Finite-density phase diagram of a (1+1)-d non-abelian lattice gauge theory with tensor networks

We investigate the finite-density phase diagram of a non-abelian SU(2) lattice gauge theory in (1+1)-dimensions using tensor network methods. We numerically characterise the phase diagram as a function of the matter filling and of the matter-field coupling, identifying different phases, some of them...

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Veröffentlicht in:	arXiv.org 2017-04
Hauptverfasser:	Silvi, Pietro, Rico, Enrique, Dalmonte, Marcello, Tschirsich, Ferdinand, Montangero, Simone
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Sprache:	eng
Schlagworte:	Broken symmetry Charge density waves Couplings Critical point Gauge theory Liquid phases Mathematical analysis Mathematical models Mesons Numerical methods Perturbation methods Perturbation theory Phase diagrams Phase transitions Physics - High Energy Physics - Lattice Physics - Quantum Physics Physics - Statistical Mechanics Symmetry Tensors
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description	We investigate the finite-density phase diagram of a non-abelian SU(2) lattice gauge theory in (1+1)-dimensions using tensor network methods. We numerically characterise the phase diagram as a function of the matter filling and of the matter-field coupling, identifying different phases, some of them appearing only at finite densities. For weak matter-field coupling we find a meson BCS liquid phase, which is confirmed by second-order analytical perturbation theory. At unit filling and for strong coupling, the system undergoes a phase transition to a charge density wave of single-site (spin-0) mesons via spontaneous chiral symmetry breaking. At finite densities, the chiral symmetry is restored almost everywhere, and the meson BCS liquid becomes a simple liquid at strong couplings, with the exception of filling two-thirds, where a charge density wave of mesons spreading over neighbouring sites appears. Finally, we identify two tri-critical points between the chiral and the two liquid phases which are compatible with a $SU(2)_2$ Wess-Zumino-Novikov-Witten model. Here we do not perform the continuum limit but we explicitly address the global $U(1)$ charge conservation symmetry.
doi_str_mv	10.48550/arxiv.1606.05510
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We numerically characterise the phase diagram as a function of the matter filling and of the matter-field coupling, identifying different phases, some of them appearing only at finite densities. For weak matter-field coupling we find a meson BCS liquid phase, which is confirmed by second-order analytical perturbation theory. At unit filling and for strong coupling, the system undergoes a phase transition to a charge density wave of single-site (spin-0) mesons via spontaneous chiral symmetry breaking. At finite densities, the chiral symmetry is restored almost everywhere, and the meson BCS liquid becomes a simple liquid at strong couplings, with the exception of filling two-thirds, where a charge density wave of mesons spreading over neighbouring sites appears. Finally, we identify two tri-critical points between the chiral and the two liquid phases which are compatible with a $SU(2)_2$ Wess-Zumino-Novikov-Witten model. 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subjects	Broken symmetry Charge density waves Couplings Critical point Gauge theory Liquid phases Mathematical analysis Mathematical models Mesons Numerical methods Perturbation methods Perturbation theory Phase diagrams Phase transitions Physics - High Energy Physics - Lattice Physics - Quantum Physics Physics - Statistical Mechanics Symmetry Tensors
title	Finite-density phase diagram of a (1+1)-d non-abelian lattice gauge theory with tensor networks
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