Exceptional non-Hermitian topological edge mode and its application to active matter

Sone, Kazuki; Ashida, Yuto; Sagawa, Takahiro

doi:10.1038/s41467-020-19488-0

Cited by 60 publications

(36 citation statements)

References 69 publications

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“…[69][70][71][72] discuss topology of interaction networks among strategies (i.e., interaction topology), it differs from the topology discussed in this paper. Thirdly, we note that EPs are also reported for active matters 73,74 . We would like to stress, however, that significance of this paper is to reveal the emergence of the EPs and how they affect the dynamics in systems of the evolutionary game theory which describes the population density of biological systems and human societies.…”

Section: Dynamical Properties and The Epmentioning

confidence: 69%

Non-Hermitian topology in rock–paper–scissors games

Yoshida

Mizoguchi

Hatsugai

2022

Sci Rep

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Non-Hermitian topology is a recent hot topic in condensed matters. In this paper, we propose a novel platform drawing interdisciplinary attention: rock–paper–scissors (RPS) cycles described by the evolutionary game theory. Specifically, we demonstrate the emergence of an exceptional point and a skin effect by analyzing topological properties of their payoff matrix. Furthermore, we discover striking dynamical properties in an RPS chain: the directive propagation of the population density in the bulk and the enhancement of the population density only around the right edge. Our results open new avenues of the non-Hermitian topology and the evolutionary game theory.

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Section: Dynamical Properties and The Epmentioning

confidence: 69%

Non-Hermitian topology in rock–paper–scissors games

Yoshida

Mizoguchi

Hatsugai

2022

Sci Rep

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“…The topological phases are classified by the presence or absence of symmetries, and non-Hermicity of Hamiltonians enrichs their symmetry class [10][11][12]. Moreover, non-Hermitian systems exhibit unique topological phenomena that have no counterpart in closed systems, non-Hermitian skin effects, and breakdown of the bulk-edge correspondence [13][14][15][16][17]. Non-Hermitian Hamiltonians describe certain types of open systems, for example, classical optical systems with gain and/or loss [18,19], or postselected open quantum systems [20][21][22].…”

Section: Introductionmentioning

confidence: 99%

Topological phases protected by shifted sublattice symmetry in dissipative quantum systems

Kawasaki¹,

Mochizuki²,

Obuse³

2022

Preprint

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Dissipative dynamics of quantum systems can be classified topologically based on the correspondence between the Lindbladian in the Gorini-Kossakowski-Sudarshan-Lindblad (GKSL) equation and the non-Hermitian Hamiltonian in the Schrödinger equation. While general non-Hermitian Hamiltonians are classified into 38 symmetry classes, the previous work shows that the Lindbladians are classified into 10 symmetry classes due to physical constraints. In this work, however, we unveil a topological classification of Lindbladians based on sublattice symmetry (SLS), which is not previously considered and can increase the number of symmetry classes for the Lindbladians. We introduce shifted SLS so that the Lindbladian can retain this symmetry and take on the same role of SLS for the topological classification. For verification, we construct a model of the dissipative quantum system retaining shifted SLS and confirm the presence of edge states protected by shifted SLS. Moreover, the relationship between the presence of shifted SLS protected edge states and dynamics of an observable quantity is also discussed.

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“…From a broad perspective, non-Hermitian topology influences a variety of fields in physics, including photonics [20][21][22], electrical circuits [23,24], quantum walks [25][26][27], and biological systems [28][29][30][31]. One of the promising applications of non-Hermitian topology is a topological laser [32][33][34][35][36] which amplifies the boundary modes. One can construct such topological laser by introducing judicious gain at the edge of the sample [33,34].…”

mentioning

confidence: 99%

“…One can construct such topological laser by introducing judicious gain at the edge of the sample [33,34]. Another route to realize a topological laser is an exceptional edge mode [36], which is protected by nontrivial topology around EPs in the edge band structure.…”

mentioning

confidence: 99%

“…Especially, topological lasers in three-dimensional systems are so far unexplored, while such extension is crucial to design a large-scale topological laser. Furthermore, topological lasers in two-dimensional systems have required judicious gains [33,34] or symmetries [11,35,36], which indicates their instability against noises that modify boundary configuration or break symme-tries. Thus, a three-dimensional topological laser without such restrictions will expand the potential of non-Hermitian devices.…”

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confidence: 99%

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Exceptional mode topological surface laser

Sone,

Ashida,

Sagawa

2021

Preprint

Self Cite

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Band topology has been studied as a design principle of realizing robust boundary modes. Here, by exploring non-Hermitian topology, we propose a three-dimensional topological laser that amplifies surface modes. The topological surface laser is protected by nontrivial topology around branchpoint singularities known as exceptional points. In contrast to two-dimensional topological lasers, the proposed three-dimensional setup can realize topological boundary modes without judicious gain at the edge or symmetry protection, which are thus robust against a broad range of disorders. We also propose a possible optical setup to experimentally realize the topological surface laser. Our results provide a general guiding principle to construct non-Hermitian topological devices in three-dimensional systems.

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Exceptional non-Hermitian topological edge mode and its application to active matter

Cited by 60 publications

References 69 publications

Non-Hermitian topology in rock–paper–scissors games

Non-Hermitian topology in rock–paper–scissors games

Topological phases protected by shifted sublattice symmetry in dissipative quantum systems

Exceptional mode topological surface laser

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