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Dirac cones and chiral selection of elastic waves in a soft strip

Maxime Lanoy, Fabrice Lemoult, Antonin Eddi, Claire Prada

2020Proceedings of the National Academy of Sciences31 citationsDOIOpen Access PDF

Abstract

We study the propagation of in-plane elastic waves in a soft thin strip, a specific geometrical and mechanical hybrid framework which we expect to exhibit a Dirac-like cone. We separate the low frequencies guided modes (typically 100 Hz for a 1-cm-wide strip) and obtain experimentally the full dispersion diagram. Dirac cones are evidenced together with other remarkable wave phenomena such as negative wave velocity or pseudo-zero group velocity (ZGV). Our measurements are convincingly supported by a model (and numerical simulation) for both Neumann and Dirichlet boundary conditions. Finally, we perform one-way chiral selection by carefully setting the source position and polarization. Therefore, we show that soft materials support atypical wave-based phenomena, which is all of the more interesting as they make most of the biological tissues.

Topics & Concepts

Soft matterDirac (video compression format)STRIPSPhysicsSoft roboticsRealmSoft materialsClassical mechanicsNanotechnologyComputer scienceMaterials scienceQuantum mechanicsActuatorArtificial intelligenceEngineeringPolitical scienceNeutrinoChemical engineeringColloidLawNonlinear Photonic SystemsAdvanced Materials and MechanicsThermoelastic and Magnetoelastic Phenomena
Dirac cones and chiral selection of elastic waves in a soft strip | Litcius