ML Extension of Spin Correlation in Space and Time
POSTER
Abstract
Obtaining the spectrum and dynamical responses of quantum materials can
be fundamental to microscopic understanding of their physical properties. For
quantum magnetism, the dynamical responses of certain simple systems can be
calculated analytically; however, this cannot be acquired for numerous complex
many-body systems. While numerical methods, such as exact diagonalization
and density matrix renormalization group (DMRG), exist for such systems, the time evolution algorithms often propagate errors that depreciate the accuracy of the
spectra at long time and space intervals. In addition, the computational cost of
these numerical methods drastically increases with the size of the system, preventing us from studying systems approaching the thermodynamic limit. In this
project, we employ machine learning algorithms to extend the dynamical spin
correlations in both temporal and spatial dimensions with improved resolution.
We train the models using Time-dependent Density Matrix Renormalization
Group (tDMRG) simulated for XXZ model on a finite-size one-dimensional lattice. We benchmark our machine learning obtained spin dynamical correlation
results against those obtained from analytical calculations of solvable models
such as the XXZ model. After assessing the accuracy of our machine learning
model, we hope to analyze other strongly interacting many-body systems that
do not have an analytical solution using this method. This method aims to
enhance the understanding of the dynamical spin correlation with much higher
resolution, and for systems approaching the thermodynamic limit.
be fundamental to microscopic understanding of their physical properties. For
quantum magnetism, the dynamical responses of certain simple systems can be
calculated analytically; however, this cannot be acquired for numerous complex
many-body systems. While numerical methods, such as exact diagonalization
and density matrix renormalization group (DMRG), exist for such systems, the time evolution algorithms often propagate errors that depreciate the accuracy of the
spectra at long time and space intervals. In addition, the computational cost of
these numerical methods drastically increases with the size of the system, preventing us from studying systems approaching the thermodynamic limit. In this
project, we employ machine learning algorithms to extend the dynamical spin
correlations in both temporal and spatial dimensions with improved resolution.
We train the models using Time-dependent Density Matrix Renormalization
Group (tDMRG) simulated for XXZ model on a finite-size one-dimensional lattice. We benchmark our machine learning obtained spin dynamical correlation
results against those obtained from analytical calculations of solvable models
such as the XXZ model. After assessing the accuracy of our machine learning
model, we hope to analyze other strongly interacting many-body systems that
do not have an analytical solution using this method. This method aims to
enhance the understanding of the dynamical spin correlation with much higher
resolution, and for systems approaching the thermodynamic limit.
Presenters
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Povilas H Pugzlys
University of Florida
Authors
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Povilas H Pugzlys
University of Florida
-
Chunjing Jia
University of Florida
-
Xuzhe Ying
Hong Kong University of Science and Technology
-
Sam Dillon
University of Florida
-
Nhat Huy Mai Tran
University of Florida