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

Ze‐Guo Chen, Weiyuan Tang, Ruo-Yang Zhang, Zhaoxian Chen, Guancong Ma

2021Physical Review Letters85 citationsDOIOpen Access PDF

Abstract

Topological notions in physics often emerge from adiabatic evolution of states. It not only leads to fundamental insight of topological protection but also provides an important approach for the study of higher-dimensional topological phases. In this work, we first demonstrate the transfer of topological boundary states (TBSs) across the bulk to the opposite boundary in an acoustic waveguide system. By exploring the finite-size induced minigap between two TBS bands, we unveil the quantitative condition for the breakdown of adiabaticity in the system by demonstrating the Landau-Zener transition with both theory and experiments. Our results not only serve as a foundation of future studies of dynamic state transfer but also inspire applications leveraging nonadiabatic transitions as a new degree of freedom.

Topics & Concepts

Topology (electrical circuits)Adiabatic processPhysicsTopological quantum numberTopological orderTopological degeneracySymmetry protected topological orderQuantum mechanicsQuantumMathematicsCombinatoricsTopological Materials and PhenomenaMechanical and Optical ResonatorsQuantum many-body systems
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