Add to ORKGRecently, several new materials exhibiting massless Dirac fermions have been proposed. However, many of these do not have the typical graphene honeycomb lattice, which is often associated with Dirac cones. Here, we present a classification of these different two-dimensional Dirac systems based on the space groups, and discuss our findings within the context of a minimal two-band model. In particular, we show that the emergence of massless Dirac fermions can be attributed to the mirror symmetries of the materials. Moreover, we uncover several novel Dirac systems that have up to twelve inequivalent Dirac cones, and show that these can be realized in (twisted) bilayers. Hereby, we obtain systems with an emergent SU(2N) valley symmetry with N=1...
Dirac points lie at the heart of many fascinating phenomena in condensed matter physics, from massle...
© the Owner Societies 2015. In this work, the systems are constructed with the defect lines of B-B o...
金沢大学理工研究域数物科学系Two-dimensional hexagonal materials such as graphene and silicene have highly symmetri...
Recently, several new materials exhibiting massless Dirac fermions have been proposed. However, many...
Inspired by the great development of graphene, more and more research has been conducted to seek new...
The existence of Dirac cones in the band structure of two-dimensional materials accompanied by unpre...
The influence of lattice symmetry on the existence of Dirac cones was investigated for two distinct ...
A theoretical study is conducted to search for Dirac cones in two-dimensional carbon allotropes with...
We extend the physics of graphene to three dimensional systems by showing that Dirac points can exis...
We extend the physics of graphene to three dimensional systems by showing that Dirac points can exis...
We investigate the physical origin of the existence or absence of Dirac cones in graphynes by combin...
Here we present a short introduction into physics of Dirac materials. In particular we review main p...
We present a two-band model based on periodic Hückel theory, which is capable of predicting the exi...
We study theoretically two-dimensional single-crystalline sheets of semiconductors that form a honey...
We show how the two-dimensional Dirac oscillator model can describe some properties of electrons in...
Dirac points lie at the heart of many fascinating phenomena in condensed matter physics, from massle...
© the Owner Societies 2015. In this work, the systems are constructed with the defect lines of B-B o...
金沢大学理工研究域数物科学系Two-dimensional hexagonal materials such as graphene and silicene have highly symmetri...
Recently, several new materials exhibiting massless Dirac fermions have been proposed. However, many...
Inspired by the great development of graphene, more and more research has been conducted to seek new...
The existence of Dirac cones in the band structure of two-dimensional materials accompanied by unpre...
The influence of lattice symmetry on the existence of Dirac cones was investigated for two distinct ...
A theoretical study is conducted to search for Dirac cones in two-dimensional carbon allotropes with...
We extend the physics of graphene to three dimensional systems by showing that Dirac points can exis...
We extend the physics of graphene to three dimensional systems by showing that Dirac points can exis...
We investigate the physical origin of the existence or absence of Dirac cones in graphynes by combin...
Here we present a short introduction into physics of Dirac materials. In particular we review main p...
We present a two-band model based on periodic Hückel theory, which is capable of predicting the exi...
We study theoretically two-dimensional single-crystalline sheets of semiconductors that form a honey...
We show how the two-dimensional Dirac oscillator model can describe some properties of electrons in...
Dirac points lie at the heart of many fascinating phenomena in condensed matter physics, from massle...
© the Owner Societies 2015. In this work, the systems are constructed with the defect lines of B-B o...
金沢大学理工研究域数物科学系Two-dimensional hexagonal materials such as graphene and silicene have highly symmetri...