Related papers: Integrability and scattering of the boson field theory on a lattice

Integrability and scattering of the boson field theory on a lattice

URL: http://arxiv.org/abs/2009.03338v1
Date: Mon, 7 Sep 2020 18:00:08 GMT
Title: Integrability and scattering of the boson field theory on a lattice
Authors: Manuel Campos, German Sierra, Esperanza Lopez
Abstract summary: We use the methods of exactly solvable models, that are currently applied to spin systems, to solve a free boson on a 2D lattice. We diagonalize the row-to-row transfer matrix, derive the conserved quantities, and implement the quantum inverse scattering method. These results place the free boson model in 2D in the same position as the rest of the models that are exactly solvable a la Yang-Baxter, offering possible applications in quantum computation.
Score: 0.5801044612920815
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: A free boson on a lattice is the simplest field theory one can think of. Its partition function can be easily computed in momentum space. However, this straightforward solution hides its integrability properties. Here, we use the methods of exactly solvable models, that are currently applied to spin systems, to a massless and massive free boson on a 2D lattice. The Boltzmann weights of the model are shown to satisfy the Yang-Baxter equation with a uniformization given by trigonometric functions in the massless case, and Jacobi elliptic functions in the massive case. We diagonalize the row-to-row transfer matrix, derive the conserved quantities, and implement the quantum inverse scattering method. Finally, we construct two factorized scattering $S$ matrix models for continuous degrees of freedom using trigonometric and elliptic functions. These results place the free boson model in 2D in the same position as the rest of the models that are exactly solvable \`a la Yang-Baxter, offering possible applications in quantum computation.

Related papers

Exact dynamics of quantum dissipative $XX$ models: Wannier-Stark localization in the fragmented operator space [49.1574468325115]
We find an exceptional point at a critical dissipation strength that separates oscillating and non-oscillating decay. We also describe a different type of dissipation that leads to a single decay mode in the whole operator subspace.
arXiv Detail & Related papers (2024-05-27T16:11:39Z)
Quantum tomography of helicity states for general scattering processes [55.2480439325792]
Quantum tomography has become an indispensable tool in order to compute the density matrix $rho$ of quantum systems in Physics. We present the theoretical framework for reconstructing the helicity quantum initial state of a general scattering process.
arXiv Detail & Related papers (2023-10-16T21:23:42Z)
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)
Third quantization for bosons: symplectic diagonalization, non-Hermitian Hamiltonian, and symmetries [0.0]
We show that the non-Hermitian effective Hamiltonian of the system, next to incorporating the dynamics of the system, is a tool to analyze its symmetries. As an example, we use the effective Hamiltonian to formulate a $mathcalPT$-symmetry' of an open system.
arXiv Detail & Related papers (2023-04-05T11:05:17Z)
Third quantization of open quantum systems: new dissipative symmetries and connections to phase-space and Keldysh field theory formulations [77.34726150561087]
We reformulate the technique of third quantization in a way that explicitly connects all three methods. We first show that our formulation reveals a fundamental dissipative symmetry present in all quadratic bosonic or fermionic Lindbladians. For bosons, we then show that the Wigner function and the characteristic function can be thought of as ''wavefunctions'' of the density matrix.
arXiv Detail & Related papers (2023-02-27T18:56:40Z)
Bootstrapping the gap in quantum spin systems [0.7106986689736826]
We use the equations of motion to develop an analogue of the conformal block expansion for matrix elements. The method can be applied to any quantum mechanical system with a local Hamiltonian.
arXiv Detail & Related papers (2022-11-07T19:07:29Z)
Beyond islands: A free probabilistic approach [0.0]
We show that the replica gravitational path is integrally matching the free multiplicative convolution between the spectra of the gravitational sector and the matter sector. The convolution formula computes the radiation entropy accurately even in cases when the island formula fails to apply.
arXiv Detail & Related papers (2022-09-21T18:00:00Z)
The Dynamics of the Hubbard Model through Stochastic Calculus and Girsanov Transformation [0.0]
We consider the time evolution of density elements in the Bose-Hubbard model. The exact quantum dynamics is given by an ODE system which turns out to be the time dependent discrete Gross Pitaevskii equation. The paper has been written with the goal to come up with an efficient calculation scheme for quantum many body systems.
arXiv Detail & Related papers (2022-05-04T11:43:43Z)
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)
Bernstein-Greene-Kruskal approach for the quantum Vlasov equation [91.3755431537592]
The one-dimensional stationary quantum Vlasov equation is analyzed using the energy as one of the dynamical variables. In the semiclassical case where quantum tunneling effects are small, an infinite series solution is developed.
arXiv Detail & Related papers (2021-02-18T20:55:04Z)
Characterization of solvable spin models via graph invariants [0.38073142980732994]
We provide a complete characterization of models that can be mapped to free fermions hopping on a graph. A corollary of our result is a complete set of constant-sized commutation structures that constitute the obstructions to a free-fermion solution. We show how several exact free-fermion solutions from the literature fit into our formalism and give an explicit example of a new model previously unknown to be solvable by free fermions.
arXiv Detail & Related papers (2020-03-11T18:06:14Z)

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