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Topological phases set themselves apart from other phases since they cannot be understood in terms of the usual Landau theory of phase transitions. This fact, which is a consequence of the property that topological phase transitions can occur without breaking symmetries, is reflected in the complicated form of topological order parameters. While the mathematical classification of phases through homotopy theory is known, an intuition for the relation between phase transitions and changes to the physical system is largely inhibited by the general complexity.
In this thesis we aim to get back some of this intuition by studying the properties of the Chern number (a topological order parameter) in two scenarios. First, we investigate the effect of electronic correlations on topological phases in the Green's function formalism. By developing a statistical method that averages over all possible solutions of the manybody problem, we extract general statements about the shape of the phase diagram and investigate the stability of topological phases with respect to interactions. In addition, we find that in many topological models the local approximation, which is part of many standard methods for solving the manybody lattice model, is able to produce qualitatively correct phase transitions at low to intermediate correlations.
We then extend the statistical method to study the effect of the lattice, where we evaluate possible applications of standard machine learning techniques against our information theoretical approach. We define a measure for the information about particular topological phases encoded in individual lattice parameters, which allows us to construct a qualitative phase diagram that gives a more intuitive understanding of the topological phase.
Finally, we discuss possible applications of our method that could facilitate the discovery of new materials with topological properties.
Die Arbeit beschäftigt sich mit der Herstellung sowie der strukturellen und magnetischen Charakterisierung von zwei Materialklassen von kupferbasierten zweidimensionalen Quanten-Spin-Systemen: Quadratische Gitter von Dimeren sowie geometrisch frustrierte Kagomé Gitter. In beiden Systemen werden Substitutionen vorgestellt die zu verbesserten Eigenschaften führen.
The phenomenon of magnetism has been known to humankind for at least over 2500 years and many useful applications of magnetism have been developed since then, starting from the compass to modern information storage and processing devices. While technological applications are an important part of the continuing interest in magnetic materials, their fundamental properties are still being studied, leading to new physical insights at the forefront of physics. The magnetism of magnetic materials is a pure quantum effect due to the electrons that carry an intrinsic spin of 1/2. The physics of interacting quantum spins in magnetic insulators is the main subject of this thesis.We focus here on a theoretical description of the antiferromagnetic insulator Cs2CuCl4. This material is highly interesting because it is a nearly ideal realization of the two-dimensional antiferromagnetic spin-1/2 Heisenberg model on an anisotropic triangular lattice, where the Cu(2+) ions carry a spin of 1/2 and the spins interact via exchange couplings. Due to the geometric frustration of the triangular lattice, there exists a spin-liquid phase with fractional excitations (spinons) at finite temperatures in Cs2CuCl4. This spin-liquid phase is characterized by strong short-range spin correlations without long-range order. From an experimental point of view, Cs2CuCl4 is also very interesting because the exchange couplings are relatively weak leading to a saturation field of only B_c=8.5 T. All relevant parts of the phase diagram are therefore experimentally accessible. A recurring theme in this thesis will be the use of bosonic or fermionic representations of the spin operators which each offer in different situations suitable starting points for an approximate treatment of the spin interactions. The methods which we develop in this thesis are not restricted to Cs2CuCl4 but can also be applied to other materials that can be described by the spin-1/2 Heisenberg model on a triangular lattice; one important example is the material class Cs2Cu(Cl{4-x}Br{x}) where chlorine is partially substituted by bromine which changes the strength of the exchange couplings and the degree of frustration.
Our first topic is the finite-temperature spin-liquid phase in Cs2CuCl4. We study this regime by using a Majorana fermion representation of the spin-1/2 operators motivated by theoretical and experimental evidence for fermionic excitations in this spin-liquid phase. Within a mean-field theory for the Majorana fermions, we determine the magnetic field dependence of the critical temperature for the crossover from spin-liquid to paramagnetic behavior and we calculate the specific heat and magnetic susceptibility in zero magnetic field. We find that the Majorana fermions can only propagate in one dimension along the direction of the strongest exchange coupling; this reduction of the effective dimensionality of excitations is known as dimensional reduction.
