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91	Higher Forms and Dimensional Hierarchy in Topological Condensed Matter / Högre former och dimensionshierarki inom topologisk kondenserad materia Honarmandi, Yashar January 2022 (has links) This report discusses higher differential forms with applications in the study of topological phenomena. The integer quantum Hall effect is first discussed, demonstrating a connection between models on a lattice and quantum field theories bridged by a topological invariant, namely the Chern number. Next, for parametrized models on a lattice, the higher Berry curvature is described. This is a rank-(d + 2) differential form on a (d + 2)-dimensional parameter manifold which provides a relation between models in a bulk and on a lower-dimensional interface. Finally, a family of quantum field theories connected to a (d + 1)-dimensional manifold, termed a target space, is constructed. This connection is realized through the incorporation of a set of classical fields, and the effective action of the full field theories all contain a Wess-Zumino-Witten term given by the pullback of a rank-(d + 1) differential form from the target space to spacetime. By performing an extension of spacetime, a (d + 2)-form on a (d + 2)-dimensional target space is constructed in a similar way. Extending a theory in d dimensions thus yields a form on a target space of the same dimension as that of a (d + 1)-dimensional theory without extension, defining a dimensional hierarchy. The dimensional relations inherent in the two higher forms studied indicate the possibility of a relation between them. / Denna rapport beskriver högre ordningens differentialformer med tillämpningar inom topologiska fenomen. Den heltaliga kvantmekaniska Halleffekten beskrivs först, som ett exempel på ett samband mellan modeller på ett gitter och kvantfältteorier som förbindas av topologiska invarianter, specifikt Chern-talet. För parametriserade modeller på ett gitter beskrivs därefter den högre Berrykrökningen. Detta är en differentialform av ordning (d + 2) definierad på en (d + 2)-dimensionell parametermångfald som ger en koppling mellan modeller i en kropps inre och på dens gränsskikt, som är i en lägre dimension. Slutligen konstrueras en familj av kvantfältteorier som är kopplade till en (d + 1)-dimensionell mångfald kallad modellens målrum. Denna koppling realiseras genom introduktionen av ett antal klassiska fält, och den effektiva verkan för den fullständiga teorin innehåller en Wess-Zumino-Witten-term som ges av en tillbakadragen (d + 1)-form från målrummet till rumtiden. Genom att utvidga rumtiden kan även en (d + 2)-form på en (d + 2)-dimensionellt målrum konstrueras på ett motsvarande sätt. Utvidgningen av en teori i d dimensioner ger därmed en differentialform på ett målrum med samma dimension som målrummet för en (d + 1)-dimensionell teori utan utvidning, vilket definierar en dimensionell hierarki. Dimensionsrelationerna inbyggda i dessa två differentialformer indikerar den möjliga existensen av en relation mellan dem. Theoretical physics topological quantum matter parametrized systems Berry phase higher Berry curvature effective field theory topological action topological insulators dimensional hierarchy Teoretisk fysik topologisk kvantmateria parametriserade system Berryfas högre Berrykrökning effektiv fältteori topologisk verkan topologiska isolatorer dimensionshierarki Physical Sciences Fysik
92	[pt] EFEITOS DE INTERAÇÃO E PERCOLAÇÃO NOS ESTADOS TOPOLÓGICOS DE BORDA / [en] EFFECTS OF INTERACTION AND PERCOLATION ON TOPOLOGICAL EDGE STATES ANTONIO FEDERICO ZEGARRA BORRERO 18 June 2021 (has links) [pt] Nesta tese estudamos dois importantes sistemas de Isoladores Topológicos (TIs), onde nos concentramos particularmente no papel das interações e percolação nos estados de borda topológicos. Primeiro, analisamos o papel das interações vizinhas mais próximas em um protótipo de TI unidimensional, o modelo Su-Schrieffer-Heeger (SSH). Com base em um formalismo de função de Green, aplicamos a equação de Dyson em combinação com a aproximação da matriz-T para verificar a correspondência bulk-edge na presença de interações. Os expoentes críticos próximos às transições de fase topológicas são os mesmos do modelo SSH não interagente, indicando que o sistema permanece na mesma classe de universalidade, apesar da presença de interações. O segundo sistema é um TI bidimensional simétrico na inversão de tempo, ou seja, o modelo de Bernevig-Hughes-Zhang (BHZ) em conjunto com um metal ferromagnético com quebra de reversão do tempo (FMM), onde investigamos a percolação do estado Hall de spin quântico do modelo BHZ para o FMM por meio de um modelo de ligações fortes (tight-binding). Demonstramos que dependendo de se o estado de borda do