Global ETD Search

11	Doping studies of frustrated magnets Shinohara, Hajime January 2018 (has links) Doping nonmagnetic materials is known as an effective way of investigating the properties of frustrated magnets. LiCuSbO4 is one of the simplest quasi-one dimensional spin-1/2 magnets which can be modelled with ferromagnetic(FM) nearest neighbour and antiferromagnetic (AFM) next nearest neighbour interactions. Here, doping with both non-magnetic ions, Zn, Mg, and magnetic ions, Co, is investigated. LiCu1-xMxSbO4 (M=Mg, Zn, Co 0≦x≦0.1) samples were synthesized by a ceramics process. At higher doping levels (x≧0.04), paramagnetic Curie features are observed below 4 K, however the broad peak characteristic of short range ordering at 6 K is retained. Isothermal magnetization indicates that the critical field found at 12 T in LiCuSbO4 was shifted by Zn and Mg doping. While the field is increased as the amount of Mg doping, it was increased as Zn doping in the range of 0≦x≦0.02 but decreased by x≧0.04. The trend in critical field is observed to follow that of the c lattice parameter for both Zn and Mg doping. On doping with Co2+ (S = 3/2), a low temperature Curie feature was observed from x=0.02. The value of the critical field increased on doping from (x=0) 12 T for 13.5 T (x=0.10). As for non-magnetic doping the trend in Hc has the same behaviour as the lattice parameter. The effect of doping on the pyrochlore spin ice A2B2O7 is also explored. The effect of oxygen vacancies induced by the aliovalent substitution on the B site on the crystal electric field was explored in the ceramic solid solutions. The effect of aliovalent doping on the pyrochlore A2Sn2(1-x)Sc2xO7-x (A=Ho and Dy 0≦x≦0.10) Tb2B2(1-x)Sc2xO7-x (B=Sn and Ti 0≦x≦0.05) were studied. While no dramatic changes of the saturation value of isothermal magnetization and heat capacities was observed in Dy2Sn2O7 by Sc doping in the range of 0≦x≦0.1, the saturation value of isothermal magnetization and magnetic entropy in Ho2Sn2O7 was clearly increased by Sc doping more than x=0.05, This difference could be from the difference of Kramer’s and non-Kramer’s spins between Dy and Ho, as while Dy is a Kramer’s ion and its ground state is protected, Ho is a non-Kramer’s ion and its ground state could be split. While Tb2Sn2O7 is known as quantum spin ice, Tb2Ti2O7 is known as spin liquid. A peak at 6 K of heat capacity, which is assigned as being due to a crystal electric field excitation to an excited doublet in Tb2Sn2O7 and Tb2Ti2O7 was observed in the Tb2Sn2(1-x)Sc2xO7-x sample. However in Tb2Ti2(1-x)Sc2xO7-x it was not observed. This indicates that the increased strain in the ceramic solid solution has a larger impact on the crystal electric field.
12	Rigorous Approach to Quantum Integrable Models at Finite Temperature / Approche rigoureuse aux modèles intégrable quantique à température finie Goomanee, Salvish 30 September 2019 (has links) Cette thèse développe un cadre rigoureux qui permet de démontrer des représentations exactes associées à divers observables de la chaîne XXZ de Heisenberg de spin 1/2 à température finie. Il a était argumenté dans la littérature que l’énergie libre par site ou les longueurs de corrélations admettent des représentations intégrales où les intégrandes sont exprimées en termes de solutions d’équations intégrales non-linéaires. Les dérivations de ces représentations reposaient sur divers conjectures telles que l’existence d’une valeur propre de la matrice de transfert quantique, real, non-dégénérée, de module maximale, de l’échangeabilitée de la limite du volume infinie et du nombre de Trotter à l’infinie, de l’existence et de l’unicité des solutions des equation intégrales non-linéaires auxiliaires et finalement de l’identification des valeurs propers de la matrice de transfert quantiques avec les solutions de l’équations intégrales non-linéaires. Nous démontrons toutes ces conjectures dans le regime de haute température. Nôtre analyse nous permet aussi de démontrer que pour ces température suffisamment élevées, il est possible d’avoir une description d’un certain sous-ensemble de valeurs propres sous-dominante de la matrice de transfert quantique décrite en terme de solutions d’une chaîne de spin-1 de taille finie. / This thesis develops a rigorous framework allowing one to prove the exact representations for various observables in the XXZ Heisenberg spin-1/2 chain at finite temperature. Previously it has been argued in the literature that the per-site free energy or the correlation lengths admit integral representations whose integrands are expressed in terms of solutions of non-linear integral equations. The derivations