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Correlation Length versus Gap in Frustration-Free Systems

Quantum Physics 2016-03-09 v3 Statistical Mechanics Strongly Correlated Electrons Mathematical Physics math.MP

Abstract

Hastings established exponential decay of correlations for ground states of gapped quantum many-body systems. A ground state of a (geometrically) local Hamiltonian with spectral gap ϵ\epsilon has correlation length ξ\xi upper bounded as ξ=O(1/ϵ)\xi=O(1/\epsilon). In general this bound cannot be improved. Here we study the scaling of the correlation length as a function of the spectral gap in frustration-free local Hamiltonians, and we prove a tight bound ξ=O(1/ϵ)\xi=O(1/\sqrt\epsilon) in this setting. This highlights a fundamental difference between frustration-free and frustrated systems near criticality. The result is obtained using an improved version of the combinatorial proof of correlation decay due to Aharonov, Arad, Vazirani, and Landau.

Keywords

Cite

@article{arxiv.1509.06360,
  title  = {Correlation Length versus Gap in Frustration-Free Systems},
  author = {David Gosset and Yichen Huang},
  journal= {arXiv preprint arXiv:1509.06360},
  year   = {2016}
}

Comments

v3: published version

R2 v1 2026-06-22T11:02:00.455Z