cone de Dirac submerge nas sub-bandas do FMM e da direção da magnetização do FMM, a percolação do estado de borda e seu spin-momentum-locking são afetados de maneiras diferentes. Surpreendentemente, descobrimos que a corrente de spin de borda de equilíbrio no modelo BHZ, naturalmente esperada dos estados de borda de propagação do spin polarizado, está de fato ausente devido ao cancelamento das bandas de valência. No entanto, fluxos laminares de correntes de carga e spin persistente à temperatura ambiente são produzidos perto da interface da junção BHZ / FMM. Usando teoria de resposta linear, investigamos a polarização de spin induzida pela corrente causada pela percolação do estado de borda, que serve como um torque de rotação que é encontrado ser predominantemente field-like. Além disso, a polarização do spin é dramaticamente aumentada perto das impurezas na borda do modelo BHZ. / [en] In this thesis we studied two important Topological Insulators (TIs), where we focused particularly on the role of interactions and percolation on the topological edge states. First, we analyzed the role of nearest-neighbor interactions in a prototype one-dimensional TI, namely the Su-Schrieffer-Heeger (SSH) model. Based on a Green s function formalism, we applied Dyson s equation in combination with T-matrix approximation to verify the bulk-edge correspondence in the presence of interactions. The critical exponents near topological phase transitions are found to be the same as the noninteracting SSH model, indicating that the system stays in the same universality class despite the presence of interactions. The second system is a two-dimensional timereversal symmetric TI, namely the Bernevig-Hughes-Zhang (BHZ) model in conjunction with a time-reversal breaking ferromagnetic metal (FMM), where we investigated the percolation of the quantum spin Hall state from the TI layer to the FMM by means of a tight-binding model. We demonstrated that depending on whether the edge state Dirac cone submerges into the FMM subbands and the direction of the magnetization of the FMM, the percolation of the edge state and its spin-momentum locking are affected in different ways. Surprisingly, we uncover that the equilibrium edge spin current in the BHZ model, naturally expected from the spin polarized propagating edge states, is in fact absent due to the cancellation from the valence bands. Nevertheless, laminar flows of room temperature persistent charge and spin currents are produced near the interface of the BHZ/FMM junction. Using a linear response theory, we investigate the current-induced spin polarization caused by the percolation of the edge state, which serves as a spin torque that is found to be predominantly field-like. Moreover, the spin polarization is dramatically enhanced near the impurities at the edge of the BHZ model. [pt] ISOLADORES TOPOLOGICOS [pt] MODELO BHZ [pt] TORQUE DE SPIN [pt] MODELO SSH [pt] TRANSICOES DE FASE TOPOLOGICAS [pt] ESTADOS DE BORDA TOPOLOGICOS [en] TOPOLOGICAL INSULATORS [en] BHZ MODEL [en] SPIN TORQUE [en] BHZ MODEL [en] TOPOLOGICAL PHASE TRANSITIONS [en] TOPOLOGICAL EDGE STATES
93	[pt] INVESTIGANDO GEOMETRIA QUÂNTICA E CRITICALIDADE QUÂNTICA POR UM MARCADOR DE FIDELIDADE / [en] INVESTIGATING QUANTUM GEOMETRY AND QUANTUM CRITICALITY BY A FIDELITY MARKER ANTONIO LIVIO DE SOUSA CRUZ 17 October 2023 (has links) [pt] A investigação da geometria quântica em semicondutores e isoladores tornou-se significativa devido às suas implicações nas características dos materiais. A noção de geometria quântica surge considerando a métrica quântica do estado de Bloch da banda de valência, que é definido a partir da sobreposição dos estados de Bloch em momentos ligeiramente diferentes. Ao integrar a métrica quântica em toda a zona de Brillouin, introduzimos uma quantidade que chamamos de número de fidelidade, que significa a distância média entre estados de Bloch adjacentes. Além disso, apresentamos um formalismo para expressar o número de fidelidade como um marcador de fidelidade local no espaço real que pode ser definido em qualquer sítio da rede. O marcador pode ser calculado diretamente diagonalizando o hamiltoniano da rede que descreve o comportamento das partículas na rede. Posteriormente, o conceito de número e marcador de fidelidade é estendido para temperatura finita utilizando a teoria de resposta linear, conectando-os a medições experimentais que envolvem analisar o poder de absorção óptica global e local quando o material é exposto à luz linearmente polarizada. Particularmente para materiais bidimensionais, a opacidade do material permite a determinação direta do número de fidelidade espectral, permitindo a detecção experimental do número de fidelidade. Finalmente, um marcador de fidelidade não local é introduzido