The second topic is the behavior of ultrasound propagation and attenuation in the spin-liquid phase of Cs2CuCl4, where we consider longitudinal sound waves along the direction of the strongest exchange coupling. Due to the dimensional reduction of the excitations in the spin-liquid phase, we expect that we can describe the ultrasound physics by a one-dimensional Heisenberg model coupled to the lattice degrees of freedom via the exchange-striction mechanism. For this one-dimensional problem we use the Jordan-Wigner transformation to map the spin-1/2 operators to spinless fermions. We treat the fermions within the self-consistent Hartree-Fock approximation and we calculate the change of the sound velocity and attenuation as a function of magnetic field using a perturbative expansion in the spin-phonon couplings. We compare our theoretical results with experimental data from ultrasound experiments, where we find good agreement between theory and experiment.
Our final topic is the behavior of Cs2CuCl4 in high magnetic fields larger than the saturation field B_c=8.5 T. At zero temperature, Cs2CuCl4 is then fully magnetized and the ground state is therefore a ferromagnet where the excitations have an energy gap. The elementary excitations of this ferromagnetic state are spin-flips (magnons) which behave as hard-core bosons. At finite temperatures there will be thermally excited magnons that interact via the hard-core interaction and via additional exchange interactions. We describe the thermodynamic properties of Cs2CuCl4 at finite temperatures and calculate experimentally observable quantities, e.g., magnetic susceptibility and specific heat. Our approach is based on a mapping of the spin-1/2 operators to hard-core bosons, where we treat the hard-core interaction by the self-consistent ladder approximation and the exchange interactions by the self-consistent Hartree-Fock approximation. We find that our theoretical results for the specific heat are in good agreement with the available experimental data.
Diese Thesis befasst sich mit dem Problem korrelierter Elektronensysteme in realen Materialien. Ausgangspunkt hierbei ist die quantenmechanische Beschreibung dieser Systeme im Rahmen der sogenannten Kohn-Scham Dichtefunktionaltheorie, welche die Elektronen der Kristallsysteme als effektiv nicht-wechselwirkende Teilchen beschreibt.
Während diese Modellierung im Falle vieler Materialklassen erfolgreich ist, unterscheiden sich die korrelierten Elektronensysteme dadurch, dass der kollektive Charakter der Elektronendynamik nicht zu vernachlässigen ist.
Um diese Korrelationseffekte genauer zu untersuchen, verwenden wir in dieser Arbeit das Hubbard-Modell, welches mit der projektiven Wannierfunktionsmethode aus der Kohn-Scham Dichtefunktionaltheorie konstruiert werden kann.
Das Hubbard-Modell umfasst hierbei nur die lokale Elektron-Elektron-Wechselwirkung auf einem Gitter. Auch wenn das Modell augenscheinlich sehr simpel ist, existieren exakte Lösungen nur in bestimmten Grenzfällen. Dies macht die Entwicklung approximativer Ansätze erforderlich, wobei die Weiterentwicklung der sogenannten Two-Particle Self-Consistent Methode (TPSC) eine zentrale Rolle dieser Arbeit einnimmt.
Bei TPSC handelt es sich um eine Vielteilchenmethode, die in der Sprache funktionaler Ableitungen und sogenannter conserving approximations hergeleitet werden kann.
Der zentrale Gedanke dabei ist, den effektiven Wechselwirkungsvertex als statisch und lokal zu approximieren. Dies wiederum erlaubt die Bewegungsgleichung des Systems
erheblich zu vereinfachen, sodass eine numerische approximative Lösung des Hubbard-Modells möglich wird. Vorsetzung hierbei ist nur, dass sich das System in der normalleitenden Phase befindet und die bei Phasenübergängen entstehenden Fluktuationen nicht zu groß sind.
Während diese Methode ursprünglich von Y. M. Vilk und A.-M. Tremblay für das Ein-Orbital Hubbard-Modell entwickelt wurde, stellen wir in dieser Arbeit eine Erweiterung auf Viel-Orbital-Systeme vor.
Im Falle mehrerer Orbitale treten in der TPSC-Herleitung einzelne Komplikationen auf, die mit weiteren Approximationen behandelt werden müssen. Diese werden anhand eines einfachen Zwei-Orbital Modell-Systems diskutiert und die TPSC-Ergebnisse werden darüber hinaus mit den Ergebnissen der etablierten dynamischen Molekularfeldnährung verglichen.
In diesem Zusammenhang werden auch mögliche zukünftige Erweiterungen bzw. Verbesserungen von TPSC diskutiert.
