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Institute
In this thesis we investigate the role played by gauge fields in providing new observable signatures that can attest to the presence of color superconductivity in neutron stars. We show that thermal gluon fluctuations in color-flavor locked superconductors can substantially increase their critical temperature and also change the order of the transition, which becomes a strong first-order phase transition. Moreover, we explore the effects of strong magnetic fields on the properties of color-flavor locked superconducting matter. We find that both the energy gaps as well as the magnetization are oscillating functions of the magnetic field. Also, it is shown that the magnetization can be so strong that homogeneous quark matter becomes metastable for a range of parameters. This points towards the existence of magnetic domains or other types of magnetic inhomogeneities in the hypothesized quark cores of magnetars. Obviously, our results only apply if the strong magnetic fields observed on the surface of magnetars can be transmitted to their inner core. This can occur if the superconducting protons expected to exist in the outer core form a type-I I superconductor. However, it has been argued that the observed long periodic oscillations in isolated pulsars can only be explained if the outer core is a type-I superconductor rather than type-I I. We show that this is not the only solution for the precession puzzle by demonstrating that the long-term variation in the spin of PSR 1828-11 can be explained in terms of Tkachenko oscillations within superfluid shells.
Chapter 1 contains the general background of our work. We briefly discuss important aspects of quantum chromodynamics (QCD) and introduce the concept of the chiral condensate as an order parameter for the chiral phase transition. Our focus is on the concept of universality and the arguments why the O(4) model should fall into the same universality class as the effective Lagrangian for the order parameter of (massless) two-flavor QCD. Chapter 2 pedagogically explains the CJT formalism and is concerned with the WKB method. In chapter 3 the CJT formalism is then applied to a simple Z(2) symmetric toy model featuring a one-minimum classical potential. As for all other models we are concerned with in this thesis, we study the behavior at nonzero temperature. This is done in 1+3 dimensions as well as in 1+0 dimensions. In the latter case we are able to compare the effective potential at its global minimum (which is minus the pressure) with our result from the WKB approximation. In chapter 4 this program is also carried out for the toy model with a double-well classical potential, which allows for spontaneous symmetry breaking and tunneling. Our major interest however is in the O(2) model with the fields treated as polar coordinates. This model can be regarded as the first step towards the O(4) model in four-dimensional polar coordinates. Although in principle independent, all subjects discussed in this thesis are directly related to questions arising from the investigation of this particular model. In chapter 5 we start from the generating functional in cartesian coordinates and carry out the transition to polar coordinates. Then we are concerned with the question under which circumstances it is allowed to use the same Feynman rules in polar coordinates as in cartesian coordinates. This question turns out to be non-trivial. On the basis of the common Feynman rules we apply the CJT formalism in chapter 6 to the polar O(2) model. The case of 1+0 dimensions was intended to be a toy model on the basis of which one could more easily explore the transition to polar coordinates. However, it turns out that we are faced with an additional complication in this case, the infrared divergence of thermal integrals. This problem requires special attention and motivates the explicit study of a massless field under topological constraints in chapter 8. In chapter 7 we investigate the cartesian O(2) model in 1+0 dimensions. We compare the effective potential at its global minimum calculated in the CJT formalism and via the WKB approximation. Appendix B reviews the derivation of standard thermal integrals in 1+0 and 1+3 dimensions and constitutes the basis for our CJT calculations and the discussion of infrared divergences. In chapter 9 we discuss the so-called path integral collapse and propose a solution of this problem. In chapter 10 we present our conclusions and an outlook. Since we were interested in organizing our work as pedagogical as possible within the narrow scope of a diploma thesis, we decided to make extensive use of appendices. Appendices A-H are intended for students who are not familiar with several important concepts we are concerned with. We will refer to them explicitly to establish the connection between our work and the general context in which it is settled.
