Quantized electric multipole insulators
TLDR
This work introduces a paradigm in which “nested” Wilson loops give rise to topological invariants that have been overlooked and opens a venue for the expansion of the classification of topological phases of matter.Abstract:
The Berry phase provides a modern formulation of electric polarization in crystals. We extend this concept to higher electric multipole moments and determine the necessary conditions and minimal models for which the quadrupole and octupole moments are topologically quantized electromagnetic observables. Such systems exhibit gapped boundaries that are themselves lower-dimensional topological phases. Furthermore, they host topologically protected corner states carrying fractional charge, exhibiting fractionalization at the boundary of the boundary. To characterize these insulating phases of matter, we introduce a paradigm in which “nested” Wilson loops give rise to topological invariants that have been overlooked. We propose three realistic experimental implementations of this topological behavior that can be immediately tested. Our work opens a venue for the expansion of the classification of topological phases of matter.read more
Citations
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Higher-order topology and corner triplon excitations in two-dimensional quantum spin-dimer models
TL;DR: In this article, the authors consider 2D quantum paramagnets formed by interacting spin dimers with dispersive triplet excitations and propose two examples of such dimer models, where the spin-gapped bosonic triplon excitations are shown to host bands with nontrivial higher order topology.
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Connecting Higher-Order Topology with the Orbital Hall Effect in Monolayers of Transition Metal Dichalcogenides.
Marcio Costa,Bruno Focassio,Luis M. Canonico,Tarik P. Cysne,Gabriel R. Schleder,R. B. Muniz,Adalberto Fazzio,Tatiana G. Rappoport +7 more
TL;DR: In this article , the authors explore the correlation between higher-order topological insulators and orbital Hall effects in transition metal dichalcogenides (TMDs) in two structural phases.
Wannier topology and quadrupole moments for a generalized Benalcazar-Bernevig-Hughes model
TL;DR: In this paper , a special separable and chiral-symmetric model with a quantized quadrupole moment, extending the Benalcazar-Bernevig-Hughes model, is analyzed.
Journal ArticleDOI
A compact and stable incidence-plane-rotating second harmonics detector
S. H. Kim,Soon-Wook Jung,B. Seok,Y. S. Kim,H. Park,T. Otsu,Yohei Kobayashi,Changyoung Kim,Yukiaki Ishida +8 more
TL;DR: In this article, a compact and stable setup for detecting the optical second harmonics, in which the incident plane rotates with respect to the sample, is described, and the setup is composed of rotating Fresnel-rhomb optics and a femtosecond ytterbium-doped fiber-laser source.
References
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New Method for High-Accuracy Determination of the Fine-Structure Constant Based on Quantized Hall Resistance
TL;DR: In this article, the Hall voltage of a two-dimensional electron gas, realized with a silicon metal-oxide-semiconductor field effect transistor, was measured and it was shown that the Hall resistance at particular, experimentally well-defined surface carrier concentrations has fixed values which depend only on the fine-structure constant and speed of light, and is insensitive to the geometry of the device.
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TL;DR: A two-dimensional condensed-matter lattice model is presented which exhibits a nonzero quantization of the Hall conductance in the absence of an external magnetic field, and exhibits the so-called "parity anomaly" of (2+1)-dimensional field theories.
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Maximally localized generalized Wannier functions for composite energy bands
Nicola Marzari,David Vanderbilt +1 more
TL;DR: In this paper, a method for determining the optimally localized set of generalized Wannier functions associated with a set of Bloch bands in a crystalline solid is presented, which is suitable for use in connection with conventional electronic-structure codes.
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Theory of polarization of crystalline solids
TL;DR: It is shown that physically $\ensuremath{\Delta}P can be interpreted as a displacement of the center of charge of the Wannier functions.
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