considerando a divergência da métrica quântica. Este marcador é postulado como um indicador universal de transições de fase quântica, assumindo que o momento cristalino permanece um número quântico válido. Este marcador não local pode ser interpretado como uma função de correlação dos estados de Wannier, que são funções de onda localizadas que descrevem estados eletrônicos em um cristal. A generalidade e aplicabilidade destes conceitos são demonstradas através da investigação de vários isoladores topológicos e transições de fase topológicas em diferentes dimensões. Essas descobertas elaboram o significado dessas quantidades e sua conexão com vários fenômenos fundamentais na física da matéria condensada. / [en] The investigation of quantum geometry in semiconductors and insulators has become significant due to its implications for material characteristics. The notion of quantum geometry arises by considering the quantum metric of the valence-band Bloch state, which is defined from the overlap of the Bloch states at slightly different momenta. By integrating the quantum metric through-out the Brillouin zone, we introduce a quantity that we call fidelity number, which signifies the average distance between adjacent Bloch states. Furthermore, we present a formalism to express the fidelity number as a local fidelity marker in real space that can be defined on every lattice site. The marker can be calculated directly by diagonalizing the lattice Hamiltonian that describes particle behavior on the lattice. Subsequently, the concept of the fidelity number and marker is extended to finite temperature using linear-response theory, connecting them to experimental measurements which involves analyze the global and local optical absorption power when the material is exposed to linearly polarized light. Particularly for two-dimensional materials, the material s opacity enables straightforward determination of the fidelity number spectral, allowing for experimental detection of the fidelity number. Finally, a nonlocal fidelity marker is introduced by considering the divergence of the quantum metric. This marker is postulated as a universal indicator of quantum phase transitions, assuming the crystalline momentum remains a valid quantum number. This nonlocal marker can be interpreted as a correlation function of Wannier states, which are localized wave functions describing electronic states in a crystal. The generality and applicability of these concepts are demonstrated through the investigation of various topological insulators and topological phase transitions across different dimensions. These findings elaborate the significance of these quantities and their connection to various fundamental phenomena in condensed matter physics. [pt] TRANSICOES DE FASE TOPOLOGICAS [pt] TRANSICOES DE FASE QUANTICAS [pt] GEOMETRIA QUANTICA [pt] ABSORCAO OPTICA [pt] ISOLANTES TOPOLOGICOS [en] TOPOLOGICAL PHASE TRANSITIONS [en] QUANTUM PHASE TRANSITIONS [en] QUANTUM GEOMETRY [en] OPTICAL ABSORPTION [en] TOPOLOGICAL INSULATORS
94	Étude de la topologie d’un système tripartite ; Analyse du modèle de Su-Schrieffer-Heeger couplé à des chaînes semi-infinies non dimérisées Bissonnette, Alexei 04 1900 (has links) Nous considérons une chaîne de Su-Schrieffer-Heeger (SSH) à laquelle nous attachons une chaîne semi-infinie non dimérisée aux deux extrémités. Nous étudions l’effet d’un tel couplage sur les propriétés du modèle de SSH. En particulier, la représentation d’un tel système infini sous forme de système effectif fini nous permet d’examiner ses états de surface topologiques. Nous montrons que, comme ce à quoi on s’attendrait, les états de surface initiaux évoluent à mesure que le couplage entre les systèmes augmente. Alors que ce couplage augmente, deux phénomènes sont observés: d’un côté, ces états de surface disparaissent progressivement, et de l’autre côté, de nouveaux états de surface émergent. Ces nouveaux états, que nous appelons états fantômes, sont aussi des états de basse énergie. Une particularité surprenante de ceux-ci est qu’ils sont localisés sur une nouvelle interface: celle-ci est passée du premier (et dernier) site au deuxième (et avant-dernier) site, ce qui suggère que la topologie du système est fortement influencée par les chaînes semi-infinies. La topologie du système tripartite peut être classifiée selon trois régimes. Pour le régime de faible couplage, le système est dans une phase topologique bien définie; pour de grands couplages, il est dans sa phase opposée; pour le régime intermédiaire, sa nature topologique n’est pas encore bien comprise. / We consider a Su-Schrieffer-Heeger (SSH) chain to which we attach a semi-infinite undimerized chain (lead) to both ends. We study the effect of the openness of the SSH model on its properties. In