Chapter 1 contains the general background of our work. We briefly discuss important aspects of quantum chromodynamics (QCD) and introduce the concept of the chiral condensate as an order parameter for the chiral phase transition. Our focus is on the concept of universality and the arguments why the O(4) model should fall into the same universality class as the effective Lagrangian for the order parameter of (massless) two-flavor QCD. Chapter 2 pedagogically explains the CJT formalism and is concerned with the WKB method. In chapter 3 the CJT formalism is then applied to a simple Z2 symmetric toy model featuring a one-minimum classical potential. As for all other models we are concerned with in this thesis, we study the behavior at nonzero temperature. This is done in 1+3 dimensions as well as in 1+0 dimensions. In the latter case we are able to compare the effective potential at its global minimum (which is minus the pressure) with our result from the WKB approximation. In chapter 4 this program is also carried out for the toy model with a double-well classical potential, which allows for spontaneous symmetry breaking and tunneling. Our major interest however is in the O(2) model with the fields treated as polar coordinates. This model can be regarded as the first step towards the O(4) model in four-dimensional polar coordinates. Although in principle independent, all subjects discussed in this thesis are directly related to questions arising from the investigation of this particular model. In chapter 5 we start from the generating functional in cartesian coordinates and carry out the transition to polar coordinates. Then we are concerned with the question under which circumstances it is allowed to use the same Feynman rules in polar coordinates as in cartesian coordinates. This question turns out to be non-trivial. On the basis of the common Feynman rules we apply the CJT formalism in chapter 6 to the polar O(2) model. The case of 1+0 dimensions was intended to be a toy model on the basis of which one could more easily explore the transition to polar coordinates. However, it turns out that we are faced with an additional complication in this case, the infrared divergence of thermal integrals. This problem requires special attention and motivates the explicit study of a massless field under topological constraints in chapter 8. In chapter 7 we investigate the cartesian O(2) model in 1+0 dimensions. We compare the effective potential at its global minimum calculated in the CJT formalism and via the WKB approximation. Appendix B reviews the derivation of standard thermal integrals in 1+0 and 1+3 dimensions and constitutes the basis for our CJT calculations and the discussion of infrared divergences. In chapter 9 we discuss the so-called path integral collapse and propose a solution of this problem. In chapter 10 we present our conclusions and an outlook. Since we were interested in organizing our work as pedagogical as possible within the narrow scope of a diploma thesis, we decided to make extensive use of appendices. Appendices A-H are intended for students who are not familiar with several important concepts we are concerned with. We will refer to them explicitly to establish the connection between our work and the general context in which it is settled.
Of central importance in the whole thesis is the concept of the generating functional and the partition function, respectively. In appendix A.1 we present the general context in which the partition function appears and its general definition within the operator formalism of second quantization. Alternatively, this definition can be rewritten via the path integral formalism. We restrict ourselves to scalar fields in this case. Furthermore, the understanding of the CJT formalism is based on knowledge about n-point functions (connected or disconnected, in the presence or in the absence of sources) and the context in which they arise. In appendix A.2 we give their definition taking account of the different modifications in which these quantities occur in this thesis, i.e., scalar field theory at zero or at nonzero temperature, respectively. From a didactic point of view, we believe that it is helpful if one can establish a relation between special cases and a general framework. Therefore, in appendix A.3 we want to keep an eye on the overall picture. We discuss the general concept of the generating functional for correlation functions, which also covers the partition function. We also briefly comment on the general concept of Feynman rules and we clarify the meaning of the terms Green’s function and propagator.
In this work we study basic properties of unstable particles and scalar hadronic resonances, respectively, within simple quantum mechanical and quantum field theoretical (effective) models. The term 'particle' is usually assigned to entities, described by physical theories, that are able to propagate over sufficiently large time scales (e.g. from a source to a detector) and hence could be identified in experiments - one especially should be able to measure some of their distinct properties like spin or charge. Nevertheless, it is well known that there exists a huge amount of unstable particles to which it seems difficult to allocate such definite values for their mass and decay width. In fact, for extremely short-lived members of that species, so called resonances, the theoretical description turns out to be highly complicated and requires some very interesting concepts of complex analysis.
In the first chapter, we start with the basic ideas of quantum field theory. In particular, we introduce the Feynman propagator for unstable scalar resonances and motivate the idea that this kind of correlation function should possess complex poles which parameterize the mass and decay width of the considered particle. We also brie
y discuss the problematic scalar sector in particle physics, emphasizing that hadronic loop contributions, given by strongly coupled hadronic intermediate states, dominate its dynamics. After that, the second chapter is dedicated to the method of analytic continuation of complex functions through branch cuts. As will be seen in the upcoming sections, this method is crucial in order to describe physics of scalar resonances because the relevant functions to be investigated (namely, the Feynman propagator of interacting quantm field theories) will also have branch cuts in the complex energy plane due to the already mentioned loop contributions. As is consensus among the physical community, the understanding of the physical behaviour of resonances requires a deeper insight of what is going on beyond the branch cut. This will lead us to the idea of a Riemann surface, a one-dimensional complex manifold on which the Feynman propagator is defined.
