Recent advances in the calculation of dynamical correlation functions
- URL: http://arxiv.org/abs/2005.14222v1
- Date: Thu, 28 May 2020 18:33:22 GMT
- Title: Recent advances in the calculation of dynamical correlation functions
- Authors: J. Florencio and O. F. de Alcantara Bonfim
- Abstract summary: Time-dependent correlation functions play a central role in both the theoretical and experimental understanding of dynamic properties.
The method of recurrence relation has, at its foundation, the solution of Heisenberg equation of motion of an operator in a many-body interacting system.
In this work, we discuss the most relevant applications of the method of recurrence relations and numerical calculations based on exact diagonalizations.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We review various theoretical methods that have been used in recent years to
calculate dynamical correlation functions of many-body systems. Time-dependent
correlation functions and their associated frequency spectral densities are the
quantities of interest, for they play a central role in both the theoretical
and experimental understanding of dynamic properties. The calculation of the
relaxation function is rather difficult in most cases of interest, except for a
few examples where exact analytic expressions are allowed. For most of systems
of interest approximation schemes must be used. The method of recurrence
relation has, at its foundation, the solution of Heisenberg equation of motion
of an operator in a many-body interacting system. Insights have been gained
from theorems that were discovered with that method. For instance, the absence
of pure exponential behavior for the relaxation functions of any Hamiltonian
system. The method of recurrence relations was used in quantum systems such as
dense electron gas, transverse Ising model, Heisenberg model, XY model,
Heisenberg model with Dzyaloshinskii-Moriya interactions, as well as classical
harmonic oscillator chains. Effects of disorder were considered in some of
those systems. In the cases where analytical solutions were not feasible,
approximation schemes were used, but are highly model-dependent. Another
important approach is the numerically exact diagonalization method. It is used
in finite-sized systems, which sometimes provides very reliable information of
the dynamics at the infinite-size limit. In this work, we discuss the most
relevant applications of the method of recurrence relations and numerical
calculations based on exact diagonalizations.
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