Majorana edge modes in the Kitaev model


Autoria(s): Thakurathi, Manisha; Sengupta, K; Sen, Diptiman
Data(s)

2014

Resumo

We study the Majorana modes, both equilibrium and Floquet, which can appear at the edges of the Kitaev model on the honeycomb lattice. We first present the analytical solutions known for the equilibrium Majorana edge modes for both zigzag and armchair edges of a semi-infinite Kitaev model and chart the parameter regimes in which they appear. We then examine how edge modes can be generated if the Kitaev coupling on the bonds perpendicular to the edge is varied periodically in time as periodic delta-function kicks. We derive a general condition for the appearance and disappearance of the Floquet edge modes as a function of the drive frequency for a generic d-dimensional integrable system. We confirm this general condition for the Kitaev model with a finite width by mapping it to a one-dimensional model. Our numerical and analytical study of this problem shows that Floquet Majorana modes can appear on some edges in the kicked system even when the corresponding equilibrium Hamiltonian has no Majorana mode solutions on those edges. We support our analytical studies by numerics for a finite sized system which show that periodic kicks can generate modes at the edges and the corners of the lattice.

Formato

application/pdf

Identificador

http://eprints.iisc.ernet.in/49541/1/phy_rev-B_89_23_2014.pdf

Thakurathi, Manisha and Sengupta, K and Sen, Diptiman (2014) Majorana edge modes in the Kitaev model. In: PHYSICAL REVIEW B, 89 (23).

Publicador

AMER PHYSICAL SOC

Relação

http://dx.doi.org/10.1103/PhysRevB.89.235434

http://eprints.iisc.ernet.in/49541/

Palavras-Chave #Centre for High Energy Physics
Tipo

Journal Article

PeerReviewed