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The Global ETD Search service is a free service for researchers
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Showing 431 to 440 of 477 (0.012 seconds)| 431 |
Conformal Feynman Integrals and Correlation Functions in Fishnet TheoryCorcoran, Luke 12 January 2023 (has links)
In dieser Dissertation untersuchen wir unterschiedliche Aspekte im Zusammenhang mit Korrelationsfunktionen in der Fischnetz-Theorie.
Zunächst betrachten wir einen der einfachsten Korrelatoren der Fischnetz Theorie, das konforme Box-Integral, in Minkowski Signatur. Während dieses Integral in Euklidischer Signatur eine konforme Symmetrie aufweist, wird diese Symmetrie in Minkowski-Raumzeit subtil gebrochen. Wir beschreiben die Brechung der konformen Symmetrie quantitativ, indem wir die funktionale Form des Box-Integrals in allen kinematischen Regionen untersuchen. Ausserdem untersuchen wir das Ausmass zu dem das Box integral durch seine Yangian-Symmetrie festgelegt ist.
Als nächstes widmen wir uns den Basso-Dixon-Graphen, die ebenfalls konforme Vier-Punkt-Integrale sind und Verallgemeinerungen des Box-Integrals zu höheren Schleifenordnungen darstellen. Wir leiten die Yangian-Ward-Identitäten ab, die diese Klasse von Integralen erfüllen. Die Ward-Identitäten sind einhomogene Erweiterungen der partiellen Differentialgleichungen, die im homogenen Fall durch Appell-Hypergeometrische Funktionen gelöst werden. Die Ward-Identitäten können natürlicherweise auf eine Ein-Parameter-Familie von D-dimensionalen Integralen erweitert werden, die Korrelatoren in der verallgemeinerten Fischnetz-Theorie von Kazakov und Olivucci darstellen.
Schliesslich untersuchen wir den Dilatationsoperator in einem Drei-Skalar-Sektor der Fischnetztheorie, der auch als Eklektisches Modell bezeichnet wird. In diesem Sektor der Dilatationsoperator nimmt nicht--diagonalisierbare Form an. Das führt dazu, dass die Zwei-Punkt-Korrelationsfunktionen eine logarithmische Abhängigkeit von der Raumzeitseparierung der Operatoren annimmt. Unter Zuhilfenahme von kombinatorischen Argumenten führen wir eine generierende Funktion ein, die das Jordan-Block-Spektrum eines verwandten Modells, der hypereklektischen Spinkette, vollständig charakterisiert. / We study various aspects of correlation functions in fishnet theory.
We begin with the study of the simplest correlator in theory theory, represented by the conformal box integral, in Minkowski space. While this integral is conformally invariant in Euclidean space, this symmetry is subtly broken in Minkowski space. We quantify the extent to which conformal symmetry is broken by analysing the functional form of the box in each kinematic region. We propose a new method to calculate the box integral directly in Minkowski space, by introducing a family of configurations with two points at infinity. Furthermore, we investigate the extent to which the box integral is constrained by Yangian symmetry. We constrain the functional form of the box integral in all kinematic regions up to twelve undetermined constants, which we fix by three separate analytic continuations from the Euclidean region.
Next, we study the Basso-Dixon graphs, which represent higher-loop versions of the box integral. We derive and study Yangian Ward identities for this class of integrals. These take the form of inhomogeneous extensions of the partial differential equations defining the Appell hypergeometric functions. The Ward identities naturally generalise to a one-parameter family of D dimensional integrals representing correlators in a generalised fishnet theory.
Finally, we study the dilatation operator in a particular three scalar sector of the fishnet theory, which has been dubbed the eclectic model. This dilatation operator is non-diagonalisable in this sector. This leads to logarithmic spacetime dependence in the corresponding two-point functions. Using combinatorial arguments, we introduce a generating function which fully characterises the Jordan block spectrum of a related model: the hypereclectic spin chain. This function is found by purely combinatorial means and can be expressed in terms of the q-binomial coefficient.