of such representations relied on various conjectures such as the existence of a real, non-degenerate, maximal in modulus Eigenvalue of the quantum transfer matrix, the exchangeability of the infinite volume limit and the Trotter number limits, the existence and uniqueness of the solutions to the auxiliary non-linear integral equations and finally the identification of the quantum transfer matrix’s Eigenvalues with solutions to the non-linear integral equation. We rigorously prove all these conjectures in the high temperature regime. Our analysis also allows us to prove that for temperatures high enough, one may describe a certain subset of sub-dominant Eigenvalues of the quantum transfer matrix described in terms of solutions to a spin-1 chain of finite length. Chaîne de spin XXZ de Heisenberg Matrice de transfert quantique Equations intégrales non-linéaires XXZ Heisenberg spin chain Quantum transfer matrix Non-linear integral equations
13	Advanced integrability techniques and analysis for quantum spin chains / Analyse et techniques avancées d'intégrabilité pour l'étude de chaînes quantiques de spins Granet, Etienne 03 September 2019 (has links) Dans cette thèse sont principalement étudiés des systèmes quantiques intégrables critiques avec l’ansatz de Bethe qui ont la propriété particulière d’être non-unitaires ou non-compacts. Ceci concerne des modèles de physique statistique non-locaux tels que la percolation, mais aussi par exemple les systèmes désordonnés. Ce manuscrit présente à la fois des études détaillées de la limite continue de modèles intégrables sur réseau, et développe de nouvelles techniques pour étudier cette correspondance. Dans une première partie nous étudions en détail la limite continue de chaînes de superspins non-unitaires (et parfois non-compactes) qui ont une symétrie orthosymplectique. Nous montrons qu’il s’agit de modèles sigma sur supersphère en calculant leur spectre avec la théorie des champs, avec l’ansatz de Bethe, et numériquement. Leur non-unitarité autorise une brisure spontanée de symétrie habituellement interdite par le théorème de Mermin-Wagner. Leur caractère de perturbation marginale d’une théorie conforme des champs logarithmique est particulièrement étudié. Nous établissons également une correspondance précise entre le spectre et des configurations de boucles avec intersections, et obtenons de nouveaux exposants critiques pour les chemins non-recouvrants compacts ainsi que leurs corrections logarithmiques multiplicatives. Cette étude fut par ailleurs l’occasion de développer une nouvelle méthode pour calculer le spectre d’excitation d’une chaîne de spin quantique critique à partir de l’ansatz de Bethe, incluant les corrections logarithmiques, également en présence de racines de Bethe dites ’en chaînes’, et qui évite les méthodes de Wiener-Hopf et les équations intégrales non-linéaires. Dans une deuxième partie nous abordons l’influence d’un champ magnétique sur une chaîne de spin quantique et montrons que des séries convergentes peuvent être obtenues pour plusieurs quantités physiques telles que l’aimantation acquise ou les exposants critiques, dont les coefficients peuvent être calculés efficacement par récurrence. La structure de ces relations de récurrence permet d’étudier génériquement le spectre d’excitation, et elles sont applicables y compris dans certains cas où les racines de Bethe sont sur une courbe dans le plan complexe. Nous espérons que l’étude de la continuation analytique de ces séries puisse être utile pour les chaînes non-compactes. Par ailleurs, nous montrons que les fluctuations à l’intérieur de la courbe arctique du modèle à six vertex avec conditions aux bords de type mur sont décrites par un champ Gaussien libre avec une constante de couplage dépendant de la position, qui peut être calculée à partir de l’énergie libre de la chaîne XXZ avec une torsion imaginaire dans un champ magnétique. / This thesis mainly deals with integrable quantum critical systems that exhibit peculiar features such as non-unitarity or non-compactness, through the technology of Bethe ansatz. These features arise in non-local statistical physics models such as percolation, but also in disordered systems for example. The manuscript both presents detailed studies of the continuum limit of finite-size lattice integrable models, and develops new techniques to study this correspondence. In a first part we study in great detail the continuum limit of non-unitary (and sometimes non-compact) super spin chains with orthosymplectic symmetry which is shown to be supersphere sigma models, by computing their spectrum from field theory, from the Bethe ansatz, and