Ein weiterer wichtiger Aspekt ist die Anwendung von TPSC auf reale Materialien.
In diesem Zusammenhang werden in dieser Arbeit die supraleitenden Eigenschaften der organischen K-(ET)2X Systeme untersucht. Hierbei lassen die TPSC-Resultate darauf schließen, dass das populäre Dimer-Modell, welches zur Beschreibung dieser Materialien herangezogen wird, nicht genügt um die experimentell bestimmten kritischen Temperaturen zu erklären und dass das komplexere Molekülmodell weitere exotische supraleitende Lösungen zulässt.
Schließlich untersuchen wir außerdem die elektronischen Eigenschaften des eisenbasierten Supraleiters LiFeAs und diskutieren inwieweit nicht-lokale Korrelationseffekte, welche durch TPSC aufgelöst werden können, die experimentellen Daten reproduzieren.
The focus of this thesis is on quantum Heisenberg magnets in low dimensions. We modify the method of spin-wave theory in order to address two distinct issues. In the first part we develop a variant of spin-wave theory for low-dimensional systems, where thermodynamic observables are calculated from the Gibbs free energy for fixed order parameter. We are able to go beyond linear spin-wave theory and systematically calculate two-loop correction to the free energy. We use our method to determine the low-temperature physics of Heisenberg ferromagnets in one, two and three spatial dimensions. In the second part of the thesis, we treat a two-dimensional Heisenberg antiferromagnet in the presence of a uniform external magnetic field. We determine the low-temperature behavior of the magnetization curve within spin-wave theory by taking the absence of the spontaneous staggered magnetization into account. Additionally, we perform quantum Monte Carlo simulations and subsequently show that numerical findings are qualitatively comparable to spin-wave results. Finally, we apply our method to an experimentally motivated case of the distorted honeycomb lattice in order to determine the strength of the exchange interactions.
In this thesis we investigate the thermodynamic and dynamic properties of the D-dimensional quantum Heisenberg ferromagnet within the spin functional renormalization group (FRG); a
formalism describing the evolution of the system’s observables as the magnetic exchange inter-action is artificially deformed. Following an introduction providing a self contained summary of the conceptual and mathematical background, we present the spin FRG as developed by Krieg and Kopietz in references [1] and [2] in chapter two. Thereto, the generating functional of the imaginary time-spin correlation functions and its exact flow equation describing the deformation process of the exchange interaction are introduced. In addition, it is highlighted that - in contrast to conventional field-theoretic FRG approaches - the related Legendre trans-formed functional cannot be defined if the exchange interaction is initially switched off. Next, we show that this limitation can be circumvented within an alternativ hybrid approach, which treats transverse and longitudinal spin fluctuations differently. The relevant functionals are introduced and the relations of the corresponding functional Taylor coefficients with the spin correlation functions are discussed. Lastly, the associated flow equations are derived and the possibility of explicit or spontaneous symmetry breaking is taken into account.
In chapter three, we benchmark the hybrid formalism against a calculation of the thermo-dynamic properties of the one and two-dimensional Heisenberg model at low temperatures T and finite magnetic field H. For this purpose, we devise an anisotropic deformation scheme of the exchange interaction which allows for a controlled truncation of the infinite hierarchy of FRG flow equations. Thereby, contact with mean-field and spin-wave theory is made and the violation of the Mermin-Wagner theorem is discussed. To fulfill the latter, the truncation scheme is then complemented by a Ward identity relating the transverse self-energy and the magnetization. The resulting magnetization M (H, T ) and isothermal susceptibility χ(H, T ) are in quantitative agreement with the literature and the established behavior of the transverse correlation length and the zero-field susceptibility close to the critical point is qualitatively reproduced in the limit H → 0.
Finally, we investigate the longitudinal dynamics at low temperatures. To this end, the hierarchy of flow equations is solved within the same anisotropic deformation scheme complemented by an expansion in the inverse interaction range, and the resulting longitudinal dynamic structure factor is calculated within a low-momentum expansion. In D = 3, the large phase space accessible for the decay into transverse magnons yields only a broad hump centered at zero frequency whose width scales linearly in momentum. In contrast, at low temperatures and in a certain range of magnetic fields, a well-defined quasiparticle peak with linear dispersion emerges in D ≤ 2, which we identify as zero-magnon sound. Sound velocity and damping are discussed as a function of temperature and magnetic field, and the relevant momentum-frequency window is estimated and compared to the hydrodynamic
second-magnon regime.
