Related papers: Symmetry enforced entanglement in maximally mixed states

Symmetry enforced entanglement in maximally mixed states

URL: http://arxiv.org/abs/2406.08542v1
Date: Wed, 12 Jun 2024 18:00:00 GMT
Title: Symmetry enforced entanglement in maximally mixed states
Authors: Amin Moharramipour, Leonardo A. Lessa, Chong Wang, Timothy H. Hsieh, Subhayan Sahu,
Abstract summary: Entanglement in quantum many-body systems is typically fragile to interactions with the environment. We analyze the entanglement and correlations of the maximally mixed state in the invariant sector. For all Abelian symmetries, the MMIS is separable, and for all non-Abelian symmetries, the MMIS is entangled.
Score: 3.5602863178766966
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Entanglement in quantum many-body systems is typically fragile to interactions with the environment. Generic unital quantum channels, for example, have the maximally mixed state with no entanglement as their unique steady state. However, we find that for a unital quantum channel that is `strongly symmetric', i.e. it preserves a global on-site symmetry, the maximally mixed steady state in certain symmetry sectors can be highly entangled. For a given symmetry, we analyze the entanglement and correlations of the maximally mixed state in the invariant sector (MMIS), and show that the entanglement of formation and distillation are exactly computable and equal for any bipartition. For all Abelian symmetries, the MMIS is separable, and for all non-Abelian symmetries, the MMIS is entangled. Remarkably, for non-Abelian continuous symmetries described by compact semisimple Lie groups (e.g. $SU(2)$), the bipartite entanglement of formation for the MMIS scales logarithmically $\sim \log N$ with the number of qudits $N$.

Related papers

Strong-to-weak spontaneous symmetry breaking meets average symmetry-protected topological order [17.38734393793605]
We propose a new class of phases, termed the double ASPT phase, which emerges from a nontrivial extension of these two orders. This new phase is absent from prior studies and cannot exist in conventional closed systems.
arXiv Detail & Related papers (2024-10-17T16:36:53Z)
Level statistics detect generalized symmetries [0.0]
Level statistics are a useful probe for detecting symmetries and distinguishing integrable and non-integrable systems. I consider non-invertible symmetries through the example of Kramers-Wannier duality at an Ising critical point. I discovered via level statistics a $q$-deformed generalization of inversion that is interesting in its own right and that may protect $q$-deformed SPT phases.
arXiv Detail & Related papers (2024-06-06T11:54:28Z)
Non-invertible SPT, gauging and symmetry fractionalization [2.541410020898643]
We construct the lattice models for the phases of all the symmetries in the Rep($Q_8$) duality web. We show that these interplay can be explained using the symmetry fractionalization in the 2+1d bulk SET.
arXiv Detail & Related papers (2024-05-24T21:35:55Z)
Multipartite entanglement in the diagonal symmetric subspace [41.94295877935867]
For diagonal symmetric states, we show that there is no bound entanglement for $d = 3,4 $ and $N = 3$. We present a constructive algorithm to map multipartite diagonal symmetric states of qudits onto bipartite symmetric states of larger local dimension.
arXiv Detail & Related papers (2024-03-08T12:06:16Z)
Symmetry-restricted quantum circuits are still well-behaved [45.89137831674385]
We show that quantum circuits restricted by a symmetry inherit the properties of the whole special unitary group $SU(2n)$. It extends prior work on symmetric states to the operators and shows that the operator space follows the same structure as the state space.
arXiv Detail & Related papers (2024-02-26T06:23:39Z)
Phases of Matrix Product States with Symmetric Quantum Circuits and Symmetric Measurements with Feedforward [0.2010986461330016]
Two matrix product states (MPS) are in the same phase in the presence of symmetries. We consider how symmetry-preserving measurements with feedforward alter the phase classification of MPS in the presence of global on-site symmetries.
arXiv Detail & Related papers (2023-12-21T13:38:46Z)
Efficient quantum algorithms for testing symmetries of open quantum systems [17.55887357254701]
In quantum mechanics, it is possible to eliminate degrees of freedom by leveraging symmetry to identify the possible physical transitions. Previous works have focused on devising quantum algorithms to ascertain symmetries by means of fidelity-based symmetry measures. We develop alternative symmetry testing quantum algorithms that are efficiently implementable on quantum computers.
arXiv Detail & Related papers (2023-09-05T18:05:26Z)
Non-equilibrium entanglement asymmetry for discrete groups: the example of the XY spin chain [0.0]
The entanglement asymmetry is a novel quantity that, using entanglement methods, measures how much a symmetry is broken in a part of an extended quantum system. We consider the XY spin chain, in which the ground state spontaneously breaks the $mathbbZ$ spin parity symmetry in the ferromagnetic phase. We thoroughly investigate the non-equilibrium dynamics of this symmetry after a global quantum quench, generalising known results for the standard order parameter.
arXiv Detail & Related papers (2023-07-13T17:01:38Z)
Theory of Quantum Circuits with Abelian Symmetries [0.0]
It was found that generic unitaries respecting a global symmetry cannot be realized, even approximately, using gates that respect the same symmetry. This observation raises important open questions: What unitary transformations can be realized with k-local gates that respect a global symmetry? In this work, we address these questions for the case of Abelian (commutative) symmetries and develop constructive methods for circuits with such symmetries.
arXiv Detail & Related papers (2023-02-24T05:47:13Z)
Noise-resilient Edge Modes on a Chain of Superconducting Qubits [103.93329374521808]
Inherent symmetry of a quantum system may protect its otherwise fragile states. We implement the one-dimensional kicked Ising model which exhibits non-local Majorana edge modes (MEMs) with $mathbbZ$ parity symmetry. MEMs are found to be resilient against certain symmetry-breaking noise owing to a prethermalization mechanism.
arXiv Detail & Related papers (2022-04-24T22:34:15Z)
SYK meets non-Hermiticity II: measurement-induced phase transition [16.533265279392772]
We analytically derive the effective action in the large-$N$ limit and show that an entanglement transition is caused by the symmetry breaking in the enlarged replica space. We also verify the large-$N$ critical exponents by numerically solving the Schwinger-Dyson equation.
arXiv Detail & Related papers (2021-04-16T17:55:08Z)

This list is automatically generated from the titles and abstracts of the papers in this site.