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FieldTheory__Chu, Yi-Zen January 2010 (has links)
No description available.
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Simulation of curved-space quantum field theories with two-component Bose-Einstein condensates: from black-hole physics to cosmologyBerti, Anna 04 April 2024 (has links)
In 1981, Unruh suggested the possibility of simulating the dynamics of quantum fields in curved spacetimes using sound-waves propagating in moving fluids: a supersonic flow would indeed influence the dynamics of sound similarly to what happens to light when it’s dragged by the spacetime geometry in strong gravity environments. This simple yet groundbreaking observation has lead to the beginning of a whole new field of research, nowadays known as Analog Gravity.
Due to their superfluid character, intrinsic quantum nature and impressive experimental tunability, Bose-Einstein condensates represent one of the most promising platforms to realize analog spacetimes, including black-hole geometries with horizons and ergoregions, as well as of time-dependent configurations relevant to cosmology.
In this Thesis we go beyond the standard single-component BEC and focus on two-component mixtures of atomic condensates, possibly in the presence of a coherent coupling between the two-components: the availability of various branches of elementary excitations with different sound speed and effective mass may in fact lead to advantages in the implementation of interesting geometries and, eventually, to the exploration of a broader spectrum of physical processes. We first consider black-hole related phenomena (Hawking radiation and rotational superradiance) that have already been analysed with single-component systems, generalising the results to mixtures; we then proceed to tackle a problem (the decay from the false vacuum) which instead requires the additional degrees of freedom that only a mixture displays.
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Skrytá podstata skutečnosti - Humovské pojetí / Secret nature of reality - Humean approachFršlínek, Jan January 2019 (has links)
This thesis enquires into the question of the hidden nature of things and reality in the context of David Hume's philosophy. In the context of a Humean approach to reality, it discusses whether the things which we perceive and which are considered to be perceptions can have some sort of non-empirical correlation that lies beneath them and whether it can be called the hidden nature of these things. The first half of the thesis is focused on the philosophy of David Hume. In the second half of the thesis two original considerations about the hidden nature and its characteristics are presented. The thesis starts with three selected theories of substance as presented in A Treatise of Human Nature. The theory of John Locke and the theory of the peripatetics are presented from Hume's critical perspective. Consequently is presented an interpretation called the New Hume. In the context of this interpretation, Hume presumes that there are hidden entities lying beneath empirical reality. Then, there are two considerations focused on the hidden nature of things and its characteristics which are presented. These characteristics are consequently being described in an indirect manner. And finally an original suggestion of how to understand the hidden nature is presented. It has the character of mere...
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Astrophysical and Collider Signatures of Extra DimensionsMelbéus, Henrik January 2010 (has links)
<p>In recent years, there has been a large interest in the subject of extra dimensions in particle physics. In particular, a number of models have been suggested which provide solutions to some of the problems with the current Standard Model of particle physics, and which could be tested in the next generation of high-energy experiments. Among the most important of these models are the large extra dimensions model by Arkani-Hamed, Dimopoulos, and Dvali, the universal extra dimensions model, and models allowing right-handed neutrinos to propagate in the extra dimensions. In this thesis, we study phenomenological aspects of these three models, or simple modifications of them.</p><p> </p><p>The Arkani-Hamed-Dimopoulos-Dvali model attempts to solve the gauge hierarchy problem through a volume suppression of Newton's gravitational constant, lowering the fundamental Planck scale down to the electroweak scale. However, this solution is unsatisfactory in the sense that it introduces a new scale through the radius of the extra dimensions, which is unnaturally large compared to the electroweak scale. It has been suggested that a similar model, with a hyperbolic internal space, could provide a more satisfactory solution to the problem, and we consider the hadron collider phenomenology of such a model.</p><p> </p><p>One of the main features of the universal extra dimensions model is the existence of a potential dark matter candidate, the lightest Kaluza-Klein particle. In the so-called minimal universal extra dimensions model, the identity of this particle is well defined, but in more general models, it could change. We consider the indirect neutrino detection signals for a number of different such dark matter candidates, in a five- as well as a six-dimensional model.</p><p> </p><p>Finally, right-handed neutrinos propagating in extra dimensions could provide an alternative scenario to the seesaw mechanism for generating small masses for the left-handed neutrinos. Since extra-dimensional models are non-renormalizable, the Kaluza-Klein tower is expected to be cut off at some high-energy scale. We study a model where a Majorana neutrino at this cutoff scale is responsible for the generation of the light neutrino masses, while the lower modes of the tower could possibly be observed in the Large Hadron Collider. We investigate the bounds on the model from non-unitarity effects, as well as collider signatures of the model.</p>