Folgend auf den ersten Realisierungen von Bose-Einstein Kondensaten erschienen weitere innovative Experimente, die sich in den optischen Gittern gefangenen Quantengasen widmeten. In diesen zahlreichen, wissenschaftlichen Untersuchungen konnten die Eigenschaften von Bose-Einstein Kondensaten besser verstanden werden. Das Prinzip von Vielteilchensystemen, gefangen in einem periodischen Potential, bot eine Plattform zur Untersuchung weiterer Quantenphasen.
Eine konzeptionell einfache Modifikation von solchen Systemen erhält man durch die Kopplung der Grundzustände der gefangenen Teilchen an hoch angeregten Zuständen mithilfe einer externen Lichtquelle. Im Falle dessen, dass diese Zustände nahe der Ionisationsgrenze des Atoms liegen, spricht man von Rydberg-Zuständen und Atome, welche zu diesen Zuständen angeregt werden, bezeichnet man als Rydberg-Atome. Eines der vielen charakteristischen Eigenschaften von Rydberg-Atomen ist die Fähigkeit über große Entfernungen jenseits der atomaren Längenskalen zu wechselwirken. Im Rahmen von Vielteilchensystemen wurden dementsprechend Kristallstrukturen aus gefangenen Rydberg-Atomen experimentell beobachtet.
Nun stellt sich die Frage, was mit einem gefangenen Bose-Einstein Kondensat passiert, dessen Teilchen an langreichweitig wechselwirkenden Zuständen gekoppelt sind. Gibt es ein Parameterregime, in dem sowohl Kristallstruktur als auch Suprafluidität in solchen Systemen koexistieren können? Dies ist die zentrale Frage dieser Arbeit, die sich mit der Theorie von gefangenen Quantengasen gekoppelt an Rydberg-Zuständen auseinandersetzt.
Im Rahmen dieser Dissertation wurde die Photophysik und die elektronische Struktur einer Klasse neuartiger Donator-Akzeptor-Ladungstransfer-Komplexe untersucht. Im Wesentlichen bestehen diese Verbindungen aus einem Ferrocen-Donator (Fc) und organischen Akzeptoren, die über B-N-Bindungen verbrückt sind, welche sich bei dieser Art von makromolekularen Systemen spontan bilden. Zentraler Gegenstand dieser Arbeit war die spektroskopische Untersuchung des Metall-zu-Ligand-Ladungstransfers (engl. Abkürzung: MLCT) im elektronischen Anregungszustand dieser kationischen Komplexverbindungen, die im Weiteren als „Fc-B-bpy“-Verbindungen bezeichnet werden. Die vorliegende Arbeit analysiert eine Vielzahl miteinander verwandter Fc-B-bpy-Derivate. Die Arbeit ist gegliedert in 1.) die Analyse der Absorptionsspektren vom UV- bis zum nahen Infrarot-Spektralbereich (250-1000 nm) von Lösungen, dotierten Polymer-Dünnfilmen und Einkristallen, 2.) die zeitaufgelöste optische Spektroskopie des angeregten Zustands auf der Pikosekunden-Zeitskala, 3.) die Analyse elektrochemischer Messungen an Lösungen, und 4.) die Auswertung quantenchemischer Berechnungen. Für die zeitaufgelösten Messungen wurde ein komplexes optisches Spektroskopie-System mit breitbandigen Femtosekunden-Pulsen sowie den entsprechenden zeitaufgelösten Detektionsmethoden (spektral gefilterte Weißlicht-Detektion) aufgebaut. Die Ergebnisse dieser Arbeit beweisen die Existenz eines MLCT-Übergangs mit fast vollständigem Übergang eines Fc-Donator-Elektrons zum B-bpy-Akzeptor bei optischer Anregung. Die vergleichenden Untersuchungen der spektroskopischen Eigenschaften verschiedener Derivate liefern wichtige Information für die Entwicklung neuartiger Derivate, einschließlich verwandter Polymere, mit verbesserten spektroskopischen Eigenschaften. Es wurden transiente Absorptionsmessungen bestimmter Fc-B-bpy-Derivate in Lösung nach gepulster Anregung der MLCT-Bande (bei 500 nm) über einen Zeitbereich von 0,1-1000 ps und einen Wellenlängenbereich von 460-760 nm vorgenommen. Aus den Messergebnissen geht hervor, dass die Relaxation aus dem angeregten MLCT-Zustand in den Grundzustand auf verschiedenen Zeitskalen geschehen kann, welche im Bereich zwischen ~18 und 900 ps liegen. Ein Vergleich verschiedener Derivate mit unterschiedlicher Flexibilität in der Konformation zeigt, dass die Starrheit der Bindungen zwischen Donatoren und Akzeptoren ein wesentlicher Faktor für die Lebensdauer des angeregten Zustands ist. Wenn die Akzeptorgruppen relativ frei rotieren können, ist es der Verbindung möglich, eine Geometrie einzunehmen, von der aus ein effizienter, strahlungsfreier Übergang in den Grundzustand erfolgen kann. Dieser Befund zeigt einen Weg auf, wie neuartige, verwandte Verbindungen mit größerer Lebensdauer das angeregten Zustands synthetisiert werden können, indem darauf geachtet wird, daß eine starre molekulare Architektur zwischen Donator und Akzeptor verwirklicht wird.
