Einstein condensation quantum phase transitions Physics Fysik
9	Probing Exotic Boundary Quantum Phases with Tunable Nanostructure Liu, Dong January 2012 (has links) <p>Boundary quantum phases ---a special type of quantum phenomena--- occur in the boundary part of the system. The boundary part can be a surface of a bulk material, an interface between two distinct system, and even it can be a single impurity or a impurity cluster embedded into a bulk system. The properties of the boundary degree of freedom can be affected by many strong electron correlation effects, mesoscopic effects, and topological effects, which, therefore, induce a vast variety of exotic boundary quantum phases. Many techniques for precise fabrication and measurement in nanostructures had been developed,</p><p>which can provide ways to prob, understand, and control those boundary quantum phases.</p><p>In this thesis, we focus on three types of the boundary quantum phases : Kondo effects, boundary quantum phase transitions, and Majorana fermions. Our motivation is to design and prob those effects by using a important type of nanostructures, i.e. quantum dots. A vast variety of models related to quantum dots (QDs) are studied theoretically, which includes a QD coupled to a mesoscopic bath, a quadruple QD system with metallic leads, a QD with dissipative environments, and a QD coupled to a Majorana fermion zero mode.</p><p>Quantum dots provide a way to study the interplay of Kondo effects and mesoscopic fuctuations. In chapter 5, we consider a model including an Anderson impurity (small QD) coupled to a mesoscopic bath (large QD). Both the weak and strong coupling Anderson impurity problems are characterized by Fermi-liquid theories with weakly interacting quasiparticles. We find that the fluctuations of single particle properties in the two limits are highly correlated and universal : The distributions of the spectrum within the Kondo temperature collapse to universal forms; and the strong coupling impurity changes the wave functions corresponding to the spectrum within the Kondo temperature. </p><p>Quantum dots also bring the possibility to study more complex quantum impurities (multi-QDs) and the competition among dierent interactions, which may induce exotic effects: boundary quantum phase transitions and novel Kondo effects. In chapter 7, we design a quadruple quantum dot system to study the competition among three types of interactions: Kondo, Heisenberg, and Ising. We find a rich phase diagram containing two sharp features : a Berezinsky-Kosterlitz-Thouless type quantum phase transition between a charge-ordered phase and a charge liquid phase and a U(1)XU(1) Kondo state with emergent symmetry from Z2 to U(1). In chapter 8, we study a dissipative resonant level model in which the coupling of a fermionc bath competes with a dissipation-induced bosonic bath. we establish an exact mapping from this dissipative resonant level model to a model of a quantum dot embedded into a Luttinger liquid wire, and we also find two kinds of boundary quantum phase transitions (a Berezinsky-Kosterlitz-Thouless type and a second order type).</p><p>Finally, in chapter 9, we propose an experimental system to detect Majorana fermion zero modes. This system consists of a spinless quantum do coupled to a Majorana fermion which exists in the end of a p-wave superconductor wire. The Majorana Fermion strongly infuence the transport properties of the quantum dot. The zero temperature conductance peak value (when the dot is on resonance and symmetrically coupled to the leads) is e^2/2h. In contrast, if the wire is in its topological trivial phase, the result is e^2/h; if the side-coupled mode is a regular fermionic zero mode, the result is zero. Driving the wire through the topological phase transition causes a sharp jump in the conductance by a factor of 1/2. This result can be used to detect the existence of Majorana fermions.</p> / Dissertation Theoretical physics Nanoscience Boundary quantum phases Kondo effects Majorana fermions Quantum dots quantum phase transitions
10	Magnetic field effects in low-dimensional quantum magnets Iaizzi, Adam 07 November 2018 (has links) We present a comprehensive study of a low-dimensional spin-half quantum antiferromagnet, the J-Q model, in the presence of an external (Zeeman) magnetic field using numerical methods, chiefly stochastic series expansion quantum Monte Carlo with directed loop updates and quantum replica exchange. The J-Q model is a many-body Hamiltonian acting on a lattice of localized spin-half degrees of freedom; it augments the Heisenberg exchange with a four-spin interaction of strength Q. This model has been extensively studied at zero field, where the Q term drives a quantum phase transition from a Néel-like state to a valence-bond solid (a nonmagnetic state consisting of a long-range-ordered arrangement of local singlet bonds between sites). This transition is believed to be an example of deconfined quantum criticality, where the excitations are spinons—exotic spin-half bosons. We study the J-Q model in the presence of a magnetic field in both one and two dimensions. In one dimension, there is metamagnetism above a critical coupling ratio (Q/J)min. Metamagnetism is a first-order quantum phase transition characterized by discontinuities in the magnetization as a function of field (magnetization jumps). We derive an exact expression for (Q/J)min = 2/9, and show that the metamagnetism is caused by the onset of attractive interactions between magnons (flipped spins on a polarized background). We predict that the same mechanisms will produce metamagnetism in the unfrustrated antiferromagnetic J1-J2 model with anisotropy. Below (Q/J)min, the saturation transition is continuous and we show that it is governed by the expected zero-scale-factor universality. In two dimensions, we also find metamagnetism above a critical coupling ratio (Q/J)min=0.417, caused by the same mechanism as in the one-dimensional case. In two dimensions we also show evidence of an anomalous temperature dependence of specific heat arising from field-induced Bose-Einstein condensation of spinons at the deconfined quantum critical point. / 2019-11-06T00:00:00Z Condensed matter physics Quantum criticality Magnetism Metamagnetism Quantum Monte Carlo Quantum phase transitions Spinons

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