numerically. The non-unitarity allows for a spontaneous symmetry breaking usually forbidden by the Mermin-Wagner theorem. The fact that they are marginal perturbations of a Logarithmic Conformal Field Theory is particularly investigated. We also establish a precise correspondence between the spectrum and intersecting loops configurations, and derive new critical exponents for fully-packed trails, as well as their multiplicative logarithmic corrections. During this study we developed a new method to compute the excitation spectrum of a critical quantum spin chain from the Bethe ansatz, together with their logarithmic corrections, that is also applicable in presence of so-called ’strings’, and that avoids Wiener-Hopf and Non-Linear Integral Equations. In a second part we address the problem of the behavior of a spin chain in a magnetic field, and show that one can derive convergent series for several physical quantities such as the acquired magnetization or the critical exponents, whose coefficients can be efficiently and explicitely computed recursively using only algebraic manipulations. The structure of the recurrence relations permits to study generically the excitation spectrum content – moreover they are applicable even to some cases where the Bethe roots lie on a curve in the complex plane. It is our hope that the analytic continuation of such series might be helpful the study non-compact spin chains, for which we give some flavour. Besides, we show that the fluctuations within the arctic curve of the six-vertex model with domain-wall boundary conditions are captured by a Gaussian free field with space-dependent coupling constant that can be computed from the free energy of the periodic XXZ spin chain with an imaginary twist and in a magnetic field. Intégrabilité Chaîne quantique de spins Ansatz de Bethe Théorie conforme des champs Integrability Bethe ansatz Conformal field theory Quantum spin chain
14	Wave Functions of Integrable Models Mei, Zhongtao 29 October 2018 (has links) No description available. Theoretical Physics Bethe ansatz Bethe wave functions Heisenberg XXZ spin chain open boundary conditions matrix product states integrable systems
15	Valence Bond Calculations for Quantum Spin Chains: From Impurity Entanglement and Incommensurate Behaviour to Quantum Monte Carlo Deschner, Andreas 04 1900 (has links) <p>In this thesis I present three publications about the use of<br />valence bonds to gain information about quantum spin systems.<br />Valence bonds are an essential ingredient of low energy states present<br />in many compounds.<br /><br />The first part of this thesis is dedicated to<br />two studies of the antiferromagnetic J<sub>1</sub>-J<sub>2</sub> chain with<br />S=1/2. We show how automated variational calculations based on<br />valence bond states can be performed close to the Majumdar-Ghosh point<br />(MG-point). At this point, the groundstate is a product state of<br />dimers (valence bonds between nearest neighbours). In the dimerized<br />region surrounding the MG-point, we find such variational computations<br />to be reliable.<br /><br />The first publication is about<br />the entanglement properties of an impurity attached to the chain. We show<br />how to use the variational method to calculate the negativity, an<br />entanglement measure between the impurity and a distant part of the<br />chain. We find that increasing the impurity coupling and a<br />minute explicit dimerization, suppress the long-ranged entanglement<br />present in the system for small impurity coupling at the MG-point. <br /><br />The second publication is about a<br />transition from commensurate to incommensurate behaviour and how its<br />characteristics depend on the parity of the length of the chain. The<br />variational technique is used in a parameter regime inaccessible to<br />DMRG. We find that in odd chains, unlike in even chains, a very<br />intricate and interesting pattern of level crossings can be observed. <br /><br />The publication of the second part is about novel worm algorithms for<br />a popular quantum Monte Carlo method called valence bond quantum Monte<br />Carlo (VBQMC). The algorithms are based on the notion of a worm<br />moving through a decision tree. VBQMC is entirely formulated in<br />terms of valence bonds. In this thesis, I explain how the approach<br />of VBQMC can be translated to the S<sub>z</sub>-basis. The algorithms explained<br />in the publication can be applied to this S<sub>z</sub>-method.</p> / Doctor of Philosophy (PhD) quantum magnetism spin chain valence bond quantum Monte Carlo worm algorithm Lifshitz point Condensed Matter Physics Condensed Matter Physics