In this thesis we discussed the expansion behaviour of an ultracold bosonic gas from an initial harmonic confinement. We studied the reaction of the non-interacting system to changes of the trap frequency ω and of the strongly interacting system to changes of the number of Mott insulating particles NMI in the initial state and the interaction U/J. The total number of particles is kept constant for the different simulations, which are performed by means of the Bosonic Gutzwiller approach...
The term superconductivity describes the phenomenon of vanishing electrical resistivity in a certain material, then called a superconductor, below a critical typically very low temperature. Since the discovery of superconductivity in mercury in 1911 many other superconductors have been found and the critical temperature below which superconductivity occurs could recently be raised to the temperatures encountered in a cold antarctic winter.
Superconductors are promising materials for applications. They can serve as nearly loss-free cables for energy transmission, in coils for the generation of high magnetic fields or in various electronic devices, such as detectors for magnetic fields. Despite their obvious advantages, the cost for using superconductors, however, depends a lot on the cooling effort needed to realize the superconducting state. Therefore, the search for a superconductor with critical temperature above room-temperature, which would avoid the need for any specialized cooling system, is one of the main projects of contemporary research in condensed matter physics.
While a theory of superconductivity in simple metals has already been developed in the 1950s, it has meanwhile been recognized that many superconductors are unconventional in the sense that their behavior does not follow the aforementioned theory. Unconventional superconductors differ from conventional superconductors mainly by the momentum- and real-space symmetry of the order parameter, which is associated with the superconducting state. While conventional superconductors have a uniform order parameter, unconventional superconductors can have an order parameter that bears structure. Of course, alternative theoretical descriptions have been suggested, but the discussion on the right theory for unconventional superconductivity has not yet been settled. Ultimately, this lack of a general theory of superconductivity prevents a targeted search for the room-temperature superconductor. Any new theoretical approach must, however, prove its value by correctly predicting the structure of the superconducting order parameter and further material properties.
In this work we participate in the search for a theory of unconventional superconductivity. We discuss the theory of superconductivity mediated by electron-electron interactions, which has been popular in the last few decades due to its success in explaining various properties of the copper-based superconductors that emerged in the 1980s. We give a detailed derivation of the so-called random phase approximation for the Hubbard model in terms of a diagrammatic many-body theory and apply it in conjunction with low-energy kinetic Hamiltonians, which we construct from first principles calculations in the framework of density functional theory. Density functional theory is an established technique for calculating the electronic and magnetic properties of materials solely based on their crystal structure. Its practical implementations in computer codes, however, do for example not describe complicated many-electron phenomena like the superconducting state that we are interested in here. Nevertheless, it can provide important information about the properties of the normal state of the material, which superconductivity emerges from. In our theory we use these information and approach the superconducting state from the normal state.
Such an interfacing of different calculational techniques requires a lot of implementation work in the form of computer code. Inclusion of the computer code into this work would consume by far too much space, but since some of the decisions on approximations in the calculational formalism are guided by the feasibility of the associated computer calculations, we discuss the numerical implementation in great detail.
We apply the developed methods to quasi-two-dimensional organic charge transfer salts and iron-based superconductors. Finally, we discuss implications of our findings for the interpretation of various experiments.