Related papers: Quantum geometry in many-body systems with precursors of criticality

Quantum geometry in many-body systems with precursors of criticality

URL: http://arxiv.org/abs/2411.03967v1
Date: Wed, 06 Nov 2024 15:06:05 GMT
Title: Quantum geometry in many-body systems with precursors of criticality
Authors: Jan Střeleček, Pavel Cejnar,
Abstract summary: We analyze the geometry of the ground-state manifold in parameter-dependent many-body systems with quantum phase transitions (QPTs) We elucidate the role of diabolic points in the formation of first-order QPTs, showing that these isolated geometric singularities represent seeds generating irregular behavior of geodesics in finite systems.
Score: 0.0
License:
Abstract: We analyze the geometry of the ground-state manifold in parameter-dependent many-body systems with quantum phase transitions (QPTs) and describe finite-size precursors of the singular geometry emerging at the QPT boundary in the infinite-size limit. In particular, we elucidate the role of diabolic points in the formation of first-order QPTs, showing that these isolated geometric singularities represent seeds generating irregular behavior of geodesics in finite systems. We also demonstrate that established approximations, namely the mean field approximation in many-body systems composed of mutually interacting bosons and the two-level approximation near a diabolic point, are insufficient to provide a reliable description of geometry. The outcomes of the general analysis are tested and illustrated by a specific bosonic model from the Lipkin-Meshkov-Glick family.

Related papers

Gaussian Entanglement Measure: Applications to Multipartite Entanglement of Graph States and Bosonic Field Theory [50.24983453990065]
An entanglement measure based on the Fubini-Study metric has been recently introduced by Cocchiarella and co-workers. We present the Gaussian Entanglement Measure (GEM), a generalization of geometric entanglement measure for multimode Gaussian states. By providing a computable multipartite entanglement measure for systems with a large number of degrees of freedom, we show that our definition can be used to obtain insights into a free bosonic field theory.
arXiv Detail & Related papers (2024-01-31T15:50:50Z)
Action formalism for geometric phases from self-closing quantum trajectories [55.2480439325792]
We study the geometric phase of a subset of self-closing trajectories induced by a continuous Gaussian measurement of a single qubit system. We show that the geometric phase of the most likely trajectories undergoes a topological transition for self-closing trajectories as a function of the measurement strength parameter.
arXiv Detail & Related papers (2023-12-22T15:20:02Z)
Dynamics and Geometry of Entanglement in Many-Body Quantum Systems [0.0]
A new framework is formulated to study entanglement dynamics in many-body quantum systems. The Quantum Correlation Transfer Function (QCTF) is transformed into a new space of complex functions with isolated singularities. The QCTF-based geometric description offers the prospect of theoretically revealing aspects of many-body entanglement.
arXiv Detail & Related papers (2023-08-18T19:16:44Z)
Rigorous analysis of the topologically protected edge states in the quantum spin Hall phase of the armchair ribbon geometry [1.2999413717930817]
We present a novel analytical approach for obtaining explicit expressions for the edge states in the Kane-Mele model. We determine various analytical properties of the edge states, including their wave functions and energy dispersion. Our findings shed light on the unique characteristics of the edge states in the quantum spin Hall phase of the Kane-Mele model.
arXiv Detail & Related papers (2023-06-06T14:00:25Z)
Differential geometry with extreme eigenvalues in the positive semidefinite cone [1.9116784879310025]
We present a route to a scalable geometric framework for the analysis and processing of SPD-valued data based on the efficient of extreme generalized eigenvalues. We define a novel iterative mean of SPD matrices based on this geometry and prove its existence and uniqueness for a given finite collection of points.
arXiv Detail & Related papers (2023-04-14T18:37:49Z)
Pointillisme \`a la Signac and Construction of a Pseudo Quantum Phase Space [0.0]
We construct a quantum-mechanical substitute for the symplectic phase space. The total space of this fiber bundle consists of geometric quantum states. We show that the set of equivalence classes of unitarily related geometric quantum states is in a one-to-one correspondence with the set of all Gaussian wavepackets.
arXiv Detail & Related papers (2022-07-31T16:43:06Z)
Topological squashed entanglement: nonlocal order parameter for one-dimensional topological superconductors [0.0]
We show the end-to-end, long-distance, bipartite squashed entanglement between the edges of a many-body system. For the Kitaev chain in the entire topological phase, the edge squashed entanglement is quantized to log(2)/2, half the maximal Bell-state entanglement, and vanishes in the trivial phase. Such topological squashed entanglement exhibits the correct scaling at the quantum phase transition, is stable in the presence of interactions, and is robust against disorder and local perturbations.
arXiv Detail & Related papers (2022-01-28T10:57:51Z)
A singular Riemannian geometry approach to Deep Neural Networks I. Theoretical foundations [77.86290991564829]
Deep Neural Networks are widely used for solving complex problems in several scientific areas, such as speech recognition, machine translation, image analysis. We study a particular sequence of maps between manifold, with the last manifold of the sequence equipped with a Riemannian metric. We investigate the theoretical properties of the maps of such sequence, eventually we focus on the case of maps between implementing neural networks of practical interest.
arXiv Detail & Related papers (2021-12-17T11:43:30Z)
Quantum particle across Grushin singularity [77.34726150561087]
We study the phenomenon of transmission across the singularity that separates the two half-cylinders. All the local realisations of the free (Laplace-Beltrami) quantum Hamiltonian are examined as non-equivalent protocols of transmission/reflection. This allows to comprehend the distinguished status of the so-called bridging' transmission protocol previously identified in the literature.
arXiv Detail & Related papers (2020-11-27T12:53:23Z)
Hilbert-space geometry of random-matrix eigenstates [55.41644538483948]
We discuss the Hilbert-space geometry of eigenstates of parameter-dependent random-matrix ensembles. Our results give the exact joint distribution function of the Fubini-Study metric and the Berry curvature. We compare our results to numerical simulations of random-matrix ensembles as well as electrons in a random magnetic field.
arXiv Detail & Related papers (2020-11-06T19:00:07Z)
Probing chiral edge dynamics and bulk topology of a synthetic Hall system [52.77024349608834]
Quantum Hall systems are characterized by the quantization of the Hall conductance -- a bulk property rooted in the topological structure of the underlying quantum states. Here, we realize a quantum Hall system using ultracold dysprosium atoms, in a two-dimensional geometry formed by one spatial dimension. We demonstrate that the large number of magnetic sublevels leads to distinct bulk and edge behaviors.
arXiv Detail & Related papers (2020-01-06T16:59:08Z)

This list is automatically generated from the titles and abstracts of the papers in this site.