The Single Histogram Method and the Quantum Harmonic Oscillator: Accuracy Limits
摘要
In a recent work, M. Troyer, F. Alet and S. Wessel \cite{brazilean} proposed a way to extend histogram methods to quantum systems in the World Line Quantum Monte Carlo (WLQMC) formulation. The strategy, also proposed in \cite{josedaniel}, allows to compute quantum averages on a narrow temperature range from a single Monte Carlo run at fixed temperature. This is achieved by fixing , the number of temporal divisions in the Trotter-Suzuki expansion of WLQMC, and by changing . In this work we apply this strategy to construct a single histogram Monte Carlo method for a canonical ensemble of one-dimensional quantum harmonic oscillators and we explore its accuracy limits. We obtain that fixing imposses a limit of minimal temperature to the properly performance of the method, which is in our example. This limit is a consequence of the fact that the Trotter-Suzuki expansion fails for large values, and, therefore, should be taken into account in all applications of this histogram method for quantum systems.
引用
@article{arxiv.cond-mat/0410710,
title = {The Single Histogram Method and the Quantum Harmonic Oscillator: Accuracy Limits},
author = {W. F. Oquendo and J. D. Munoz},
journal= {arXiv preprint arXiv:cond-mat/0410710},
year = {2007}
}
备注
5 pages, 4 figures, 1 table,(gzipped tar file)