English

Clustering theorem in 1D long-range interacting systems at arbitrary temperatures

Quantum Physics 2025-02-24 v2 Statistical Mechanics Mathematical Physics math.MP

Abstract

This paper delves into a fundamental aspect of quantum statistical mechanics -- the absence of thermal phase transitions in one-dimensional (1D) systems. Originating from Ising's analysis of the 1D spin chain, this concept has been pivotal in understanding 1D quantum phases, especially those with finite-range interactions as extended by Araki. In this work, we focus on quantum long-range interactions and successfully derive a clustering theorem applicable to a wide range of interaction decays at arbitrary temperatures. This theorem applies to any interaction forms that decay faster than r2r^{-2} and does not rely on translation invariance or infinite system size assumptions. Also, we rigorously established that the temperature dependence of the correlation length is given by econst.βe^{{\rm const.} \beta}, which is the same as the classical cases. Our findings indicate the absence of phase transitions in 1D systems with super-polynomially decaying interactions, thereby expanding upon previous theoretical research. To overcome significant technical challenges originating from the divergence of the imaginary-time Lieb-Robinson bound, we utilize the quantum belief propagation to refine the cluster expansion method. This approach allowed us to address divergence issues effectively and contributed to a deeper understanding of low-temperature behaviors in 1D quantum systems.

Keywords

Cite

@article{arxiv.2403.11431,
  title  = {Clustering theorem in 1D long-range interacting systems at arbitrary temperatures},
  author = {Yusuke Kimura and Tomotaka Kuwahara},
  journal= {arXiv preprint arXiv:2403.11431},
  year   = {2025}
}

Comments

35 pages, 5 figures,

R2 v1 2026-06-28T15:23:38.235Z