particular, an accurate representation of the infinite system using an effective Hamiltonian allows us to examine its topological edge states. We show that, as one would expect, the initial edge states evolve as the coupling between the systems is increased. As this coupling grows, these states slowly vanish, while a new type of edge states emerge. These new states, which we refer to as ghost states, are also low-energy states. A surprising property of these states is that they are localized on a new interface: the interface has moved from the first (and last) site to the second (and second to last) site. This suggests that the topology of the system is strongly affected by the leads, with three regimes of behaviour. For very small coupling the system is in a well-defined topological phase; for very large coupling it is in the opposite phase; in the intermediate region, its topological nature is yet to be understood. Modèle de Su-Schrieffer-Heeger (SSH) Isolants topologiques Topologie États de surface Solitons États fantômes Système ouvert Su-Schrieffer-Heeger (SSH) model Topological insulators Topology Edge states Solitons Ghost states Open system Decay
95	Bi₁₂Rh₃Cu₂I₅: A 3D Weak Topological Insulator with Monolayer Spacers and Independent Transport Channels Carrillo-Aravena, Eduardo, Finzel, Kati, Ray, Rajyavardhan, Richter, Manuel, Heider, Tristan, Cojocariu, Iulia, Baranowski, Daniel, Feyer, Vitaliy, Plucinski, Lukasz, Gruschwitz, Markus, Tegenkamp, Christoph, Ruck, Michael 11 June 2024 (has links) Topological insulators (TIs) are semiconductors with protected electronic surface states that allow dissipation-free transport. TIs are envisioned as ideal materials for spintronics and quantum computing. In Bi14Rh3I9, the first weak 3D TI, topology presumably arises from stacking of the intermetallic [(Bi4Rh)3I]2þ layers, which are predicted to be 2D TIs and to possess protected edge-states, separated by topologically trivial [Bi2I8]2+ octahedra chains. In the new layered salt Bi12Rh3Cu2I5, the same intermetallic layers are separated by planar, i.e., only one atom thick, [Cu2I4]2- anions. Density functional theory (DFT)-based calculations show that the compound is a weak 3D TI, characterized by Z2 ¼ ð0; 0001Þ, and that the topological gap is generated by strong spin–orbit coupling (Eg,calc.~ 10 meV). According to a bonding analysis, the copper cations prevent strong coupling between the TI layers. The calculated surface spectral function for a finite-slab geometry shows distinct characteristics for the two terminations of the main crystal faces 〈001〉, viz., [(Bi4Rh)3I]2þ and [Cu2I4]2-. Photoelectron spectroscopy data confirm the calculated band structure. In situ four-point probe measurements indicate a highly anisotropic bulk semiconductor (Eg,exp.¼ 28 meV) with pathindependent metallic conductivity restricted to the surface as well as temperatureindependent conductivity below 60 K. info:eu-repo/classification/ddc/530 ddc:530
96	Elektronenspinresonanz an niederdimensionalen und frustrierten magnetischen Systemen Zimmermann, Stephan 07 December 2016 (has links) (PDF) In der eingereichten Dissertation wird eine Reihe von niederdimensionalen und frustrierten magnetischen Systemen mit Hilfe der Elektronenspinresonanz (ESR) untersucht, um deren magnetische Eigenschaften und Wechselwirkungen zu charakterisieren. Sowohl niederdimensionale als auch frustrierte Systeme können exotische magnetische Phänomene zeigen, da es in beiden Fällen trotz starker magnetischer Korrelationen zu einer Unterdrückung von konventioneller langreichweitiger magnetischer Ordnung kommen kann. Auf der anderen Seite sind zweidimensionale Systeme wie Graphen und die damit verwandten topologischen Isolatoren interessant für Anwendungen in der Spintronik oder in Quantencomputern. Über das Einbringen von magnetischer Ordnung soll dabei die Kontrolle über den Spin von Elektronen erlangt werden. Es werden quasieindimensionale Spinketten in Cu(py)2Br2 untersucht, die ein gutes Modellsysteme für den Vergleich mit exakten theoretischen Berechnungen darstellen. Durch eingehende ESR-Messungen ist es gelungen, ein Modell für die Ausrichtung der Anisotropieachse zu entwickeln, die senkrecht zur Kettenachse steht. Zusätzlich zum g-Tensor konnten durch Magnetisierungsmessungen das Austauschintegral und dessen Anisotropie bestimmt werden. Die Austauschwechselwirkung kann über die Substitution von Br- mit Cl-Ionen in Cu(py)2(Cl1-xBrx)2 gezielt variiert werden. Des Weiteren wird eine kombinierte Studie aus STM- und ESR-Untersuchungen an monolagigem Graphen mit induzierten Fehlstellen vorgestellt. Es wurden Defekte durch den Beschuss mit Ar-Ionen in Graphen kontrolliert hergestellt, deren lokale elektronische Eigenschaften sich mit STM- und STS-Messungen