Related papers: Stationary State Degeneracy of Open Quantum Systems with Non-Abelian Symmetries

Stationary State Degeneracy of Open Quantum Systems with Non-Abelian Symmetries

URL: http://arxiv.org/abs/1912.12185v1
Date: Fri, 27 Dec 2019 15:50:33 GMT
Title: Stationary State Degeneracy of Open Quantum Systems with Non-Abelian Symmetries
Authors: Zhao Zhang, Joseph Tindall, Jordi Mur-Petit, Dieter Jaksch, Berislav Bu\v{c}a
Abstract summary: We study the null space degeneracy of open quantum systems with multiple non-Abelian, strong symmetries. We apply these results within the context of open quantum many-body systems. We find that the derived bound, which scales at least cubically in the system size the $SU(2)$ symmetric cases, is often saturated.
Score: 3.423206565777368
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We study the null space degeneracy of open quantum systems with multiple non-Abelian, strong symmetries. By decomposing the Hilbert space representation of these symmetries into an irreducible representation involving the direct sum of multiple, commuting, invariant subspaces we derive a tight lower bound for the stationary state degeneracy. We apply these results within the context of open quantum many-body systems, presenting three illustrative examples: a fully-connected quantum network, the XXX Heisenberg model and the Hubbard model. We find that the derived bound, which scales at least cubically in the system size the $SU(2)$ symmetric cases, is often saturated. Moreover, our work provides a theory for the systematic block-decomposition of a Liouvillian with non-Abelian symmetries, reducing the computational difficulty involved in diagonalising these objects and exposing a natural, physical structure to the steady states - which we observe in our examples.

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