English

Uhlmann fidelities from tensor networks

Quantum Physics 2019-02-14 v2 Strongly Correlated Electrons

Abstract

Given two states ψ|\psi\rangle and ϕ|\phi\rangle of a quantum many-body system, one may use the overlap or fidelity ψϕ|\langle\psi|\phi\rangle| to quantify how similar they are. To further resolve the similarity of ψ|\psi\rangle and ϕ|\phi\rangle in space, one can consider their reduced density matrices ρ\rho and σ\sigma on various regions of the system, and compute the Uhlmann fidelity F(ρ,σ)=TrρσρF(\rho, \sigma) = \operatorname{Tr} \sqrt{\sqrt{\rho} \sigma \sqrt{\rho}}. In this paper, we show how computing such subsystem fidelities can be done efficiently in many cases when the two states are represented as tensor networks. Formulated using Uhlmann's theorem, such subsystem fidelities appear as natural quantities to extract for certain subsystems for Matrix Product States and Tree Tensor Networks, and evaluating them is algorithmically simple and computationally affordable. We demonstrate the usefulness of evaluating subsystem fidelities with three example applications: studying local quenches, comparing critical and non-critical states, and quantifying convergence in tensor network simulations.

Keywords

Cite

@article{arxiv.1807.01640,
  title  = {Uhlmann fidelities from tensor networks},
  author = {Markus Hauru and Guifre Vidal},
  journal= {arXiv preprint arXiv:1807.01640},
  year   = {2019}
}

Comments

9+3 pages, many figures; v2 matches the journal version, with some new content

R2 v1 2026-06-23T02:50:49.312Z