Ze‐Guo Chen scite author profile

Topological insulators first observed in electronic systems have inspired many analogues in photonic and phononic crystals in which remarkable one-way propagation edge states are supported by topologically nontrivial band gaps. Such band gaps can be achieved by breaking the time-reversal symmetry to lift the degeneracy associated with Dirac cones at the corners of the Brillouin zone. Here, we report on our construction of a phononic crystal exhibiting a Dirac-like cone in the Brillouin zone center. We demonstrate that simultaneously breaking the time-reversal symmetry and altering the geometric size of the unit cell result in a topological transition that we verify by the Chern number calculation and edge-mode analysis. We develop a complete model based on the tight binding to uncover the physical mechanisms of the topological transition. Both the model and numerical simulations show that the topology of the band gap is tunable by varying both the velocity field and the geometric size; such tunability may dramatically enrich the design and use of acoustic topological insulators.

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Pseudo-time-reversal symmetry and topological edge states in two-dimensional acoustic crystals

Mei

Chen

2016

Sci Rep

125

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We propose a simple two-dimensional acoustic crystal to realize topologically protected edge states for acoustic waves. The acoustic crystal is composed of a triangular array of core-shell cylinders embedded in a water host. By utilizing the point group symmetry of two doubly degenerate eigenstates at the Γ point, we can construct pseudo-time-reversal symmetry as well as pseudo-spin states in this classical system. We develop an effective Hamiltonian for the associated dispersion bands around the Brillouin zone center, and find the inherent link between the band inversion and the topological phase transition. With numerical simulations, we unambiguously demonstrate the unidirectional propagation of acoustic edge states along the interface between a topologically nontrivial acoustic crystal and a trivial one, and the robustness of the edge states against defects with sharp bends. Our work provides a new design paradigm for manipulating and transporting acoustic waves in a topologically protected manner. Technological applications and devices based on our design are expected in various frequency ranges of interest, spanning from infrasound to ultrasound.

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Corner states in a second-order acoustic topological insulator as bound states in the continuum

et al. 2019

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A second order topological insulator is designed on a platform of a twodimensional (2D) square lattice with all coupling coefficients being positive. Simulated results show the existence of two types of nontrivial corner states in this system, with one type being identified as bound states in the continuum (BIC). The non-BIC corner states are also found by surrounding a nontrivial sample with a trivial one, and interestingly, these perfectly confined corner states can be gradually delocalized and merge into edge states by tuning the inter-system coupling coefficient. Both BIC and non-BIC corner states are originated from bulk dipole moments rather than the quantized quadrupole moments, with the corresponding topological invariant being the 2D Zak phase. Full wave simulations based on realistic acoustic waveguide structures are demonstrated. Our proposal provides an

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Acoustic cloaking by a near-zero-index phononic crystal

Zheng

et al. 2014

103

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Acoustic rainbow trapping by coiling up space

Chen

et al. 2014

Sci Rep

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We numerically realize the acoustic rainbow trapping effect by tapping an air waveguide with space-coiling metamaterials. Due to the high refractive-index of the space-coiling metamaterials, our device is more compact compared to the reported trapped-rainbow devices. A numerical model utilizing effective parameters is also calculated, whose results are consistent well with the direct numerical simulation of space-coiling structure. Moreover, such device with the capability of dropping different frequency components of a broadband incident temporal acoustic signal into different channels can function as an acoustic wavelength division de-multiplexer. These results may have potential applications in acoustic device design such as an acoustic filter and an artificial cochlea.

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Accidental degeneracy of double Dirac cones in a phononic crystal

Chen

et al. 2014

Sci Rep

100

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Artificial honeycomb lattices with Dirac cone dispersion provide a macroscopic platform to study the massless Dirac quasiparticles and their novel geometric phases. In this paper, a quadruple-degenerate state is achieved at the center of the Brillouin zone in a two-dimensional honeycomb lattice phononic crystal, which is a result of accidental degeneracy of two double-degenerate states. In the vicinity of the quadruple-degenerate state, the dispersion relation is linear. Such quadruple degeneracy is analyzed by rigorous representation theory of groups. Using method, a reduced Hamiltonian is obtained to describe the linear Dirac dispersion relations of this quadruple-degenerate state, which is well consistent with the simulation results. Near such accidental degeneracy, we observe some unique properties in wave propagating, such as defect-insensitive propagating character and the Talbot effect.

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Landau-Zener Transition in the Dynamic Transfer of Acoustic Topological States

Chen

Tang²,

Zhang³

et al. 2021

Phys. Rev. Lett.

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Three-Dimensional Acoustic Double-Zero-Index Medium with a Fourfold Degenerate Dirac-like Point

Chen

et al. 2020

Phys. Rev. Lett.

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We report a design and experimental realization of a three-dimensional (3D) acoustic double-zero-index medium (DZIM), whose effective mass density and compressibility are nearly zero simultaneously. The DZIM is constructed from a cubic lattice of three orthogonally-aligned metal rods in air. The combination of lattice symmetry and accidental degeneracy yields a four-fold degenerate point with conical dispersion at the Brillouin zone center, where the material becomes a 3D DZIM. Though occupying a finite volume, the 3D DZIM maintains the wave properties of a "void space" and enables rich applications. For demonstration, we fabricate an acoustic "periscope" by placing the designed 3D DZIM inside a 3D bending waveguide, and observe the unusual wave tunneling effect through this waveguide with undisturbed planar wavefront. Our findings establish a practical route to realize 3D DZIM as an effective acoustic "void space," which offers unprecedented opportunities for advanced sound manipulation.A wave propagating in a medium with one or more constitutive parameters vanishing does not accumulate any phase retardation. This characteristic can be leveraged for a number of unique wave functionalities such as wavefront engineering 1-10 , cloaking objects 8-14 , wave tunneling 15-23 , asymmetric transmission 24-26 and photonic/phononic doping [27][28][29][30][31][32] . A single-zero-index medium, with only one constitutive parameter near-zero, usually has a significant impedance mismatch with the background medium, which is undesirable for real applications. A double-zero-index medium (DZIM), with both constitutive parameters near-zero, can overcome this obstacle, owing to its finite-valued effective impedance 7-11 . In the past decade, various approaches have been proposed to

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Ze‐Guo Chen

Tunable Topological Phononic Crystals

Pseudo-time-reversal symmetry and topological edge states in two-dimensional acoustic crystals

Corner states in a second-order acoustic topological insulator as bound states in the continuum

Acoustic cloaking by a near-zero-index phononic crystal

Acoustic rainbow trapping by coiling up space

Accidental degeneracy of double Dirac cones in a phononic crystal

Landau-Zener Transition in the Dynamic Transfer of Acoustic Topological States

Three-Dimensional Acoustic Double-Zero-Index Medium with a Fourfold Degenerate Dirac-like Point

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