We then apply these concepts to a simple non-relativistic Lee model in the third chapter and demonstrate the physical implications, i.e., the motion of the propagator poles and the behaviour of the spectral function. Besides that, we investigate the time evolution of a particle described by such a model. All this will serve as a detailed preparation in order to encounter the rich phenomena occuring on the Riemann surface in quantum field theory. In the last chapter, we finally concentrate on a simple quantm field theoretical model which describes the decay of a scalar state into two (pseudo)scalar ones. It is investigated how the motion of the propagator poles is in
uenced by loop contributions of the two (pseudo)scalar particles. We perform a numerical study for a hadronic system involving a scalar seed state (alias the σ-meson) that couples to pions. The unexpected emergence of a putative stable state below the two-pion threshold is investigated and it is claeifieed under which conditions such a stable state appears.
Low-energy effective models for two-flavor quantum chromodynamics and the universality hypothesis
(2014)
Die Untersuchung der Natur auf extremen Längenskalen hat seit jeher zu bahnbrechenden Einsichten und Innovationen geführt. Insbesondere zu unserem heutigen Verständnis, dass Nukleonen (Protonen und Neutronen) aus Quarks zusammengesetzt sind, die infolge der starken Wechselwirkung, vermittelt durch Gluonenaustausch, gebunden sind. Mit dem Aufkommen des Quarkmodells wurde bald die Quantenchromodynamik (QCD) erfolgreich in der Beschreibung vieler messbarer Eigenschaften der starken Wechselwirkung. Um es mit Goethe zu sagen: mit den modernen Hochenergie-Beschleuniger-Experimenten wird versucht unser Verständnis davon zu verbessern, was die Welt im Innersten zusammenhält. Am Large Hadron Collider (LHC) werden beispielsweise Protonen derart beschleunigt und miteinander zur Kollision gebracht, dass bislang unerreichte Energiedichten auftreten, infolge derer Temperatur und baryochemisches Potential Werte annehmen, die mit denen des frühen Universums vergleichbar sind. Es gibt sowohl theoretische als auch experimentelle Hinweise darauf, dass hadronische Materie mit zunehmender Temperatur und/oder zunehmendem baryochemischen Potentials einen Phasenübergang durchläuft, hin zu einem exotischen Zustand, der als Quark-Gluon-Plasma bekannt ist. Dieser Übergang wird begleitet von einem sogenannten chiralen Übergang. Es ist eine wichtige Frage, ob es sich bei diesem chiralen Übergang um einen echten Phasenübergang (von erster bzw. zweiter Ordnung) handelt, oder ob ein sogenannter crossover vorliegt. Einige Resultate deuten auf einen crossover für verschwindendes baryochemisches Potential und einen Phasenübergang erster Ordnung für verschwindende Temperatur hin, lassen jedoch noch keinen endgültigen Schluss zu, ob dies tatsächlich der Realität entspricht. Wenn ja, so liegt die Annahme nahe, dass ein kritischer Endpunkt existiert, an dem der chirale Übergang von zweiter Ordnung ist. In der Tat existiert ein kritischer Endpunkt in einigen theoretischen Zugängen zur Beschreibung des chiralen Phasenübergangs, deren Aussagekraft seit jeher lebhaft diskutiert wird. Ein zentrales Ziel des zukünftigen CBM-Experiments an der GSI in Darmstadt ist es, die Existenz im Experiment zu überprüfen.
In der Nähe des QCD-(Phasen)übergangs ist es die Abwesenheit jeglicher perturbativer Entwicklungsparameter, die exakte analytische Berechnungen verbietet. Das gleiche gilt für realistische effektive Modelle für QCD. Nichtperturbative Methoden sind daher unverzichtbar für die Untersuchung des QCD-Phasendiagramms. Zu den populärsten dieser Zugänge gehören Gitter-QCD, Resummierungsverfahren, der Dyson-Schwinger-Formalismus, sowie die Funktionale Renormierungsgruppe (FRG). All diese Methoden ergänzen sich gegenseitig und werden zum Teil auch miteinander kombiniert. Eine der Stärken der FRG-Methode ist, dass sie nicht nur erfolgreich auf effektive Modelle angewendet werden kann, sondern auch auf QCD selbst. Für letztere Ab-Initio-Rechnungen sind die aus effektiven Modellen für QCD gewonnenen Resultate von grossem Wert.
