Entanglement Hamiltonian during a domain wall melting in the free Fermi chain

Rottoli, Federico; Scopa, Stefano; Calabrese, Pasquale

doi:10.1088/1742-5468/ac72a1

Cited by 17 publications

(17 citation statements)

References 112 publications

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“…Interchanging j → −j, one clearly arrives at the same definition of the weights as in (29) for the double interval. Hence, in the limit N → ∞, one has S(x i ) → 2π β (x) as well as C(x i ) → 0, perfectly reproducing the result (37) and (38) for the boundary Dirac theory with α = 0, π. The case 0 < α < π can also be studied on the lattice by introducing a chemical potential at the first site, i.e.…”

Section: J Stat Mech (2022) 083101supporting

confidence: 77%

“…For slowly varying inhomogeneities, the continuum entanglement Hamiltonian for a single interval can be obtained [36] via the curved-space CFT approach [37]. Recently it has been shown that the continuum limit can be generalized to recover the local terms for the domainwall melting problem [38]. It would be interesting to check whether this treatment could be extended to the bi-local terms in case of two intervals.…”

Section: Discussionmentioning

confidence: 99%

“…The result (45) already makes it clear that the relation between the half-chain problem and the double interval is completely analogous to the continuum case in section 5.1. However, it remains to understand the difference between the bi-local operators (38) and (7), by considering the continuum limit of H ± . We first apply the substitutions (21), where the left/right-moving fields are coupled via the boundary condition (36) at x = 0.…”

Section: J Stat Mech (2022) 083101mentioning

confidence: 99%

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Local and non-local properties of the entanglement Hamiltonian for two disjoint intervals

Eisler¹,

Tonni²,

Peschel³

2022

J. Stat. Mech.

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We consider free-fermion chains in the ground state and the entanglement Hamiltonian for a subsystem consisting of two separated intervals. In this case, one has a peculiar long-range hopping between the intervals in addition to the well-known and dominant short-range hopping. We show how the continuum expressions can be recovered from the lattice results for general filling and arbitrary intervals. We also discuss the closely related case of a single interval located at a certain distance from the end of a semi-infinite chain and the continuum limit for this problem. Finally, we show that for the double interval in the continuum a commuting operator exists which can be used to find the eigenstates.

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Section: J Stat Mech (2022) 083101supporting

confidence: 77%

Section: Discussionmentioning

confidence: 99%

Section: J Stat Mech (2022) 083101mentioning

confidence: 99%

See 1 more Smart Citation

Local and non-local properties of the entanglement Hamiltonian for two disjoint intervals

Eisler¹,

Tonni²,

Peschel³

2022

J. Stat. Mech.

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“…More recently, various inhomogeneous generalisations of (1) were studied in connection to inhomogeneous and time-dependent problems in TLLs, both in- [7][8][9][10][11][12][13] and out-of-equilibrium [8,[14][15][16][17][18][19][20][21][22][23][24], mainly aiming at describing gases in traps and their non-equilibrium dynamics (see Section V in Ref. [25] for a more comprehensive review of the literature).…”

Section: Introductionmentioning

confidence: 99%

Electrostatic solution of massless quenches in Luttinger liquids

et al. 2022

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The study of non-equilibrium dynamics of many-body systems after a quantum quench received a considerable boost and a deep theoretical understanding from the path integral formulation in imaginary time. However, the celebrated problem of a quench in the Luttinger parameter of a one dimensional quantum critical system (massless quench) has so far only been solved in the real-time Heisenberg picture. In order to bridge this theoretical gap and to understand on the same ground massive and massless quenches, we study the problem of a gaussian field characterized by a coupling parameter KK within a strip and a different one K_0K0 in the remaining two semi-infinite planes. We give a fully analytical solution using the electrostatic analogy with the problem of a dielectric material within a strip surrounded by an infinite medium of different dielectric constant, and exploiting the method of charge images. After analytic continuation, this solution allows us to obtain all the correlation functions after the quench within a path integral approach in imaginary time, thus recovering and generalizing the results in real time. Furthermore, this imaginary-time approach establishes a remarkable connection between the quench and the famous problem of the conductivity of a Tomonaga-Luttinger liquid coupled to two semi-infinite leads: the two are in fact related by a rotation of the spacetime coordinates.

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“…In this manuscript, we prepare an initial state with a domain wall localised at the defect and we let it melt. Without the defect, this is a protocol that has been studied intensively in the free fermionic literature [32][33][34][35][36][37][38][39][40][41][42][43][44][45] and it represents a case study for the application of hydrodynamics to non-equilibrium quantum systems (recently adapted also to interacting integrable models [46,47] with the generalised hydrodynamics formalism [48,49]). Anyhow, the presence of the defect is expected to alter dramatically the evolution at a qualitative level.…”

mentioning

confidence: 99%

Domain wall melting across a defect

Capizzi

Scopa

Rottoli

et al. 2023

EPL

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We study the melting of a domain wall in a free-fermionic chain with a localised impurity. We ﬁnd that the defect enhances quantum correlations in such a way that even the smallest scatterer leads to a linear growth of the entanglement entropy contrasting the logarithmic behaviour in the clean system. Exploiting the hydrodynamic approach and the quasiparticle picture, we provide exact predictions for the evolution of the entanglement entropy for arbitrary bipartitions. In particular, the steady production of pairs at the defect gives rise to non-local correlations among distant points. We also characterise the subleading logarithmic corrections, highlighting some universal features.

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Entanglement Hamiltonian during a domain wall melting in the free Fermi chain

Cited by 17 publications

References 112 publications

Local and non-local properties of the entanglement Hamiltonian for two disjoint intervals

Local and non-local properties of the entanglement Hamiltonian for two disjoint intervals

Electrostatic solution of massless quenches in Luttinger liquids

Domain wall melting across a defect

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