Topological phase transition independent of system non-Hermiticity

Zhang, K. L.; Wu, Han‐Qing; Jin, Lin; Song, Z.

doi:10.1103/physrevb.100.045141

Cited by 51 publications

(24 citation statements)

References 170 publications

(196 reference statements)

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“…In the topological classification discussed in Refs. [36], the NH chiral-symmetric Hamiltonians are discussed and the topological invariant and bulk-boundary correspondence has been established [36,71]. They can also be considered in the framework of pseudo-Hermitian Hamiltonians because iH k is a pseudo-Hermitian matrix.…”

mentioning

confidence: 99%

Hidden Chern number in one-dimensional non-Hermitian chiral-symmetric systems

Brzezicki

Hyart

2019

Phys. Rev. B

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We consider a class of one-dimensional non-Hermitian models with a special type of a chiral symmetry which is related to pseudo-Hermiticity. We show that the topology of a Hamiltonian belonging to this symmetry class is determined by a hidden Chern number described by an effective 2D Hermitian Hamiltonian H eff (k, η), where η is the imaginary part of the energy. This Chern number manifests itself as topologically protected in-gap end states at zero real part of the energy. We show that the bulk-boundary correspondence coming from the hidden Chern number is robust and immune to non-Hermitian skin effect. We introduce a minimal model Hamiltonian supporting topologically nontrivial phases in this symmetry class, derive its topological phase diagram and calculate the end states originating from the hidden Chern number.

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confidence: 99%

Hidden Chern number in one-dimensional non-Hermitian chiral-symmetric systems

Brzezicki

Hyart

2019

Phys. Rev. B

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“…The linking number associated with this phase is L = 0 and the band is topologically trivial. Notably, the anti-PT -symmetric coupling induces the topological phase transition at the EP, which dramatically differs from the topological phase transitions in other non-Hermitian systems with PTsymmetric gain and loss [28][29][30][31][32][33][34], as well as in non-Hermitian systems with asymmetric coupling strengths [54][55][56][57][58][59], where topological phase transition is irrelevant to the EP. Counterintuitively, increasing the dissipation can create nontrivial topology instead of behaving destructively: more dissipation reduces the strength of the anti-PT -symmetric coupling, tying vector field link and increasing the linking number.…”

Section: Linking Topologymentioning

confidence: 76%

“…Photonic crystal is an excellent platform for the study of topological physics [6]. The non-Hermitian quasicrystal [21,22], high-order topological phase [23][24][25][26][27], robust edge state [28][29][30][31][32][33][34][35][36], and topological lasing [37][38][39][40][41][42][43] in photonic crystals were discovered. Here, we consider a photonic crystal lattice as schematically illustrated in Fig.…”

Section: Dissipative Photonic Crystal Latticementioning

confidence: 99%

Untying links through anti-parity-time-symmetric coupling

Yang

Jin

et al. 2020

Phys. Rev. B

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We reveal how the vector field links are untied under the influence of anti-parity-time-symmetric couplings in a dissipative sublattice-symmetric topological photonic crystal lattice. The topology of the quasi-one-dimensional two-band system is encoded in the geometric topology of the vector fields associated with the Bloch Hamiltonian. The linked vector fields reflect the topology of the nontrivial phase. The topological phase transition occurs concomitantly with the untying of the vector field link at the exceptional points. Counterintuitively, more dissipation constructively creates a nontrivial topology. The linking number predicts the number of topological photonic zero modes.

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“…[ 18 ] It was found that non‐Hermitian Aharonov–Bohm effect is essential for the validation of conventional bulk‐boundary correspondence in non‐Hermitian realm, and the inversion or combined inversion symmetry is critical for restoring conventional bulk‐boundary correspondence. [ 40–42 ] The topology of real‐energy gapless phase resulting from exceptional point has been discussed in ref. [43].…”

Section: Introductionmentioning

confidence: 99%

Topological Phase Transition of Non‐Hermitian Crosslinked Chain

Zhao

Chen

2020

Annalen der Physik

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Non-Hermiticity enriches the contents of topological classification of matter including exceptional points, bulk-edge correspondence and skin effect. Gain and loss can be described by imaginary diagonal elements in Hamiltonians and the topological phase transition for a crosslinked chain in the presence of such non-Hermiticity is investigated in this work. We obtain the phase diagram in term of a winding number analytically. The boundaries of the phases coincide with the surfaces of exceptional points in the parameter space. The topologically original edge states locating mainly at the joints between domains of different phases hold on even for the long chain. The non-Hermitian topological feature can also be reflected by vortex structures in the vector fields of complex eigenenergies and expected values of Pauli matrices or the trajectories of these quantities. This model can be implemented in coupled waveguides or photonic crystals. And the edge states are immune to various kinds of disorders until the topological phase transition occurs. This work benefits our insight into the influence of gain and loss on the topological phase of matter. arXiv:1907.07924v1 [cond-mat.mes-hall]

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Topological phase transition independent of system non-Hermiticity

Cited by 51 publications

References 170 publications

Hidden Chern number in one-dimensional non-Hermitian chiral-symmetric systems

Hidden Chern number in one-dimensional non-Hermitian chiral-symmetric systems

Untying links through anti-parity-time-symmetric coupling

Topological Phase Transition of Non‐Hermitian Crosslinked Chain

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