Der Schwerpunkt der vorliegenden Arbeit liegt auf der Fragestellung von welcher Ordnung der chirale Phasenübergang im Fall von genau zwei leichten Quarksorten ist. Problemstellungen wie die Suche nach einer Antwort auf die Frage nach den Bedingungen für die Existenz eines Phasenübergangs zweiter Ordnung, die Bestimmung der Universalitätsklasse in diesem Fall etc. erfordern Wissen aus verschiedenen Gebieten.
Kapitel 1 besteht aus einer allgemeinen Einleitung.
In Kapitel 2 stellen wir zunächst einige allgemeine Aspekte von Phasenübergängen dar, die von besonderer Relevanz für das Verständnis des Renormierungsgruppen-Zugangs zu ebendiesen sind. Unser Fokus liegt hierbei auf einer kritischen Untersuchung der Universalitätshypothese. Insbesondere die Rechtfertigung des linearen Sigma-Modells als effektive Theorie für den chiralen Ordnungsparameter beruht auf der Gültigkeit selbiger.
Kapitel 3 beschäftigt sich mit dem chiralen Phasenübergang von einem allgemeinen Standpunkt aus. Wir ergünzen wohlbekannte Fakten durch eine detaillierte Diskussion der sogenannten O(4)-Hypothese. Die Überprüfung der Gültigkeit selbiger wird schließlich in Kapitel 6 und 7 in Angriff genommen.
In Kapitel 4 stellen wir die von uns benutzte FRG-Methode vor. Außerdem diskutieren wir den Zusammenhang zwischen effektiven Theorien für QCD und der QCD selbst.
Kapitel 5 behandelt ein mathematisches Thema, das für alle unserer Untersuchungen unabdingbar ist, nämlich die systematische Konstruktion polynomialer Invarianten zu einer gegebenen Symmetrie. Wir präsentieren einen einfachen, jedoch neuartigen, Algorithmus für die praktische Konstruktion von Invarianten einer gegebenen polynomialen Ordnung.
Kapitel 6 widmet sich Renormierungsgruppen-Studien einer Reihe dimensional reduzierter Theorien. Von zentralem Interesse ist hierbei das lineare Sigma-Modell, insbesondere in Anwesenheit der axialen Anomalie. Es stellt sich heraus, dass die Fixpunkt-Struktur des letzteren vergleichsweise kompliziert ist und ein tieferes Verständnis der zugrundeliegenden Methode sowie ihrer Annahmen erfordert. Dies führt uns zu einer sorgfältigen Analyse der Fixpunkt-Struktur von Modellen verschiedenster Symmetrien. Im Zusammenhang mit der Untersuchung des Einflusses von Vektor- und Axial-Vektor-Mesonen stoßen wir hierbei auf eine neue Universalitä}tsklasse.
Während wenig Spielraum für die Wahl der Symmetriegruppe der effektiven Theorie für den chiralen Ordnungsparameter besteht, ist die Identifizierung der Ordnungsparameter-Komponenten mit den relevanten mesonischen Freiheitsgraden hochgradig nichttrivial. Diese Wahl entspricht der Wahl einer Darstellung der Gruppe und kann zur Zeit nicht eindeutig aus der QCD hergeleitet werden. Es ist daher unerlässlich, verschiedene Möglichkeiten auszutesten. Eine wohlbekannte Wahl besteht darin, das Pion und seinen chiralen Partner, das Sigma-Meson, der O(4)-Darstellung für SU(2)_A x SU(2)_V zuzuordnen, welche einen Phasenübergang zweiter Ordnung erlaubt. Dieses Szenario ist jedoch nur dann sinnvoll, wenn nahe der kritischen Temperatur alle anderen Mesonen entsprechend schwer sind. Im Fall von genau zwei leichten Quarkmassen erfordert dies eine hinreichend große Anomaliestärke. Berücksichtigt man zusätzlich zum Pion und Sigma-Meson auch das Eta-Meson und das a_0-Meson, liefern unsere derzeitigen expliziten Rechnungen keinen Nachweis für die Existenz eines Phasenübergang zweiter Ordnung. Stattdessen spricht die Abwesenheit eines physikalischen (hinsichtlich der Massen) infrarot-stabilen Fixpunktes für einen fluktuationsinduzierten Phasenübergang erster Ordnung. Dieses Ergebnis ist auch zu erwarten (jedoch nicht impliziert), allein durch die Existenz zweier quadratischer Invarianten. Es besteht jedoch immer noch eine hypothetische Chance auf einen Phasenübergang zweiter Ordnung in der SU(2)_A x U(2)_V -Universalitätsklasse. Dies wäre der Fall, wenn der entsprechende von uns gefundene unphysikalische infrarot-stabile Fixpunkt physikalisch werden sollte in höherer Trunkierungsordnung. Interessanterweise finden wir bei endlicher Temperatur für gewisse Parameter einen Phasenübergang zweiter Ordnung. Es ist unklar, ob diese Wahl der Parameter in den Gültigkeitsbereich der dimensional reduzierten Theorie fällt.
