Litcius/Paper detail

Perovskite-type <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"><mml:msub><mml:mrow><mml:mi>YRh</mml:mi></mml:mrow><mml:mn>3</mml:mn></mml:msub><mml:mi mathvariant="normal">B</mml:mi></mml:math> with multiple types of nodal point and nodal line states

Feng Zhou, Chaoxi Cui, Jianhua Wang, Min-Quan Kuang, Tie Yang, Zhi‐Ming Yu, Xiaotian Wang, Gang Zhang, Zhenxiang Cheng

2021Physical review. B./Physical review. B20 citationsDOIOpen Access PDF

Abstract

Experimentally synthesized perovskite-type ${\mathrm{YRh}}_{3}\mathrm{B}$ with a $Pm\overline{3}m$ type structure was proposed as a topological material (TM) via first-principles calculations and the low-energy $k\ifmmode\cdot\else\textperiodcentered\fi{}p$ effective Hamiltonian, which has a quadratic contact triple point (QCTP) at point $\mathrm{\ensuremath{\Gamma}}$ and six pairs of open nodal lines (NLs) of the hybrid type. Clear surface states observed in the surface spectrum confirmed the topological states. When spin-orbit coupling was considered, the QCTP at $\mathrm{\ensuremath{\Gamma}}$ transferred to the quadratic-type Dirac nodal point (NP). Under $1%$ tetragonal strained lattice constants, ${\mathrm{YRh}}_{3}\mathrm{B}$ hosted richer topological states, including a quadratic-type twofold degenerate NP, six pairs of open NLs of the hybrid type, and two closed NLs of type I and hybrid type. Moreover, it was proved that the NLs of ${\mathrm{YRh}}_{3}\mathrm{B}$ at its strained lattice constants contain all types of band-crossing points (BCPs) (i.e., type I, type II, and critical type). Such rich types of NP and NL states in one compound make it potentially applicable for multifunctional electronic devices as well as an appropriate platform to study entanglement among topological states.

Topics & Concepts

Type (biology)Tetragonal crystal systemHamiltonian (control theory)Topology (electrical circuits)Degenerate energy levelsPhysicsAlgorithmCrystallographyQuantum mechanicsCombinatoricsCrystal structureMathematicsChemistryBiologyEcologyMathematical optimizationPerovskite Materials and Applications2D Materials and ApplicationsTopological Materials and Phenomena