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Excitations in holographic quantum liquidsDavison, Richard A. January 2012 (has links)
In this thesis we review the gauge/gravity duality and how it can be used to compute the thermodynamic properties and low-energy excitations of holographic quantum liquids - strongly-interacting field theories with a non-zero density of matter. We then study in detail the charge density excitations of two such liquids, the D3/D7 theory and the RN-AdS₄ theory, by computing the poles of their charge density Green's functions, and their charge density spectral functions. Although it is not a Landau Fermi liquid, the charge density excitations of the D3/D7 theory display many of the same properties as one, including a collisionless/hydrodynamic crossover as the temperature is increased. In contrast to this, the charge density (and energy density) excitations of the RN-AdS₄ theory do not share these properties but behave in a way that cannot be explained by Landau's theory of interacting fermionic quasiparticles. This is consistent with other results which indicate that this is not a Landau Fermi liquid.
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Contribution à l'ordre dominant de la polarisation hadronique du vide au moment magnétique anomal du muon en QCD sur réseau avec quatre saveurs de quarks à leur masse physique / Leading-order hadronic vacuum polarization contribution to the anomalous magnetic moment of the muon in lattice QCD with four flavors of quarks at their physical massesMalak, Rehan 12 December 2016 (has links)
Les moments magnétiques anomaux des leptons ont joué un rôle important dans le développement du modèle standard de la physique des particules. Aujourd’hui, celui du muon est mesuré très précisément et le sera avec une precision encore plus grande par une expérience qui débutera en 2017. Dans la mesure où la prédiction théorique pourra être faite avec des incertitudes comparables, un test rigoureux du modèle standard sera possible. Nous étudions ici le facteur limitant de cette prédiction, la contribution de la polarisation hadronique du vide à l’ordre dominant (HVP-LO). Nous calculons cette contribution numériquement à l’aide d’une version discrétisée de la théorie de l’interaction forte, la chromodynamique quantique sur réseau. Le calcul haute-performance permet de résoudre la théorie dans son régime hautement non-linéaire qui est le plus pertinent ici. Les algorithmes de simulation et les méthodes utilisées pour obtenir la polarisation hadronique, ainsi que les incertitudes associées, sont décrits. Ces méthodes sont ensuite appliquées à des simulations réalisées avec la collaboration Budapest-Marseille-Wuppertal. Dans un premier temps, elles sont implémentées dans une étude dédiée des effets de volume fini. Les méthodes les plus robustes sont ensuite utilisées pour calculer la polarisation hadronique avec des simulations qui comprennent N_f=2+1+1 saveurs de quarks. Celles-ci sont réalisées directement à la valeur physique des masses de quarks u, d, s et c, avec six tailles de maille et dans de gros volumes de 6 fm^3. Elles nous permettent de calculer la contribution HVP-LO au moment magnétique anomal du muon avec des erreurs contrôlées d’environ 3%. / The anomalous magnetic moments of leptons have played an important role in the development of the Standard Model of particle physics. Today, that of the muon is measured very precisely and will be so with even higher precision in an experiment that will begin in 2017. To the extent that the theoretical prediction can be made with comparable uncertainties, a rigorous test of the Standard Model will be possible. Here we study the limiting factor in this prediction, the leading-order hadronic vacuum polarization contribution (HVP-LO). We compute this contribution numerically with a discretized version of the theory of the strong interaction: lattice Quantum Chromodynamics. High-performance computing allows to solve the theory in its highly nonlinear regime, which is the one most relevant here. The simulation algorithms and the methods used to obtain the HVP, as well as the associated statistical and systematic uncertainties, are described. These methods are then applied to simulations performed with the Budapest-Marseille-Wuppertal collaboration. First they are implemented in a dedicated study of finite-volume effects. The most robust methods are then used to compute the HVP with simulations which include N_f=2+1+1 flavors of quarks. These are performed directly at the physical values of the u, d, s and c quark masses, with six lattice spacings and in large volumes of 6 fm^3. They allow us to compute the HVP-LO contribution to the anomalous magnetic moment of the muon with controlled errors of around 3%.
