Related papers: A correspondence between the Rabi model and an Ising model with long-range interactions

A correspondence between the Rabi model and an Ising model with long-range interactions

URL: http://arxiv.org/abs/2504.19057v1
Date: Sun, 27 Apr 2025 00:10:35 GMT
Title: A correspondence between the Rabi model and an Ising model with long-range interactions
Authors: Bruno Scheihing-Hitschfeld, Néstor Sepúlveda,
Abstract summary: We show that transition amplitudes between coherent states in the Rabi model can be understood in terms of a certain Ising model.<n>A perturbative expansion in the energy splitting of the two-level subsystem in the Rabi model is equivalent to an expansion in the number of spin domains in the Ising model.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: By means of Trotter's formula, we show that transition amplitudes between coherent states in the Rabi model can be understood in terms of a certain Ising model featuring long-range interactions (i.e., beyond nearest neighbors) in its thermodynamic limit. Specifically, we relate the transition amplitudes in the Rabi Model to a sum over $n$ binary variables of the form of a partition function of an Ising model with $n$ spin sites, where $n$ is also the number of steps in Trotter's formula. From this, we show that a perturbative expansion in the energy splitting of the two-level subsystem in the Rabi model is equivalent to an expansion in the number of spin domains in the Ising model. We conclude by discussing how calculations in one model give nontrivial information about the other model, and vice-versa, as well as applications and generalizations this correspondence may find.

Related papers

Many neighbors little entanglement: A curious scaling in the variable-range extended Ising model [0.0]
We study the two-point correlation functions and the bipartite entanglement in the ground state of the exactly-solvable variable-range extended Ising model of qubits.
arXiv Detail & Related papers (2025-04-02T15:54:52Z)
Bayesian Circular Regression with von Mises Quasi-Processes [57.88921637944379]
In this work we explore a family of expressive and interpretable distributions over circle-valued random functions. For posterior inference, we introduce a new Stratonovich-like augmentation that lends itself to fast Gibbs sampling. We present experiments applying this model to the prediction of wind directions and the percentage of the running gait cycle as a function of joint angles.
arXiv Detail & Related papers (2024-06-19T01:57:21Z)
Mode Combinability: Exploring Convex Combinations of Permutation Aligned Models [0.559239450391449]
We investigate convex combinations of two permutation-aligned neural network parameter vectors $Theta_A$ and $Theta_B$ of size $d$. We show that broad regions of the hypercube form surfaces of low loss values, indicating that the notion of linear mode connectivity extends to a more general phenomenon.
arXiv Detail & Related papers (2023-08-22T15:39:29Z)
Systematic compactification of the two-channel Kondo model. III. Extended field-theoretic renormalization group analysis [44.99833362998488]
We calculate the detailed flow for the (multi) two-channel Kondo model and its compactified versions. We gain insights into the contradistinction between the consistent vs. conventional bosonization-debosonization formalisms. In particular, we make use of renormalization-flow arguments to further justify the consistent refermionization of the parallel Kondo interaction.
arXiv Detail & Related papers (2023-08-07T14:07:21Z)
Systematic compactification of the two-channel Kondo model. I. Consistent bosonization-debosonization approach and exact comparisons [44.99833362998488]
We revisit the compactification procedure of the two-channel Kondo model. We uncover some hidden approximations that could limit its range of validity.
arXiv Detail & Related papers (2023-08-07T13:19:37Z)
Geometric Neural Diffusion Processes [55.891428654434634]
We extend the framework of diffusion models to incorporate a series of geometric priors in infinite-dimension modelling. We show that with these conditions, the generative functional model admits the same symmetry.
arXiv Detail & Related papers (2023-07-11T16:51:38Z)
Exact solution for quantum strong long-range models via a generalized Hubbard-Stratonovich transformation [0.0]
We present an exact analytical solution for quantum strong long-range models in the canonical ensemble. We utilize the equivalence between generalized Dicke models and interacting quantum models as a generalization of the Hubbard-Stratonovich transformation.
arXiv Detail & Related papers (2023-05-17T18:00:02Z)
Modeling the space-time correlation of pulsed twin beams [68.8204255655161]
Entangled twin-beams generated by parametric down-conversion are among the favorite sources for imaging-oriented applications. We propose a semi-analytic model which aims to bridge the gap between time-consuming numerical simulations and the unrealistic plane-wave pump theory.
arXiv Detail & Related papers (2023-01-18T11:29:49Z)
Super-model ecosystem: A domain-adaptation perspective [101.76769818069072]
This paper attempts to establish the theoretical foundation for the emerging super-model paradigm via domain adaptation. Super-model paradigms help reduce computational and data cost and carbon emission, which is critical to AI industry.
arXiv Detail & Related papers (2022-08-30T09:09:43Z)
Quantum chaos and thermalization in the two-mode Dicke model [77.34726150561087]
We discuss the onset of quantum chaos and thermalization in the two-mode Dicke model. The two-mode Dicke model exhibits normal to superradiant quantum phase transition. We show that the temporal fluctuations of the expectation value of the collective spin observable around its average are small and decrease with the effective system size.
arXiv Detail & Related papers (2022-07-08T11:16:29Z)
Mimicking quantum correlation of a long-range Hamiltonian by finite-range interactions [0.0]
The pattern obtained from the entanglement between any two arbitrary sites of the long-range model can be mimicked by the model having a finite range of interactions. We show that the monogamy score of entanglement is in good agreement with the behavior of pairwise entanglement.
arXiv Detail & Related papers (2022-06-18T12:45:13Z)
Diffusion models as plug-and-play priors [98.16404662526101]
We consider the problem of inferring high-dimensional data $mathbfx$ in a model that consists of a prior $p(mathbfx)$ and an auxiliary constraint $c(mathbfx,mathbfy)$. The structure of diffusion models allows us to perform approximate inference by iterating differentiation through the fixed denoising network enriched with different amounts of noise.
arXiv Detail & Related papers (2022-06-17T21:11:36Z)
Emergent fractal phase in energy stratified random models [0.0]
We study the effects of partial correlations in kinetic hopping terms of long-range random matrix models on their localization properties. We show that any deviation from the completely correlated case leads to the emergent non-ergodic delocalization in the system.
arXiv Detail & Related papers (2021-06-07T18:00:01Z)

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