16	Fenômenos de transporte em sistemas fora do equilíbrio / Transport Phenomena in Out-of-Equilibrium Systems Santos, Pedro Henrique Guimarães dos 04 July 2017 (has links) Fenômenos de transporte constituem um dos grandes desafios teóricos da mecânica estatística fora do equilíbrio, uma vez que a compreensão dos mecanismos microscópicos que regem tais fenômenos não está completamente estabelecida. Conduzidos, portanto, pela motivação de melhor compreender esses mecanismos, propomos nesta tese o estudo dos fenômenos de transporte através de dois modelos microscópicos em dois contextos distintos: clássico e quântico. No contexto clássico, consideramos como modelo uma cadeia de osciladores harmônicos acoplados, sujeita a um potencial local (pinning) anarmônico quártico (conhecido como modelo phi4). A cadeia está em contato, através de suas extremidades, com dois reservatórios térmicos mantidos a temperaturas distintas, e sua dinâmica é dada por um sistema de equações de Langevin. Além disso, consideramos a inclusão de um ruído conservativo que inverte aleatoriamente o sentido da velocidade de cada partícula. Nesse sistema, estudamos dois fenômenos de transporte associados à condução de calor: a Lei de Fourier e a retificação térmica. Os resultados foram obtidos numericamente através da simulação do sistema usando-se métodos de dinâmica estocástica. A partir desses resultados pudemos concluir que, tanto a validade da Lei de Fourier, quanto a presença de uma retificação finita no limite termodinâmico, estão associadas à presença do ruído conservativo na dinâmica do sistema. No contexto quântico, utilizamos como modelo de trabalho uma cadeia de spins do tipo XX posta em contato, através de suas extremidades, com dois reservatórios mantidos a diferentes temperaturas e potenciais químicos. A interação com os reservatórios foi feita através de dissipadores de Lindblad presentes na equação mestra quântica que fornece a dinâmica do sistema. Esses dissipadores são acoplados aos modos normais do hamiltoniano do modelo de forma que, no equilíbrio, o sistema termaliza corretamente para o estado de Gibbs. Além de resultados numéricos, obtivemos através de um método perturbativo, expressões analíticas para os fluxos de energia e de partículas ao longo da cadeia, verificando que ambos possuem a estrutura da fórmula de Landauer. No regime em que o acoplamento com os reservatórios é fraco, verificamos ainda que as relações de reciprocidade de Onsager entre esses fluxos são satisfeitas. / Transport phenomena are one of the great theoretical challenges of out-of-equilibrium statistical mechanics since the understanding of the microscopic mechanisms governing such phenomena is not yet fully established. To better understand these mechanisms, we propose in this thesis the study of transport phenomena through two microscopic models in two distinct contexts: classical and quantum ones. In the classical context, we considered as a working model a chain of coupled harmonic oscillators, subject to a quartic anharmonic pinning (known as the phi4 model). The chain is in contact, through its ends, with two thermal reservoirs kept at different temperatures, and its dynamics is given by a system of Langevin equations. In addition, we considered the inclusion of a conservative noise that randomly reverses the direction of the velocity of each particle. In this system, we studied two transport phenomena associated with heat conduction: the Fourier Law and the thermal rectification. The results were obtained numerically by simulating the system using stochastic dynamics methods. From these results we concluded that both the validity of the Fourier Law and the presence of a finite rectification in the thermodynamic limit are associated with the presence of the conservative noise in the system dynamics. In the quantum context, we used as a working model the XX spin chain that was put in contact, through its ends, with two reservoirs kept at different temperatures and chemical potentials. The interaction with the reservoirs was modeled through Lindblad dissipators included in the quantum master equation that describes the system dynamics. These dissipators are coupled to the normal modes of the model Hamiltonian so that, in equilibrium, the system thermalizes correctly to the Gibbs state. In addition to numerical results, we obtained through a perturbative method, analytical expressions for the energy and particle fluxes along the chain, verifying that both have the structure of the Landauer formula. In the regime where the coupling with the reservoirs is weak, we also verified that the Onsager reciprocal relations between these fluxes are satisfied. cadeia de spins do tipo XX conservative noise dissipadores de Lindblad Fourier Law Lei de Fourier Lindblad dissipators. modelo phi4 phi4 model retificação térmica ruído conservativo thermal rectification XX spin chain