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Princípios de grandes desvios para a condutividade microscópica de férmions em cristais / Large Deviation Principles for the Microscopic Conductivity of Fermions in CrystalsAza, Nelson Javier Buitrago 08 November 2017 (has links)
Esta tese trata a existência de Princpios de Grandes Desvios (PGD), no âmbito de sistemas fermiônicos em equilbrio. A motivação fsica detrás de nossos estudos são medidas experimentais de resistência elétrica de nanofios de silcio dopados com átomos de fósforo. Estas medidas mostram que efeitos quânticos no transporte de carga elétrica quase desaparecem para nanofios de comprimentos maiores que alguns nanômetros, mesmo para temperaturas muito baixas (4.2°K). A fim de provar matematicamente tal efeito, dividimos nosso trabalho em diversos passos: 1. No primeiro passo, para férmions não interagentes numa rede com desordem, mostramos que a incerteza quântica da densidade da corrente elétrica microscópica, em torno de seus valores macroscópicos(clássicos), é suprimida exponencialmente rápido em relação ao volume da região da rede onde um campo elétrico externo é aplicado. A desordem é modelada como um potencial elétrico aleatório juntamente com amplitudes aleatórias de saltos com valores complexos. O célebre modelo de Anderson de tight-binding é um exemplo particular do caso geral considerado aqui. Nossa análise matemática é baseada em estimativas de Combes-Thomas, o Teorema Ergódico de Akcoglu-Krengel e no formalismo de Grandes Desvios, em particular o Teorema de Gärtner-Ellis. 2. Em segundo lugar, provamos que, para férmions interagindo fracamente na rede, as funções geradoras J(s), s R de cumulantes de distribuições de probabilidades associadas com estados KMS pode ser escrito como o limite de logartmos de integrais gaussianas de Berezin. Mostramos que os determinantes das covariáncias associadas às integrais gaussianas são majorados uniformemente (via desigualdades de Hölder para normas Schatten). Tais covariâncias são também somáveis, em casos gerais de interesse, incluindo assim, sistemas que não são invariantes por translação. 3. No terceiro passo, analisamos expansões de logartmos de integrais gaussianas de Berezin, e assim combinando com métodos construtivos de teoria quântica de campos, mostramos a analiticidade de J(s) para s nas vizinhanças de 0. Finalmente, discutimos como combinar os passos 2-3, a fim de provar (matematicamente falando) os resultados experimentais mencionados acima para férmions interagindo em equilbrio. De fato, os resultados encontrados nesta tese, generalizam trabalhos prévios no âmbito do PGD usado para o estudo de sistemas quânticos. / This Thesis deals with the existence of Large Deviation Principles (LDP) in the scope of fermionic systems at equilibrium. The physical motivation beyond our studies are experimental measures of electric resistance of nanowires in silicon doped with phosphorus atoms. The latter demonstrate that quantum effects on charge transport almost disappear for nanowires of lengths larger than a few nanometers, even at very low temperature (4.2°K). In order to mathematically prove the latter, we divide our work in several steps: 1. In the first step, for noninteracting lattice fermions with disorder, we show that quantum uncertainty of microscopic electric current density around their (classical) macroscopic values is suppressed, exponentially fast with respect to the volume of the region of the lattice where an external electric field is applied. Disorder is modeled by a random external potential along with random, complex-valued, hopping amplitudes. The celebrated tight-binding Anderson model is one particular example of the general case considered here. Our mathematical analysis is based on Combes-Thomas estimates, the Akcoglu-Krengel ergodic theorem, and the large deviation formalism, in particular the Gärtner-Ellis theorem. 