charakte-risieren lassen. Mit ESR-Messungen konnte gezeigt werden, dass die an den einzelnen Fehlstellen lokalisierten magnetischen Momente eine dominant antiferromagnetische Austauschwechselwirkung besitzen. Die Charakterisierung der magnetischen Wechselwirkungen zwischen lokalisierten Momenten stand auch für den mit Mn dotierten topologischen Isolator Bi2Te3 im Vordergrund, welcher einen ferromagnetischen Phasenübergang bei tiefen Temperaturen zeigt. Anhand des mit ESR beobachteten Korringa-Verhaltens wurde bewiesen, dass die lokalisierten Mn-Spins an leitende Bänder gekoppelt sind und die ferromagnetische Ordnung folglich per RKKY-Wechselwirkung vermittelt wird. Es wurden kurzreichweitige magnetische Korrelationen in einem ausgedehnten Temperaturbereich oberhalb der Ordnungstemperatur beobachtet, die Hinweise auf einen zweidimensionalen Charakter zeigen. Ausgedehnte Temperaturbereiche mit kurzreichweitigen Korrelationen werden ebenfalls in den untersuchten magnetisch frustrierten Materialien beobachtet. In einer kombinierten Studie aus HF-ESR, NMR und µSR wird die Spindynamik in CoAl2O4 charakterisiert, in dem moderate Unordnung zu einem Verschwimmen der Phasengrenze zwischen Neél-Ordnung und einer Spinflüssigkeit mit spiralförmigen Korrelationen führt. Außerdem werden zwei Vertreter aus der Klasse der Swedenborgite behandelt, in denen die Spinstruktur in YBaCo4O7 durch Substitution modifiziert wird. Ziel ist die Entkopplung der enthaltenen Kagome-Schichten, welche ein zweidimensionales frustriertes System darstellen. In den vorgestellten HF-ESR- und NMR-Messungen beobachtet man ein Spinglasverhalten für YBaCo3AlO7, das aus der Unordnung bei der Besetzung der Gitterplätze resultiert. In YBaCo3FeO7 ist die Unordnung geringer und mit ESR-Untersuchungen konnte gezeigt werden, dass es zu einer effektiven Entkopplung der Fe-Spins zwischen den Kagome-Schichten kommt. Elektronenspinresonanz ESR Spinkette Graphen Topologischer Isolator magnetische Frustration Magnetismus magnetische Wechselwirkungen Festkörperphysik electron spin resonance ESR spin chain graphene topological insulators magnetic frustration magnetism magnetic exchange solid state physics ddc:540 rvk:VG 9507 Elektronenspinresonanz Spinkette Graphen Topologischer Isolator Frustration Magnetismus Festkörperphysik
97	Physics of quantum fluids in two-dimensional topological systems / Physique des fluides quantiques dans des systèmes topologiques bidimensionnels Bleu, Olivier 27 September 2018 (has links) Cette thèse est consacrée à la description de la physique à une particule ainsi qu'à celle de fluides quantiques bosoniques dans des systèmes topologiques. Les deux premiers chapitres sont introductifs. Dans le premier, nous introduisons des éléments de théorie des bandes et les quantités géométriques et topologiques associées : tenseur métrique quantique, courbure de Berry, nombre de Chern. Nous discutons différents modèles et réalisations expérimentales donnant lieu à des effets topologiques. Dans le second chapitre, nous introduisons les condensats de Bose-Einstein ainsi que les excitons-polaritons de cavité.La première partie des résultats originaux discute des phénomènes topologiques à une particule dans des réseaux en nid d'abeilles. Cela permet de comparer deux modèles théoriques qui mènent à l'effet Hall quantique anormal pour les électrons et les photons dû à la présence d'un couplage spin-orbite et d'un champ Zeeman. Nous étudions aussi l'effet Hall quantique de vallée photonique à l'interface entre deux réseaux de cavités avec potentiels alternés opposés.Dans une seconde partie, nous discutons de nouveaux effets qui émergent due à la présence d'un fluide quantique interagissant décrit par l’équation de Gross-Pitaevskii dans ces systèmes. Premièrement, il est montré que les interactions spin anisotropes donnent lieu à des transitions topologiques gouvernées par la densité de particules pour les excitations élémentaires d’un condensat spineur d’exciton-polaritons.Ensuite, nous montrons que les tourbillons quantifiés d'un condensat scalaire dans un système avec effet Hall quantique de vallée, manifestent une propagation chirale le long de l'interface contrairement aux paquets d'ondes linéaires. La direction de propagation de ces derniers est donnée par leur sens de rotation donnant lieu à un transport de pseudospin de vallée protégé topologiquement, analogue à l’effet Hall quantique de spin.Enfin, revenant aux effets géométriques linéaires, nous nous sommes concentrés sur l’effet Hall anormal. Dans ce contexte, nous présentons une correction non-adiabatique aux équations semi-classiques décrivant le mouvement d’un paquet d’ondes qui s’exprime en termes du tenseur géométrique quantique. Nous proposons un protocole expérimental pour mesurer cette quantité