17	Etude par résonance paramagnétique électronique des composés organiques (TMTTF)2X (X=AsF6,PF6 et SbF6) / Electron Paramagnetic Resonance study of organic compounds (TMTTF)$ {2}$X (X=AsF${6}$, PF$ {6}$ and SbF$ {6}$) Dutoit, Charles-Emmanuel 12 September 2016 (has links) Ce travail de thèse porte sur l'étude par la résonance paramagnétique électronique (RPE) des sels à transfert de charge quasi-unidimensionnels (TMTTF)$ {2}$X (X=AsF$ {6}$, PF$ {6}$, SbF$ {6}$), matériaux modèles de chaînes de spins quantiques. Tout d'abord, nous avons examiné en onde continue et sur une large gamme de température et de fréquence, la phase d'ordre de charge déjà observée dans ces matériaux en dessous de la température T$ {CO}$. Nous avons mis en évidence deux nouveaux phénomènes à T < T$ {CO}$: la rotation des axes principaux du facteur g et une modification structurale liée à un dédoublement de la maille cristallographique. Un calcul de chimie quantique a été réalisé à l'aide de la méthode DFT confirmant nos résultats expérimentaux. Dans la seconde partie de ces travaux de thèse, nous avons présenté les résultats obtenus par RPE en onde continue et en onde pulsée sur l'étude des défauts corrélés dans les systèmes à chaînes de spins. En onde continue, nous avons détecté pour la première fois une raie RPE fine à basse température, suggérant la présence de défauts corrélés ayant les caractéristiques de solitons. Les mesures par RPE pulsée nous ont permis d'observer les premières oscillations de Rabi de solitons piégés et de déterminer leur caractère robuste. Ces derniers résultats offrent une approche alternative aux qubits à base de spins pour le traitement de l’information quantique. / This thesis focuses on the study by Electron Paramagnetic Resonance (EPR) of the quasi-one-dimensional charge transfer salts (TMTTF)$ {2}$X (X=AsF$ {6}$, PF$ {6}$, SbF$ {6}$), model materials of quantum spin chains. First, we have examined in continuous wave and on a wide range of temperature and frequency, the charge-ordered phase already observed in these materials below the temperature T$ {CO}$. We have identified two new phenomena at T <T$ {CO}$: the rotation of the principal axes of the g factor and a structural change related to a doubling of the unit cell parameter. A quantum chemical calculation was carried out using DFT confirming our experimental results. In the second part of the thesis, we have presented the results obtained by EPR in continuous wave and pulsed wave on the correlated defects study in spin chain systems. In continuous wave, we have detected for the first time a narrow EPR line at low temperature, suggesting the presence of correlated defects having the characteristics of solitons. The pulsed EPR measurements allowed us to observe the first Rabi oscillations of trapped solitons and to determine their robust character. These latter results offer an alternative approach for spin qubits in quantum information processing. Rpe Chaîne de spins quantiques Dynamique de spins Systèmes de basse dimension Dft Dmrg Oscillations de Rabi Epr Quantum spin chain Spin dynamics Low dimensional systems Dft Dmrg Rabi oscillations
18	Fenômenos de transporte em sistemas fora do equilíbrio / Transport Phenomena in Out-of-Equilibrium Systems Pedro Henrique Guimarães dos Santos 04 July 2017 (has links) Fenômenos de transporte constituem um dos grandes desafios teóricos da mecânica estatística fora do equilíbrio, uma vez que a compreensão dos mecanismos microscópicos que regem tais fenômenos não está completamente estabelecida. Conduzidos, portanto, pela motivação de melhor compreender esses mecanismos, propomos nesta tese o estudo dos fenômenos de transporte através de dois modelos microscópicos em dois contextos distintos: clássico e quântico. No contexto clássico, consideramos como modelo uma cadeia de osciladores harmônicos acoplados, sujeita a um potencial local (pinning) anarmônico quártico (conhecido como modelo phi4). A cadeia está em contato, através de suas extremidades, com dois reservatórios térmicos mantidos a temperaturas distintas, e sua dinâmica é dada por um sistema de equações de Langevin. Além disso, consideramos a inclusão de um ruído conservativo que inverte aleatoriamente o sentido da velocidade de cada partícula. Nesse sistema, estudamos dois fenômenos de transporte associados à condução de calor: a Lei de Fourier e a retificação térmica. Os resultados foram