2. Secondly, we prove that for weakly interacting fermions on the lattice, the logarithm moment generating function J(s), s R of probability distributions associated with KMS states can be written as the limit of logarithms of Gaussian Berezin integrals. The covariances of the Gaussian integrals are shown to have a uniform determinant bound (via Hölder inequalities for Schatten norms) and to be summable in general cases of interest, including systems that are not translation invariant. 3. In the third step we analyze expansions of logarithms of Gaussian Berezin integrals, which combined with constructive methods of quantum field theory is useful to show the analyticity of J(s) for s in a neighborhood of 0. We finally discuss how to combine steps 2-3 in order to prove (mathematically speaking) for interacting fermions in equilibrium the experimental results above mentioned. In fact, the found results in this Thesis generalize previous works in the scope of LDP used to study quantum systems.
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Wonderful renormalizationBerghoff, Marko 11 March 2015 (has links)
Die sogenannten wunderbaren Modelle für Teilraumanordnungen, eingeführt von DeConcini und Procesi, basierend auf den Techniken der Fulton und MacPherson''schen Kompaktifzierung von Konfigurationsräumen, ermöglichen es, eine Fortsetzung von Feynmandistributionen auf die ihnen zugeordneten divergenten Teilräume in kanonischer Weise zu definieren. Dies wurde in der Dissertation von Christoph Bergbauer ausgearbeitet und diese Arbeit führt die dort präsentierten Ideen weiter aus. Im Unterschied formulieren wir die zentralen Begriffe nicht in geometrischer Sprache, sondern mit Hilfe der partiell geordneten Menge der divergenten Subgraphen eines Feynmangraphen. Dieser Ansatz ist inspiriert durch Feichtners Formulierung der wunderbaren Modellkonstruktion aus kombinatorischer Sicht. Diese Betrachtungsweise vereinfacht die Darstellung deutlich und führt zu einem besseren Verständnis der Fortsetzungs- bzw. Renormierungsoperatoren. Darüber hinaus erlaubt sie das Studium der Renormierungsgruppe, d.h. zu untersuchen, wie sich die renormierten Distributionen unter einem Wechsel des Renormierungspunktes verhalten. Wir zeigen, dass eine sogenannte endliche Renormierung sich darstellen läßt als eine Summe von durch die divergenten Subgraphen bestimmten Distributionen. Dies alles unterstreicht den wohlbekannten Fakt, dass perturbative Renormierung zum größten Teil durch die Kombinatorik von Feynmangraphen bestimmt ist und die analytischen Aspekte nur eine untergeordnete Rolle spielen. / The so-called wonderful models of subspace arrangements, developed in by DeConcini and Procesi, based on Fulton and MacPherson''s seminal paper on a compactification of configuration space, serve as a systematic way to resolve the singularities of Feynman distributions and define in this way canonical renormalization operators. In this thesis we continue the work of Bergbauer where wonderful models were introduced to solve the renormalization problem in position space. In contrast to the exposition there, instead of the subspaces in the arrangement of divergent loci we use the poset of divergent subgraphs of a given Feynman graph as the main tool to describe the wonderful construction and the renormalization operators. This is based on a review article by Feichtner where wonderful models were studied from a purely combinatorial viewpoint. The main motivation for this approach is the fact that both, the renormalization process and the model construction, are governed by the combinatorics of this poset. Not only simplifies this the exposition considerably, but it also allows to study the renormalization operators in more detail. Moreover, we explore the renormalization group in this setting, i.e. we study how the renormalized distributions change if one varies the renormalization points. We show that a so-called finite renormalization is expressed as a sum of distributions determined by divergent subgraphs. The bottom line is that - as is well known, at the latest since the discovery of a Hopf algebra structure underlying renormalization - the whole process of perturbative renormalization is governed by the combinatorics of Feynman graphs while the calculus involved plays only a supporting role.
