Measurement catastrophe and ballistic spread of charge density with vanishing current

Zadnik, Lenart; Bocini, Saverio; Bidzhiev, Kemal; Fagotti, Maurizio

doi:10.48550/arxiv.2111.06325

Cited by 2 publications

(2 citation statements)

References 47 publications

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“…-Macroscopic effects triggered by a local perturbation had been observed before in the case of symmetry-breaking perturbations of ground states [138,139], and excited states in a jammed sector [62,140]. Whether they are just a different facet of the same phenomenon as described herein, and characterized by the logarithmic scaling of the excess entropy, remains unclear.…”

Section: Discussionmentioning

confidence: 66%

Nonequilibrium symmetry-protected topological order: Emergence of semilocal Gibbs ensembles

Fagotti,

Marić,

Zadnik

2024

Phys. Rev. B

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We consider nonequilibrium time evolution in quantum spin chains after a global quench. Usually a nonequilibium quantum many-body system locally relaxes to a (generalised) Gibbs ensemble built from conserved operators with quasilocal densities. Here we exhibit explicit examples of local Hamiltonians that possess conservation laws with densities that are not quasilocal but act as such in the symmetry-restricted space where time evolution occurs. Because of them, the stationary state emerging at infinite time can exhibit exceptional features. We focus on a specific example with a spin-flip symmetry, which is the commonest global symmetry encountered in spin-1/2 chains. Among the exceptional properties, we find that, at late times, the excess of entropy of a spin block triggered by a local perturbation in the initial state grows logarithmically with the subsystem's length. We establish a connection with symmetry-protected topological order in equilibrium at zero temperature and study the melting of the order induced either by a (symmetry-breaking) rotation of the initial state or by an increase of the temperature.

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Section: Discussionmentioning

confidence: 66%

Nonequilibrium symmetry-protected topological order: Emergence of semilocal Gibbs ensembles

Fagotti,

Marić,

Zadnik

2024

Phys. Rev. B

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“…This motivates the study of selected integrable models with even simpler dynamics, where there is some interaction in the system, nevertheless closed form results can be derived for the real time evolution of certain physical quantities. Such models include the Rule54 cellular automaton [12][13][14][15][16][17], the box-ball systems [10,18,19], classical cellular automata of the XXC type [9,[20][21][22][23][24], nontrivial strong coupling limits of known models [25][26][27] including the folded XXZ model [28][29][30][31], or quantum circuits that are both integrable and dual-unitary [32]. A common property of these models is that the scattering of the particles (either classical or quantum) is rather simple compared to a generic integrable model.…”

Section: Introductionmentioning

confidence: 99%

Sublattice entanglement in an exactly solvable anyonlike spin ladder

Pozsgay

Hutsalyuk²,

Pristyák³

et al. 2022

Phys. Rev. E

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We introduce an integrable spin ladder model and study its exact solution, correlation functions, and entanglement properties. The model supports two particle types (corresponding to the even and odd sub-lattices), such that the scattering phases are constants: particles of the same type scatter as free fermions, whereas the inter-particle phase shift is a constant tuned by an interaction parameter. Therefore, the spin ladder bears similarities with anyonic models. We present exact results for the spectrum and correlation functions, and we study the sub-lattice entanglement by numerical means.

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Measurement catastrophe and ballistic spread of charge density with vanishing current

Cited by 2 publications

References 47 publications

Nonequilibrium symmetry-protected topological order: Emergence of semilocal Gibbs ensembles

Nonequilibrium symmetry-protected topological order: Emergence of semilocal Gibbs ensembles

Sublattice entanglement in an exactly solvable anyonlike spin ladder

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