obtidos numericamente através da simulação do sistema usando-se métodos de dinâmica estocástica. A partir desses resultados pudemos concluir que, tanto a validade da Lei de Fourier, quanto a presença de uma retificação finita no limite termodinâmico, estão associadas à presença do ruído conservativo na dinâmica do sistema. No contexto quântico, utilizamos como modelo de trabalho uma cadeia de spins do tipo XX posta em contato, através de suas extremidades, com dois reservatórios mantidos a diferentes temperaturas e potenciais químicos. A interação com os reservatórios foi feita através de dissipadores de Lindblad presentes na equação mestra quântica que fornece a dinâmica do sistema. Esses dissipadores são acoplados aos modos normais do hamiltoniano do modelo de forma que, no equilíbrio, o sistema termaliza corretamente para o estado de Gibbs. Além de resultados numéricos, obtivemos através de um método perturbativo, expressões analíticas para os fluxos de energia e de partículas ao longo da cadeia, verificando que ambos possuem a estrutura da fórmula de Landauer. No regime em que o acoplamento com os reservatórios é fraco, verificamos ainda que as relações de reciprocidade de Onsager entre esses fluxos são satisfeitas. / Transport phenomena are one of the great theoretical challenges of out-of-equilibrium statistical mechanics since the understanding of the microscopic mechanisms governing such phenomena is not yet fully established. To better understand these mechanisms, we propose in this thesis the study of transport phenomena through two microscopic models in two distinct contexts: classical and quantum ones. In the classical context, we considered as a working model a chain of coupled harmonic oscillators, subject to a quartic anharmonic pinning (known as the phi4 model). The chain is in contact, through its ends, with two thermal reservoirs kept at different temperatures, and its dynamics is given by a system of Langevin equations. In addition, we considered the inclusion of a conservative noise that randomly reverses the direction of the velocity of each particle. In this system, we studied two transport phenomena associated with heat conduction: the Fourier Law and the thermal rectification. The results were obtained numerically by simulating the system using stochastic dynamics methods. From these results we concluded that both the validity of the Fourier Law and the presence of a finite rectification in the thermodynamic limit are associated with the presence of the conservative noise in the system dynamics. In the quantum context, we used as a working model the XX spin chain that was put in contact, through its ends, with two reservoirs kept at different temperatures and chemical potentials. The interaction with the reservoirs was modeled through Lindblad dissipators included in the quantum master equation that describes the system dynamics. These dissipators are coupled to the normal modes of the model Hamiltonian so that, in equilibrium, the system thermalizes correctly to the Gibbs state. In addition to numerical results, we obtained through a perturbative method, analytical expressions for the energy and particle fluxes along the chain, verifying that both have the structure of the Landauer formula. In the regime where the coupling with the reservoirs is weak, we also verified that the Onsager reciprocal relations between these fluxes are satisfied. cadeia de spins do tipo XX dissipadores de Lindblad Lei de Fourier modelo phi4 retificação térmica ruído conservativo conservative noise Fourier Law Lindblad dissipators. phi4 model thermal rectification XX spin chain
19	Asymptotic Analysis of Structured Determinants via the Riemann-Hilbert Approach Gharakhloo, Roozbeh 08 1900 (has links) Indiana University-Purdue University Indianapolis (IUPUI) / In this work we use and develop Riemann-Hilbert techniques to study the asymptotic behavior of structured determinants. In chapter one we will review the main underlying definitions and ideas which will be extensively used throughout the thesis. Chapter two is devoted to the asymptotic analysis of Hankel determinants with Laguerre-type and Jacobi-type potentials with Fisher-Hartwig singularities. In chapter three we will propose a Riemann-Hilbert problem for Toeplitz+Hankel determinants. We will then analyze this Riemann-Hilbert problem for a certain family of Toeplitz and Hankel symbols. In Chapter four we will study the asymptotics of a certain bordered-Toeplitz determinant which is related to the next-to-diagonal correlations of the anisotropic Ising model. The analysis is based upon relating the bordered-Toeplitz determinant to the solution of the Riemann-Hilbert problem associated to pure Toeplitz determinants. Finally in chapter ve we will study the emptiness formation probability in the XXZ-spin 1/2 Heisenberg chain, or equivalently, the asymptotic analysis of the associated Fredholm determinant. Hankel determinants Toeplitz determinants Toeplitz+Hankel determinants Bordered-Toeplitz determinants Ising model Emptiness formation probability Integrable integral operators Heisenberg spin chain Riemann-Hilbert problems Orthogonal polynomials