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Discrete quantum geometries and their effective dimensionThürigen, Johannes 09 September 2015 (has links)
In einigen Ansätzen zu einer Quantentheorie der Gravitation wie Gruppenfeldtheorie und Schleifenquantengravitation zeigt sich, dass Zustände und Entwicklungen der geometrischen Freiheitsgrade auf einer diskreten Raumzeit basieren. Die dringendste Frage ist dann, wie die glatten Geometrien der Allgemeinen Relativitätstheorie, beschrieben durch geeignete geometrische Beobachtungsgrößen, aus solch diskreten Quantengeometrien im semiklassischen und Kontinuums-Limes hervorgehen. Hier nehme ich die Frage geeigneter Beobachtungsgrößen mit Fokus auf die effektive Dimension der Quantengeometrien in Angriff. Dazu gebe ich eine rein kombinatorische Beschreibung der zugrunde liegenden diskreten Strukturen. Als Nebenthema erlaubt dies eine Erweiterung der Gruppenfeldtheorie, so dass diese den kombinatorisch größeren kinematischen Zustandsraum der Schleifenquantengravitation abdeckt. Zudem führe ich einen diskreten Differentialrechnungskalkül für Felder auf solch fundamental diskreten Geometrien mit einem speziellen Augenmerk auf dem Laplace-Operator ein. Dies ermöglicht die Definition der Dimensionsobservablen für Quantengeometrien. Die Untersuchung verschiedener Klassen von Quantengeometrien zeigt allgemein, dass die spektrale Dimension stärker von der zugrunde liegenden kombinatorischen Struktur als von den Details der zusätzlichen geometrischen Daten darauf abhängt. Semiklassische Zustände in Schleifenquantengravitation approximieren die entsprechenden klassischen Geometrien gut ohne Anzeichen für stärkere Quanteneffekte. Dagegen zeigt sich im Kontext eines allgemeineren, auf analytischen Lösungen basierenden Modells für Zustände, die aus Überlagerungen einer großen Anzahl von Komplexen bestehen, ein Fluss der spektralen Dimension von der topologischen Dimension d bei kleinen Energieskalen hin zu einem reellen Wert zwischen 0 und d bei hohen Energien. Im Spezialfall 1 erlauben diese Resultate, die Quantengeometrie als effektiv fraktal aufzufassen. / In several approaches towards a quantum theory of gravity, such as group field theory and loop quantum gravity, quantum states and histories of the geometric degrees of freedom turn out to be based on discrete spacetime. The most pressing issue is then how the smooth geometries of general relativity, expressed in terms of suitable geometric observables, arise from such discrete quantum geometries in some semiclassical and continuum limit. In this thesis I tackle the question of suitable observables focusing on the effective dimension of discrete quantum geometries. For this purpose I give a purely combinatorial description of the discrete structures which these geometries have support on. As a side topic, this allows to present an extension of group field theory to cover the combinatorially larger kinematical state space of loop quantum gravity. Moreover, I introduce a discrete calculus for fields on such fundamentally discrete geometries with a particular focus on the Laplacian. This permits to define the effective-dimension observables for quantum geometries. Analysing various classes of quantum geometries, I find as a general result that the spectral dimension is more sensitive to the underlying combinatorial structure than to the details of the additional geometric data thereon. Semiclassical states in loop quantum gravity approximate the classical geometries they are peaking on rather well and there are no indications for stronger quantum effects. On the other hand, in the context of a more general model of states which are superposition over a large number of complexes, based on analytic solutions, there is a flow of the spectral dimension from the topological dimension d on low energy scales to a real number between 0 and d on high energy scales. In the particular case of 1 these results allow to understand the quantum geometry as effectively fractal.
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