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Topological sound in two dimensions

Simon Yves, Xiang Ni, Andrea Alù

2022Annals of the New York Academy of Sciences17 citationsDOIOpen Access PDF

Abstract

Topology is the branch of mathematics studying the properties of an object that are preserved under continuous deformations. Quite remarkably, the powerful theoretical tools of topology have been applied over the past few years to study the electronic band structure of crystals. Topological band theory can explain and predict topological phase transitions in a material, and the unusual robustness of certain band structure shapes, such as Dirac cones, against small perturbations. These findings have also unveiled a new phase of matter-topological insulators-whose exotic transport properties at their boundaries are topologically protected against imperfections and disorder. The fascinating features of topological boundary states have triggered the search for their analogs in classical wave physics. Here, we focus on the peculiar features of two-dimensional topological insulators for sound and mechanical waves. Two-dimensional Dirac cones and phononic topological insulators can emerge under certain conditions in periodic acoustic metamaterials, demonstrating great potential for acoustic and mechanical systems to demonstrate, over a tabletop platform, complex fundamental phenomena driven by topological concepts. In addition, these discoveries offer a direct path toward new technologies for enhanced sound control and manipulation.

Topics & Concepts

Topological insulatorTopology (electrical circuits)PhysicsAcoustic metamaterialsMetamaterialDirac (video compression format)Theoretical physicsQuantum mechanicsMathematicsCombinatoricsNeutrinoTopological Materials and PhenomenaAcoustic Wave Phenomena ResearchMetamaterials and Metasurfaces Applications
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