Erst vor kurzem (Ende September 2013) wurde die Existenz eines infrarot-stabilen U(2)_A x U(2)_V-symmetrischen Fixpunkts durch Pelissetto und Vicari verifiziert (die zugehörige anomale Dimension ist mit 0.12 angegeben). Dieses Resultat war sehr
überraschend, da für zwei leichte Quarksorten und abwesende Anomalie ein Phasenübergang erster Ordnung relativ gesichert erschien, insbesondere durch die Epsilon-Entwicklung. Offensichtlich versagt letztere jedoch im Limes D=3, also für drei räumliche Dimensionen, da lediglich Fixpunkte gefunden werden können, die auch nahe D=4 existieren. Inspiriert durch diesen wichtigen Fund führen wir eine FRG-Fixpunktstudie in lokaler Potential-Näherung und hoher Trunkierungsordnung (bis zu zehnter Ordnung in den Feldern) durch. Die Stabilitätsanalyse besitzt jedoch leider keine Aussagekraft, da die Stabilitätsmatrix für den Gaußschen Fixpunkt marginale Eigenwerte besitzt. Wir sind überzeugt davon, dass dies nicht mehr der Fall ist, wenn man über die lokale Potential-Näherung hinausgeht und eine nichtverschwindende anomale Dimension zulässt. Die bisherigen Resultate verdeutlichen die Limitierungen der lokalen Potential-Näherung und der Epsilon-Entwicklung, auf denen unsere Untersuchungen zur Universalitätshypothese in weiten Teilen beruhen. Systematische Untersuchungen der Fixpunktstruktur von Modellen mit acht Ordnungsparameter-Komponenten wurden in der Literatur im Rahmen der Epsilon-Entwicklung durchgeführt und im Rahmen dieser Dissertation innerhalb der lokalen Potential-Näherung. Die meisten der Vorhersagen der Epsilon-Entwicklung konnten bestätigt werden, einige hingegen werden in Frage gestellt durch das Auftauchen marginaler Stabilitätsmatrix-Eigenwerte.
Einige wichtige Fragestellungen können nicht im Rahmen einer dimensional reduzierten Theorie behandelt werden, da die explizite Temperaturabhängigkeit in diesem Fall eliminiert wurde.
Insbesondere ist es in diesem Fall nicht möglich, die Stärke eines Phasenübergangs erster Ordnung vorherzusagen, da diese von Observablen (Meson-Massen und die Pion-Zerfallskonstante im Vakuum) abhängen, an die man bei verschwindender Temperatur fitten muss. Dieser Umstand führt uns zu solchen FRG-Studien, in denen die Temperatur als expliziter Parameter verbleibt.
Ein beträchtlicher Teil der für die vorliegende Dissertation zur Verfügung stehenden Arbeitszeit wurde darauf verwendet, eigene Implementierungen geeigneter Algorithmen zur numerischen Lösung der auftretenden partiellen Differentialgleichungen zu finden. Exemplarische Routinen (welche ausschließlich wohlbekannte Methoden nutzen) sind in einem Anhang zur Verfügung gestellt. Das Hauptziel der vorliegenden Arbeit, die Anwendung auf effektive Modelle für QCD, wird in Kapitel 7 präsentiert. Unsere (vorläufigen) FRG-Studien des linearen Sigma-Modells mit axialer Anomalie bei nichtverschwindender Temperatur erlauben verschiedene Szenarien. Sowohl einen extrem schwach ausgeprägten, als auch einen sehr deutlichen Phasenübergang erster Ordnung, ganz abhängig von der Wahl der Ultraviolett-Abschneideskala und oben genannter Parameter. Sogar ein Phasenübergang zweiter Ordnung scheint möglich für gewisse Parameterwerte. Um verlässliche Schlussfolgerungen zu ziehen, sind weitere Untersuchungen nötig und bereits im Gange. In Kapitel 7 verifizieren wir außerdem bereits bekannte numerische Resultate für das Quark-Meson-Modell.
