Related papers: Bethe ansatz solutions and hidden $sl(2)$ algebraic structure for a class of quasi-exactly solvable systems

Bethe ansatz solutions and hidden $sl(2)$ algebraic structure for a class of quasi-exactly solvable systems

URL: http://arxiv.org/abs/2309.11731v1
Date: Thu, 21 Sep 2023 02:04:44 GMT
Title: Bethe ansatz solutions and hidden $sl(2)$ algebraic structure for a class of quasi-exactly solvable systems
Authors: Siyu Li, Ian Marquette and Yao-Zhong Zhang
Abstract summary: We revisit a class of models for which the odd solutions were largely missed previously in the literature. We present a systematic and unified treatment for the odd and even sectors of these models. We also make progress in the analysis of solutions to the Bethe ansatz equations in the spaces of model parameters.
Score: 0.638421840998693
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The construction of analytic solutions for quasi-exactly solvable systems is an interesting problem. We revisit a class of models for which the odd solutions were largely missed previously in the literature: the anharmonic oscillator, the singular anharmonic oscillator, the generalized quantum isotonic oscillator, non-polynomially deformed oscillator, and the Schr\"odinger system from the kink stability analysis of $\phi^6$-type field theory. We present a systematic and unified treatment for the odd and even sectors of these models. We find generic closed-form expressions for constraints to the allowed model parameters for quasi-exact solvability, the corresponding energies and wavefunctions. We also make progress in the analysis of solutions to the Bethe ansatz equations in the spaces of model parameters and provide insight into the curves/surfaces of the allowed parameters in the parameter spaces. Most previous analyses in this aspect were on a case-by-case basis and restricted to the first excited states. We present analysis of the solutions (i.e. roots) of the Bethe ansatz equations for higher excited states (up to levels $n$=30 or 50). The shapes of the root distributions change drastically across different regions of model parameters, illustrating phenomena analogous to phase transition in context of integrable models. Furthermore, we also obtain the $sl(2)$ algebraization for the class of models in their respective even and odd sectors in a unified way.

Related papers

Prepotential Approach: a unified approach to exactly, quasi-exactly, and rationally extended solvable quantal systems [0.0]
We give a brief overview of a simple and unified way, called the prepotential approach. It treats both exact and quasi-exact solvabilities of the one-dimensional Schr"odinger equation. We illustrate the approach by several paradigmatic examples of Hermitian and non-Hermitian Hamiltonians with real energies.
arXiv Detail & Related papers (2023-10-22T11:40:00Z)
Solution to a class of multistate Landau-Zener model beyond integrability conditions [5.390814126989423]
We study a class of multistate Landau-Zener model which cannot be solved by integrability conditions or other standard techniques. We find nearly exact analytical expressions of all its transition probabilities for specific parameter choices. We show that this model can describe a Su-Schrieffer-Heeger chain with couplings changing linearly in time.
arXiv Detail & Related papers (2023-06-15T10:29:50Z)
Exact solution of the Bose Hubbard model with unidirectional hopping [4.430341888774933]
A one-dimensional Bose Hubbard model with unidirectional hopping is shown to be exactly solvable. We prove the integrability of the model and derive the Bethe ansatz equations. The exact eigenvalue spectrum can be obtained by solving these equations.
arXiv Detail & Related papers (2023-04-30T09:50:51Z)
Correspondence between open bosonic systems and stochastic differential equations [77.34726150561087]
We show that there can also be an exact correspondence at finite $n$ when the bosonic system is generalized to include interactions with the environment. A particular system with the form of a discrete nonlinear Schr"odinger equation is analyzed in more detail.
arXiv Detail & Related papers (2023-02-03T19:17:37Z)
Exact solution of the position-dependent mass Schr\"odinger equation with the completely positive oscillator-shaped quantum well potential [0.0]
Exact solutions of the position-dependent mass Schr"odinger equation corresponding to the proposed quantum well potentials are presented. The spectrum exhibits positive equidistant behavior for the model confined only with one infinitely high wall and non-equidistant behavior for the model confined with the infinitely high wall from both sides.
arXiv Detail & Related papers (2022-12-26T09:40:44Z)
Physics-Informed Gaussian Process Regression Generalizes Linear PDE Solvers [32.57938108395521]
A class of mechanistic models, Linear partial differential equations, are used to describe physical processes such as heat transfer, electromagnetism, and wave propagation. specialized numerical methods based on discretization are used to solve PDEs. By ignoring parameter and measurement uncertainty, classical PDE solvers may fail to produce consistent estimates of their inherent approximation error.
arXiv Detail & Related papers (2022-12-23T17:02:59Z)
Global Convergence of Over-parameterized Deep Equilibrium Models [52.65330015267245]
A deep equilibrium model (DEQ) is implicitly defined through an equilibrium point of an infinite-depth weight-tied model with an input-injection. Instead of infinite computations, it solves an equilibrium point directly with root-finding and computes gradients with implicit differentiation. We propose a novel probabilistic framework to overcome the technical difficulty in the non-asymptotic analysis of infinite-depth weight-tied models.
arXiv Detail & Related papers (2022-05-27T08:00:13Z)
Fermionic approach to variational quantum simulation of Kitaev spin models [50.92854230325576]
Kitaev spin models are well known for being exactly solvable in a certain parameter regime via a mapping to free fermions. We use classical simulations to explore a novel variational ansatz that takes advantage of this fermionic representation. We also comment on the implications of our results for simulating non-Abelian anyons on quantum computers.
arXiv Detail & Related papers (2022-04-11T18:00:01Z)
Message Passing Neural PDE Solvers [60.77761603258397]
We build a neural message passing solver, replacing allally designed components in the graph with backprop-optimized neural function approximators. We show that neural message passing solvers representationally contain some classical methods, such as finite differences, finite volumes, and WENO schemes. We validate our method on various fluid-like flow problems, demonstrating fast, stable, and accurate performance across different domain topologies, equation parameters, discretizations, etc., in 1D and 2D.
arXiv Detail & Related papers (2022-02-07T17:47:46Z)
A Variational Inference Approach to Inverse Problems with Gamma Hyperpriors [60.489902135153415]
This paper introduces a variational iterative alternating scheme for hierarchical inverse problems with gamma hyperpriors. The proposed variational inference approach yields accurate reconstruction, provides meaningful uncertainty quantification, and is easy to implement.
arXiv Detail & Related papers (2021-11-26T06:33:29Z)
Hessian Eigenspectra of More Realistic Nonlinear Models [73.31363313577941]
We make a emphprecise characterization of the Hessian eigenspectra for a broad family of nonlinear models. Our analysis takes a step forward to identify the origin of many striking features observed in more complex machine learning models.
arXiv Detail & Related papers (2021-03-02T06:59:52Z)

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