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Majorana corner states on the dice lattice

Narayan Mohanta, Rahul Soni, Satoshi Okamoto, Elbio Dagotto

2023Communications Physics15 citationsDOIOpen Access PDF

Abstract

Abstract Lattice geometry continues providing exotic topological phases in condensed matter physics. Exciting recent examples are the higher-order topological phases, manifesting via localized lower-dimensional boundary states. Moreover, flat electronic bands with a non-trivial topology arise in various lattices and can hold a finite superfluid density, bounded by the Chern number C . Here we consider attractive interaction in the dice lattice that hosts flat bands with C = ± 2 and show that the induced superconducting state exhibits a second-order topological phase with mixed singlet-triplet pairing. The second-order nature of the topological superconducting phase is revealed by the zero-energy Majorana bound states at the lattice corners. Hence, the topology of the normal state dictates the nature of the Majorana localization. These findings suggest that flat bands with a higher Chern number provide feasible platforms for inducing higher-order topological superconductivity.

Topics & Concepts

MAJORANAPhysicsTopology (electrical circuits)PairingSuperconductivityLattice (music)Topological orderBound stateCondensed matter physicsQuantum mechanicsTheoretical physicsQuantumMathematicsCombinatoricsAcousticsTopological Materials and PhenomenaAdvanced Condensed Matter PhysicsQuantum many-body systems
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