In this work the main emphasis is put on the investigation of relativistic shock waves and Mach cones in hot and dense matter using the microscopic transport model BAMPS, based on the relativistic Boltzmann equation. Using this kinetic approach we study the complete transition from ideal-fluid behavior to free streaming. This includes shock-wave formation in a simplified (1+1)-dimensional setup as well as the investigation of Mach-cone formation induced by supersonic projectiles and/or jets in (2+1)- and (3+1)-dimensional static and expanding systems. We further address the question whether jet-medium interactions inducing Mach cones can contribute to a double-peak structure observed in two-particle correlations in heavy-ion collision experiments. Furthermore, BAMPS is used as a benchmark to compare kinetic theory to several relativistic hydrodynamic theories in order to verify their accuracy and to find their limitations.
This thesis explores the phase diagrams of the Nambu--Jona-Lasinio (NJL) and quark-meson (QM) model in the mean-field approximation and beyond. The focus lies in the investigation of the interplay between inhomogeneous chiral condensates and two-flavor color superconductivity.
In the first part of this thesis, we study the NJL model with 2SC diquarks in the mean-field approximation and determine the dispersion relations for quasiparticle excitations for generic spatial modulations of the chiral condensate in the presence of a homogeneous 2SC-diquark condensate, provided that the dispersion relations in the absence of color superconductivity are known. We then compare two different Ansätze for the chiral order parameter, the chiral density wave (CDW) and the real-kink crystal (RKC). For both Ansätze we find for specific diquark couplings a so-called coexistence phase where both the inhomogeneous chiral condensate and the diquark condensate coexist. Increasing the diquark coupling disfavors the coexistence phase in favor of a pure diquark phase.
On the other hand, decreasing the diquark coupling favors the inhomogeneous phase over the coexistence phase.
In the second part of this thesis the functional renormalization group is employed to study the phase diagram of the quark-meson-diquark model. We observe that the region of the phase diagram found in previous studies, where the entropy density takes on unphysical negative values, vanishes when including diquark degrees of freedom. Furthermore, we perform a stability analysis of the homogeneous phase and compare the results with those of previous studies. We find that an increasing diquark coupling leads to a smaller region of instability as the 2SC phase extends to a smaller chemical potential. We also find a region where simultaneously an instability occurs and a non-vanishing diquark condensate forms, which is an indication of the existence of a coexistence phase in accordance with the results of the first part of this work.
In this thesis we explore the characteristics of strongly interacting matter, described by Quantum Chromodynamics (QCD). In particular, we investigate the properties of QCD at extreme densities, a region yet to be explored by first principle methods. We base the study on lattice gauge theory with Wilson fermions in the strong coupling, heavy quark regime. We expand the lattice action around this limit, and carry out analytic integrals over the gauge links to obtain an effective, dimensionally reduced, theory of Polyakov loop interactions.
The 3D effective theory suffers only from a mild sign problem, and we briefly outline how it can be simulated using either Monte Carlo techniques with reweighting, or the Complex Langevin flow. We then continue to the main topic of the thesis, namely the analytic treatment of the effective theory. We introduce the linked cluster expansion, a method ideal for studying thermodynamic expansions. The complex nature of the effective theory action requires the development of a generalisation of the linked cluster expansion. We find a mapping between generalised linked cluster expansion and our effective theory, and use this to compute the thermodynamic quantities.
Lastly, various resummation techniques are explored, and a chain resummation is implemented on the level of the effective theory itself. The resummed effective theory describes not only nearest neighbour, next to nearest neighbour, and so on, interactions, but couplings at all distances, making it well suited for describing macroscopic effects. We compute the equation of state for cold and dense heavy QCD, and find a correspondence with that of non-relativistic free fermions, indicating a shift of the dynamics in the continuum.