20	Exact eigenstates of the Inozemtsev spin chain / Exakta egentillstånd till Inozemtsevs spinnkedja Lentz, Simon January 2021 (has links) This thesis deals with the following question: are there more eigenfunctions, other than the already known eigenfunctions, of the spin chain with elliptic interactions known as the Inozemtsev spin chain? The Inozemtsev spin chain interpolates between two quantum integrable spin chains, theHeisenberg spin chain and the Haldane-Shastry spin chain. Therefore it is interesting to explore eigenfunctions of the Inozemtsev spin chain in greater detail. Moreover, there exists connections between spin chains and their corresponding spinless continuum model, namely theCalogero-Sutherland models; a derivation of the connection between the Haldane-Shastry spin chain and the trigonometric interacting Calogero-Sutherland model is presented in this thesis. These connections state that the eigenfunctions of the Calogero-Sutherland model are also eigenfunctionsof the corresponding spin chain. An established connection between the Inozemtsev spin chain and the elliptic interacting Calogero-Sutherland model yields exact eigenfunctions with simple poles at coinciding arguments of the Inozemtsev spin chain. However, there are eigenfunctions of theelliptic Calogero-Sutherland model with second order zeros instead of simple poles at coinciding arguments. It is therefore interesting to see if a connection exists that relates the eigenfunctions of the elliptic Calogero-Sutherland model with second order zeros to eigenfunctionsof the Inozemtsev spin chain also with second order zeros. The main goal of this thesis is to explore eigenfunctions of the Inozemtsev spin chain with second order zeros for two magnons. This thesis uses analytical methods for finding these eigenfunctions and numerical methods have beenresorted to in the end. The numerical results indicate that the functions explored in this thesis fail to parametrise the eigenfunctions of the Inozemtsev spin chain, except for a few special cases. / Den här avhandlingen behandlar följande frågeställning: finns det fler egenfunktioner än de redan kända till spinnkedjan med elliptisk växelverkan känd som Inozemtsevs spinnkedja? Inozemtsevs spinnkedja interpolerar mellan Heisenbergs spinnkedja och Haldane-Shastrys spinnkedja som båda ärkvant-integrerbara. Därför är det intressant att vidare utforska egenfunktionerna hos Inozemtsevs spinnkedja. Det finns kopplingar mellan spinnkedjor och spinnfria en-dimensionella kontinuumsystem, nämligen Calogero-Sutherlands system; en sådan koppling mellan Haldane-Shastrysspinnkedja och Calogero-Sutherlands modell med trigonometrisk växelverkan härleds i denna avhandling. Dessa kopplingar konstaterar att egenfunktionerna för Calogero-Sutherland systemet är egenfunktioner för spinnkedjan också. En koppling existerar mellan Calogero-Sutherland modellen med elliptisk växelverkan och Inozemtsevs spinnkedja vilket ger exakta egenfunktioner hos Inozemtsevs modell med enkla poler vid sammanfallande argument. Däremot existerar det egenfunktioner till Calogero-Sutherland modellen med elliptisk växelverkan med andra ordningens nollor vid sammanfallande argument istället för enkla poler. Det är därför intressant att undersöka om det existerar en koppling mellan dessa två system med egenfunktioner med andra ordningens nollor; det här skulle då ge exakta egenfunktioner till Inozemtsevs spinnkedja med andra ordningens nollor. Detta är huvudsyftet med avhandlingen. Egenfunktioner med andra ordningens nollor för två magnoner undersöks. Avhandlingen använder sig av analytisk metod och har prövats med numeriska metoder. De numeriska resultaten indikerar att de undersökta funktionerna i denna avhandling misslyckas med att parametrisera egenfunktionerna till Inozemtsevs spinnkedja förutom vissa specifika fall. Theoretical physics Mathematical physics quantum mechanics many-body problems spin chain Inozemtsev Calogero-Sutherland Teoretisk fysik Matematisk fysik kvantmekanik mångpartikel problem spinnkedjor Inozemtsev Calogero-Sutherland Physical Sciences Fysik

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