dans des systèmes photonique radiatifs. / This thesis is dedicated to the description of both single-particle and bosonic quantum fluid Physics in topological systems. After introductory chapters on these subjects, I first discuss single-particle topological phenomena in honeycomb lattices. This allows to compare two theoretical models leading to quantum anomalous Hall effect for electrons and photons and to discuss the photonic quantum valley Hall effect at the interface between opposite staggered cavity lattices.In a second part, I present some phenomena which emerge due to the interplay of the linear topological effects with the presence of interacting bosonic quantum fluid described by mean-field Gross-Pitaevskii equation. First, I show that the spin-anisotropic interactions lead to density-driven topological transitions for elementary excitations of a condensate loaded in the polariton quantum anomalous Hall model (thermal equilibrium and out-of-equilibrium quasi-resonant excitation configurations). Then, I show that the vortex excitations of a scalar condensate in a quantum valley Hall system, contrary to linear wavepackets, can exhibit a robust chiral propagation along the interface, with direction given by their winding in real space, leading to an analog of quantum spin Hall effect for these non-linear excitations. Finally, coming back to linear geometrical effects, I will focus on the anomalous Hall effect exhibited by an accelerated wavepacket in a two-band system. In this context, I present a non-adiabatic correction to the known semiclassical equations of motion which can be expressed in terms of the quantum geometric tensor elements. We also propose a protocol to directly measure the tensor components in radiative photonic systems. Isolants topologiques Géométrie de bandes Courbure de Berry Effet Hall anormal Isolant de Chern Couplage spin-orbite Photonique topologique Exciton-polaritons Condensats de Bose-Einstein Excitations de Bogoliubov Vortex quantifiés Topological insulators Band geometry Berry curvature Anomalous Hall effect Chern insulators Spin-orbit coupling Topological photonics Exciton-polaritons Bose Einstein condensates Bogoliubov excitations Quantized vortices
98	Modelos matemáticos para isolantes topológicos em redes / Modelos matemáticos para Hamiltonianos do tipo Dirac Resende, Bruno Messias Farias de 30 October 2017 (has links) CAPES - Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / Sistemas descritos por Hamiltonianos do tipo Dirac são ubíquos. Surgindo em materiais como grafeno, isolantes topológicos ou recentemente nos semimetais de Weyl. Devido ao interesse tecnológico e acadêmico desses materiais, caracterizar suas propriedades é essencial. Uma abordagem matemática para efetuar o estudo de tais sistemas consiste em discretizar o Hamiltoniano no espaço das posições, mas tal abordagem esbarra no problema da duplicação de férmions. De forma breve, esse problema atesta pela impossibilidade de simulação de férmions livres não massivos em uma rede discreta sem que alguma simetria ou propriedade da Hamiltoniana seja quebrada. No presente trabalho demonstramos que tal problemática não deveria ser causa de preocupação para o estudo de sistemas na matéria condensada, pois podemos utilizar a simetria quebrada para confinar os portadores de carga no sistema para remover os estados duplicados. Tal remoção é conseguida com a inserção de um termo quadrático em relação ao momento, conhecido como massa de Wilson. Nesse sentido podemos inserir um termo de Wilson com quebra de simetria necessária para o confinamento, tornando o problema de duplicação de férmions irrelevante, essa relação não tinha sido notada até o presente trabalho, e recentes resultados na literatura erroneamente atribuem a massa de Wilson com a quebra de uma simetria de reversão temporal, o que não necessariamente é verdade. Nesse contexto além de abordar essa relação a presente dissertação objetiva também elucidar alguns mal entendimentos a respeitos das massas de Wilson, quiralidade e outras simetrias. Para validar nosso argumento central estudamos diversos sistemas de interesse e comparamos com os resultados na literatura. / Hamiltonians of Dirac type are ubiquitous. Appearing in materials such as graphene, topological insulators or recently in the Weyl semimetals. Due to the technological and academic interest of these materials, characterizing their properties is essential. A mathematical approach to study these systems consists of discretizing the Hamiltonian in the space of positions, but such an approach causes the problem of doubling fermions (FDP). We demonstrate the FDP should not be a cause of concern for the study of confined systems because we can use the broken symmetry to confine in the system to remove the