Related papers: On the Magnetization of the $120^\circ$ order of the Spin-1/2 Triangular Lattice Heisenberg Model: a DMRG revisit

On the Magnetization of the $120^\circ$ order of the Spin-1/2 Triangular Lattice Heisenberg Model: a DMRG revisit

URL: http://arxiv.org/abs/2310.11774v1
Date: Wed, 18 Oct 2023 08:08:06 GMT
Title: On the Magnetization of the $120^\circ$ order of the Spin-1/2 Triangular Lattice Heisenberg Model: a DMRG revisit
Authors: Jiale Huang, Xiangjian Qian, Mingpu Qin
Abstract summary: We revisit the issue about the magnetization of the $120circ$ order in the spin-1/2 triangular lattice Heisenberg model (TLHM) with Density Matrix Renormalization Group (DMRG) The accurate determination of the magnetization of this model is challenging for numerical methods and its value exhibits substantial disparities across various methods.
Score: 0.552480439325792
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We revisit the issue about the magnetization of the $120^\circ$ order in the spin-1/2 triangular lattice Heisenberg model (TLHM) with Density Matrix Renormalization Group (DMRG). The accurate determination of the magnetization of this model is challenging for numerical methods and its value exhibits substantial disparities across various methods. We perform a large-scale DMRG calculation of this model by employing bond dimension as large as $D = 24000$ and by studying the system with width as large as $L_\mathrm{y} = 12$. With careful extrapolation with truncation error and suitable finite size scaling, we give a conservative estimation of the magnetization as $M_0 = 0.208(8)$. The ground state energy per site we obtain is $E_g = -0.5503(8)$. Our results provide valuable benchmark values for the development of new methods in the future.

Related papers

The $S=\frac{1}{2}$ XY and XYZ models on the two or higher dimensional hypercubic lattice do not possess nontrivial local conserved quantities [0.0]
We prove that the model possesses no local conserved quantities except for the trivial ones, such as the Hamiltonian. This result strongly suggests that the model is non-integrable.
arXiv Detail & Related papers (2024-12-24T15:42:23Z)
Towards the "puzzle" of Chromium dimer Cr$_2$: predicting the Born-Oppenheimer rovibrational spectrum [44.99833362998488]
This paper calculates the potential energy curve for the state $X1Sigma+$ of the Cr$$$ dimer. It is found for the first time for the whole range of internuclear distances $R$.
arXiv Detail & Related papers (2024-01-06T17:00:12Z)
Ancilla quantum measurements on interacting chains: Sensitivity of entanglement dynamics to the type and concentration of detectors [46.76612530830571]
We consider a quantum many-body lattice system that is coupled to ancillary degrees of freedom (detectors'') We explore the dynamics of density and of entanglement entropy in the chain, for various values of $rho_a$ and $M$.
arXiv Detail & Related papers (2023-11-21T21:41:11Z)
Correlated volumes for extended wavefunctions on a random-regular graph [0.0]
We analyze the ergodic properties of a metallic wavefunction for the Anderson model in a disordered random-regular graph with branching number $k=2. We extract their corresponding fractal dimensions $D_q$ in the thermodynamic limit together with correlated volumes $N_q$ that control finite-size effects.
arXiv Detail & Related papers (2023-11-13T19:15:18Z)
Measurement-induced phase transition for free fermions above one dimension [46.176861415532095]
Theory of the measurement-induced entanglement phase transition for free-fermion models in $d>1$ dimensions is developed. Critical point separates a gapless phase with $elld-1 ln ell$ scaling of the second cumulant of the particle number and of the entanglement entropy.
arXiv Detail & Related papers (2023-09-21T18:11:04Z)
Theory of free fermions under random projective measurements [43.04146484262759]
We develop an analytical approach to the study of one-dimensional free fermions subject to random projective measurements of local site occupation numbers. We derive a non-linear sigma model (NLSM) as an effective field theory of the problem.
arXiv Detail & Related papers (2023-04-06T15:19:33Z)
Study of the long-range transverse field Ising model with fermionic Gaussian states [0.0]
We numerically study the one-dimensional long-range Transverse Field Ising Model (TFIM) in the antiferromagnetic regime at zero temperature. The spin-spin interaction extends to all spins in the lattice and decays as $1/ralpha$, where $r$ denotes the distance between two spins and $alpha$ is a tunable exponent.
arXiv Detail & Related papers (2023-01-07T21:23:53Z)
Density Matrix Renormalization Group with Tensor Processing Units [0.0]
Google's Processing Units (TPUs) are integrated circuits specifically built to accelerate and scale up machine learning workloads. In this work we demonstrate the use of TPUs for accelerating and scaling up the density matrix renormalization group (DMRG), a powerful numerical approach to compute the ground state of a local quantum many-body Hamiltonian.
arXiv Detail & Related papers (2022-04-12T10:40:14Z)
A New Framework for Variance-Reduced Hamiltonian Monte Carlo [88.84622104944503]
We propose a new framework of variance-reduced Hamiltonian Monte Carlo (HMC) methods for sampling from an $L$-smooth and $m$-strongly log-concave distribution. We show that the unbiased gradient estimators, including SAGA and SVRG, based HMC methods achieve highest gradient efficiency with small batch size. Experimental results on both synthetic and real-world benchmark data show that our new framework significantly outperforms the full gradient and gradient HMC approaches.
arXiv Detail & Related papers (2021-02-09T02:44:24Z)
Mapping the charge-dyon system into the position-dependent effective mass background via Pauli equation [77.34726150561087]
This work aims to reproduce a quantum system composed of a charged spin - $1/2$ fermion interacting with a dyon with an opposite electrical charge.
arXiv Detail & Related papers (2020-11-01T14:38:34Z)
Data-driven determination of the spin Hamiltonian parameters and their uncertainties: The case of the zigzag-chain compound KCu$_4$P$_3$O$_{12}$ [0.0]
Using our technique, an effective model of KCu$_4$P$_3$O$_12$ is determined from the experimentally observed magnetic susceptibility and magnetization curves. The obtained effective model is useful to predict hard-to-measure properties such as spin gap, spin configuration at the ground state, magnetic specific heat, and magnetic entropy.
arXiv Detail & Related papers (2020-06-13T00:47:14Z)

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