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Weyl points and topological surface states in a three-dimensional sandwich-type elastic lattice

Sai Sanjit Ganti, Ting-Wei Liu, Fabio Semperlotti

2020New Journal of Physics19 citationsDOIOpen Access PDF

Abstract

Abstract Following the realization of Weyl semimetals in quantum electronic materials, classical wave analogues of Weyl materials have also been theorized and experimentally demonstrated in photonics and acoustics. Weyl points in elastic systems, however, have been a much more recent discovery. In this study, we report on the design of an elastic fully-continuum three-dimensional material that, while offering structural and load-bearing functionalities, is also capable of Weyl degeneracies and surface topologically-protected modes in a way completely analogous to its quantum mechanical counterpart. The topological characteristics of the lattice are obtained by ab initio numerical calculations without employing any further simplifications. The results clearly characterize the topological structure of the Weyl points and are in full agreement with the expectations of surface topological modes. Finally, full field numerical simulations are used to confirm the existence of surface states and to illustrate their extreme robustness towards lattice disorder and defects.

Topics & Concepts

PhysicsLattice (music)QuantumSurface (topology)Surface statesWeyl semimetalTheoretical physicsQuantum mechanicsTopology (electrical circuits)Realization (probability)Topological quantum numberCondensed matter physicsTopological entropy in physicsClassical mechanicsQuantum opticsQuantum stateLattice constantFermionWave functionTopological Materials and Phenomena2D Materials and ApplicationsGraphene research and applications
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