duplicate states. Such removal is achieved by inserting a quadratic term with respect to the moment, known as the Wilson mass. In this sense we can insert a Wilson term with symmetry breaking required for confinement, rendering the fermion duplication problem irrelevant, this relationship had not been noticed until the present work, and recent literature results erroneously attribute Wilson’s mass to break of a symmetry of time reversal, which is not necessarily true. In this context, in addition to addressing this relationship, the present dissertation also aims to elucidate some misconceptions regarding the Wilson masses, chirality and other symmetries. In order to validate our central argument we study several systems of interest and compare it with the results in the literature. / Dissertação (Mestrado) Isolantes topológicos Problema da duplicação de fermions Massas de Wilson Quebras de simetria Quiralidade Topological insulators Symmetry breaking Fermion doubling problem Wilson Mass
99	Propriétés de transport électronique des isolants topologiques / Electronic transport properties of topological insulators Adroguer, Pierre 15 February 2013 (has links) Les travaux présentés dans cette thèse ont pour objectif d’apporter à la physique mésoscopique un éclairage concernant la compréhension des propriétés de transport électroniques d’une classe de matériaux récemment découverts : les isolants topologiques.La première partie de ce manuscrit est une introduction aux isolants topologiques, mettant en partie l’accent sur leurs spécificités par rapport aux isolants "triviaux" : des états de bords hélicaux (dans le cas de l’effet Hall quantique de spin en 2 dimensions) ou de surface relativistes (pour les isolants topologiques tridimensionnels) robustes vis-à-vis du désordre.La deuxième partie propose une sonde de l’hélicité des états de bords de l’effet Hall quantique de spin en étudiant les propriétés remarquables de l’injection de paires de Cooper dans cette phase topologique.La troisième partie étudie la diffusion des états de surface des isolants topologiques tridimensionnels dans le régime cohérent de phase. L’étude de la diffusion, de la correction quantique à la conductance (antilocalisation faible) et de l’amplitude des fluctuations universelles de conductance de fermions de Dirac sans masse est présentée. Cette étude est aussi menée dans la cas d’états de surface dont la surface de Fermi présente la déformation hexagonale observée expérimentalement. / The works presented in this thesis intend to contribute to condensed matter physics in the understanding of the electronic properties of a recently discovered class of materials : the topological insulators.The first part of this memoir is an introduction to topological insulators, focusing on their specifities compared to "trivial" insulators : helical edge states (in the two dimensional quantum spin Hall effect) or relativistic surface states (for three dimensional topological insulators) both robust agiant disorder.The second part proposes a new way to probe the unique properties of the helical edge states of quantum spin Hall effect via the injection of Cooper pair from a superconductor.The third part deals with the diffusion of the three dimensional topological insulator surface states, in the phase coherent regime. The diffusion, the quantum correction to conductivity, and the amplitude of the universal conductance fluctuations are studied. This study is also led in the experimentally relevant case where the Fermi surface presents a hexagonal deformation. Isolants topologiques Effet Hall quantique de spin Physique mésoscopique Transport électronique cohérent Systèmes désordonnés (Anti)localisation faible Fluctuations universelles de conductance Fermions de Dirac Réflection d’Andreev Topological insulators Quantum spin Hall effect Mesoscopic physics Coherent electronic transport Disordered systems Weak (anti)localization Universal conductance fluctuations Dirac fermions Andreev reflection
100	Electronic Transport in Low-Dimensional Systems Quantum Dots, Quantum Wires And Topological Insulators Soori, Abhiram January 2013 (has links) (PDF) This thesis presents the work done on electronic transport in various interacting and non-interacting systems in one and two dimensions. The systems under study are: an interacting quantum dot [1], a non-interacting quantum wire and a ring in which time-dependent potentials are applied [2], an interacting quantum wire and networks of multiple quantum wires with resistive regions [3, 4], one-dimensional edge stages of a two-dimensional topological insulator [5], and a hybrid system of two-dimensional surface states of a three-dimensional topological insulator and a superconductor [6]. In the first chapter, we introduce a number