Related papers: Classification of dynamical Lie algebras for translation-invariant 2-local spin systems in one dimension

Classification of dynamical Lie algebras for translation-invariant 2-local spin systems in one dimension

URL: http://arxiv.org/abs/2309.05690v2
Date: Sat, 23 Sep 2023 14:02:13 GMT
Title: Classification of dynamical Lie algebras for translation-invariant 2-local spin systems in one dimension
Authors: Roeland Wiersema, Efekan K\"okc\"u, Alexander F. Kemper, Bojko N. Bakalov
Abstract summary: We provide a classification of Lie algebras generated by translation-invariant 2-local spin chain Hamiltonians. We consider chains with open and periodic boundary conditions and find 17 unique dynamical Lie algebras. In addition to the closed and open spin chains, we consider systems with a fully connected topology, which may be relevant for quantum machine learning approaches.
Score: 44.41126861546141
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Much is understood about 1-dimensional spin chains in terms of entanglement properties, physical phases, and integrability. However, the Lie algebraic properties of the Hamiltonians describing these systems remain largely unexplored. In this work, we provide a classification of all Lie algebras generated by translation-invariant 2-local spin chain Hamiltonians, or so-called dynamical Lie algebras. We consider chains with open and periodic boundary conditions and find 17 unique dynamical Lie algebras. Our classification covers some well-known models such as the transverse-field Ising model and the Heisenberg chain, and we also find more exotic classes of Hamiltonians that cannot be identified easily. In addition to the closed and open spin chains, we consider systems with a fully connected topology, which may be relevant for quantum machine learning approaches. We discuss the practical implications of our work in the context of quantum control, variational quantum computing, and the spin chain literature.

Related papers

Quantum cellular automata and categorical duality of spin chains [0.0]
We study categorical dualities, which are bounded-spread isomorphisms between algebras of symmetry-respecting local operators on a spin chain. A fundamental question about dualities is whether they can be extended to quantum cellular automata. We present a solution to the extension problem using the machinery of Doplicher-Haag-Roberts bimodules.
arXiv Detail & Related papers (2024-10-11T15:00:50Z)
Classifying Entanglement by Algebraic Geometry [0.0]
dissertation covers characterization of multipartite entanglement using algebraic-geometric tools. We establish an algorithm to classify multipartite entanglement by $k$secibilityant varieties of the variety $ell$-multilinear ranks. We present a fine-structure classification of multiqubit and tripartite entanglement based on this algorithm.
arXiv Detail & Related papers (2024-08-22T10:03:22Z)
Machine learning detects terminal singularities [49.1574468325115]
Q-Fano varieties are positively curved shapes which have Q-factorial terminal singularities. Despite their importance, the classification of Q-Fano varieties remains unknown. In this paper we demonstrate that machine learning can be used to understand this classification.
arXiv Detail & Related papers (2023-10-31T13:51:24Z)
Dynamical characterization of topological phases beyond the minimal models [2.5109178995735597]
We consider the characterization of topological phases with Hamiltonians that are beyond the minimal model. We find that the terms which anti-commute with others can hold common band-inversion surfaces, which controls the topology of all the bands.
arXiv Detail & Related papers (2023-02-07T07:06:20Z)
Solving quantum dynamics with a Lie algebra decoupling method [0.0]
We present a pedagogical introduction to solving the dynamics of quantum systems by the use of a Lie algebra decoupling theorem. As background, we include an overview of Lie groups and Lie algebras aimed at a general physicist audience. We prove the theorem and apply it to three well-known examples of linear and quadratic Hamiltonian that frequently appear in quantum optics and related fields.
arXiv Detail & Related papers (2022-10-21T11:44:24Z)
Self-adjoint extension schemes and modern applications to quantum Hamiltonians [55.2480439325792]
monograph contains revised and enlarged materials from previous lecture notes of undergraduate and graduate courses and seminars delivered by both authors over the last years on a subject that is central both in abstract operator theory and in applications to quantum mechanics. A number of models are discussed, which are receiving today new or renewed interest in mathematical physics, in particular from the point of view of realising certain operators of interests self-adjointly.
arXiv Detail & Related papers (2022-01-25T09:45:16Z)
Understanding the propagation of excitations in quantum spin chains with different kind of interactions [68.8204255655161]
It is shown that the inhomogeneous chains are able to transfer excitations with near perfect fidelity. It is shown that both designed chains have in common a partially ordered spectrum and well localized eigenvectors.
arXiv Detail & Related papers (2021-12-31T15:09:48Z)
Hilbert Space Fragmentation and Commutant Algebras [0.0]
We study the phenomenon of Hilbert space fragmentation in isolated Hamiltonian and Floquet quantum systems. We use the language of commutant algebras, the algebra of all operators that commute with each term of the Hamiltonian or each gate of the circuit.
arXiv Detail & Related papers (2021-08-23T18:00:01Z)
Unraveling the topology of dissipative quantum systems [58.720142291102135]
We discuss topology in dissipative quantum systems from the perspective of quantum trajectories. We show for a broad family of translation-invariant collapse models that the set of dark state-inducing Hamiltonians imposes a nontrivial topological structure on the space of Hamiltonians.
arXiv Detail & Related papers (2020-07-12T11:26:02Z)
Quantum Geometric Confinement and Dynamical Transmission in Grushin Cylinder [68.8204255655161]
We classify the self-adjoint realisations of the Laplace-Beltrami operator minimally defined on an infinite cylinder. We retrieve those distinguished extensions previously identified in the recent literature, namely the most confining and the most transmitting.
arXiv Detail & Related papers (2020-03-16T11:37:23Z)

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