We conclude this thesis by presenting two possible extensions to new physics using the techniques outlined within. First is the application of the effective theory in the large-$N_c$ limit, of particular interest to the study of conformal field theory. Second is the computation of analytic Yang Lee zeros, which can be applied in the search for real phase transitions.
For finite baryon chemical potential, conventional lattice descriptions of quantum chromodynamics (QCD) have a sign problem which prevents straightforward simulations based on importance sampling.
In this thesis we investigate heavy dense QCD by representing lattice QCD with Wilson fermions at finite temperature and density in terms of Polyakov loops.
We discuss the derivation of $3$-dimensional effective Polyakov loop theories from lattice QCD based on a combined strong coupling and hopping parameter expansion, which is valid for heavy quarks.
The finite density sign problem is milder in these theories and they are also amenable to analytic evaluations.
The analytic evaluation of Polyakov loop theories via series expansion techniques is illustrated by using them to evaluate the $\SU{3}$ spin model.
We compute the free energy density to $14$th order in the nearest neighbor coupling and find that predictions for the equation of state agree with simulations to $\mathcal{O}(1\%)$ in the phase were the (approximate) $Z(3)$ center symmetry is intact.
The critical end point is also determined but with less accuracy and our results agree with numerical results to $\mathcal{O}(10\%)$.
While the accuracy for the endpoint is limited for the current length of the series, analytic tools provide valuable insight and are more flexible.
Furthermore they can be generalized to Polyakov-loop-theories with $n$-point interactions.
We also take a detailed look at the hopping expansion for the derivation of the effective theory.
The exponentiation of the action is discussed by using a polymer expansion and we also explain how to obtain logarithmic resummations for all contributions, which will be achieved by employing the finite cluster method know from condensed matter physics.
The finite cluster method can also be used to evaluate the effective theory and comparisons of the evaluation of the effective action and a direction evaluation of the partition function are made.
We observe that terms in the evaluation of the effective theory correspond to partial contractions in the application of Wick's theorem for the evaluation of Grassmann-valued integrals.
Potential problems arising from this fact are explored.
Next to next to leading order results from the hopping expansion are used to analyze and compare the onset transition both for baryon and isospin chemical potential.
Lattice QCD with an isospin chemical potential does not have a sign problem and can serve as a valuable cross-check.
Since we are restricted by the relatively short length of our series, we content ourselves with observing some qualitative phenomenological properties arising in the effective theory which are relevant for the onset transition.
Finally, we generalize our results to arbitrary number of colors $N_c$.
We investigate the transition from a hadron gas to baryon condensation and find that for any finite lattice spacing the transition becomes stronger when $N_c$ is increased and to be first order in the limit of infinite $N_c$.
Beyond the onset, the pressure is shown to scale as $p \sim N_c$ through all available orders in the hopping expansion, which is characteristic for a phase termed quarkyonic matter in the literature.
Some care has to be taken when approaching the continuum, as we find that the continuum limit has to be taken before the large $N_c$ limit.
Although we currently are unable to take the limits in this order, our results are stable in the controlled range of lattice spacings when the limits are approached in this order.
I derive a general effective theory for hot and/or dense quark matter. After introducing general projection operators for hard and soft quark and gluon degrees of freedom, I explicitly compute the functional integral for the hard quark and gluon modes in the QCD partition function. Upon appropriate choices for the projection operators one recovers various well-known effective theories such as the Hard Thermal Loop/ Hard Dense Loop Effective Theories as well as the High Density Effective Theory by Hong and Schaefer. I then apply the effective theory to cold and dense quark matter and show how it can be utilized to simplify the weak-coupling solution of the color-superconducting gap equation. In general, one considers as relevant quark degrees of freedom those within a thin layer of width 2 Lambda_q around the Fermi surface and as relevant gluon degrees of freedom those with 3-momenta less than Lambda_gl. It turns out that it is necessary to choose Lambda_q << Lambda_gl, i.e., scattering of quarks along the Fermi surface is the dominant process. Moreover, this special choice of the two cutoff parameters Lambda_q and Lambda_gl facilitates the power-counting of the numerous contributions in the gap-equation. In addition, it is demonstrated that both the energy and the momentum dependence of the gap function has to be treated self-consistently in order to determine the imaginary part of the gap function. For quarks close to the Fermi surface the imaginary part is calculated explicitly and shown to be of sub-subleading order in the gap equation.