of concepts which are used in the rest of the thesis, such as scattering theory, Landauer conductance formula, quantum wires, bosonization, topological insulators and superconductor. In the second chapter, we study transport through a quantum dot with interacting electrons which is connected to two reservoirs. The quantum dot is modeled by two sites within a tight-binding model with spinless electrons. Using the Lippman-Schwinger method, we write down an exact two-particle wave function for the dot-reservoir system with the interaction localized in the region of the dot. We discuss the phenomena of two-particle resonance and rectification. In the third chapter, we study pumping in two kinds of one-dimensional systems: (i) an infinite line connected to reservoirs at the two ends, and (ii) an isolated ring. The infinite line is modeled by the Dirac equation with two time-independent point-like backscatterers that create a resonant barrier. We demonstrate that even if the reservoirs are at the same chemical potential, a net current can be driven through the channel by the application of one or more time-dependent point-like potentials. When the left-right symmetry is broken, a net current can be pumped from one reservoir to the other by applying a time-varying potential at only one site. For a finite ring, we model the system by a tight-binding model. The ring is isolated in the sense that it is not connected to any reservoir or environment. The system is driven by one or more time-varying on-site potentials. We develop an exact method to calculate the current averaged over an infinite amount of time by converting it to the calculation of the current carried by certain states averaged over just one time period. Using this method, we demonstrate that an oscillating potential at only one site cannot pump charge, and oscillating potentials at two or more sites are necessary to pump charge. Further we study the dependence of the pumped current on the phases and the amplitudes of the oscillating potentials at two sites. In the fourth chapter, we study the effect of resistances present in an extended region in a one-dimensional quantum wire described by a Tomonaga-Luttinger liquid model. We combine the concept of a Rayleigh dissipation function with the technique of bosonization to model the dissipative region. In the DC limit, we find that the resistance of the dissipative patch adds in series to the contact resistance. Using a current splitting matrix M to describe junctions, we study in detail the conductances of: a three-wire junction with resistances and a parallel combination of resistances. The conductance and power dissipated in these networks depend in general on the resistances and the current splitting matrices that make up the network. We also show that the idea of a Rayleigh dissipation function can be extended to couple two wires; this gives rise to a finite transconductance analogous to the Coulomb drag. In the fifth chapter, we study the effect of a Zeeman field coupled to the edge states of a two-dimensional topological insulator. These edge states form two one-dimensional channels with spin-momentum locking which are protected by time-reversal symmetry. We study what happens when time-reversal symmetry is broken by a magnetic field which is Zeeman-coupled to the edge states. We show that a magnetic field over a finite region leads to Fabry-P´erot type resonances and the conductance can be controlled by changing the direction of the magnetic field. We also study the effect of a static impurity in the patch that can backscatter electrons in the presence of a magnetic field. In the sixth chapter, we use the Blonder-Tinkham-Klapwijk formalism to study trans-port across a line junction lying between two orthogonal topological insulator surfaces and a superconductor (which can have either s-wave or p-wave pairing). The charge and spin conductances across such a junction and their behaviors as a function of the bias voltage applied across the junction and various junction parameters are studied. Our study reveals that in addition to the zero conductance bias peak, there is a non-zero spin conductance for some particular spin states of the triplet Cooper pairs. We also find an unusual satellite peak (in addition to the usual zero bias peak) in the spin conductance for a p-wave symmetry of the superconductor order parameter. Electronic Transport Quantum Dots Quantum Wires Topological Insulators Low Dimensional Systems Scattering Theory Tomonga-Luttinger Liquid Wires Bosonization Superconductors Charge Transport Backscattering Laundauer Conductance Formula Fabry- P´erot Resonances Lippman-Schwinger Method Blonder-Tinkham-Klapwijk Formalism High Energy Physics

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