Demonstrating Lattice-Symmetry-Protection in Topological Crystalline Superconductors

Abstract

We propose to study the lattice-symmetry protection of Majorana zero bound modes in topological crystalline superconductors (SCs). With an induced s-wave superconductivity in the (001)-surface of the topological crystalline insulator Pb1-xSnxTe, which has a C4 rotational symmetry, we show a new class of 2D topological SC with four Majorana modes obtained in each vortex core, while only two of them are protected by the cyclic symmetry. Furthermore, applying an in-plane external field can break the four-fold symmetry and lifts the Majorana modes to finite energy states in general. Surprisingly, we show that even the C4 symmetry is broken, two Majorana modes are restored exactly one time whenever the in-plane field varies π/2, i.e. 1/4-cycle in the direction. This novel phenomenon has a profound connection to the four-fold cyclic symmetry of the original crystalline SC and uniquely demonstrates the lattice-symmetry protection of the Majorana modes. We further generalize these results to the system with generic C2N symmetry, and show that the symmetry class of the topological crystalline SC can be demonstrated by the 2N times of restoration of two Majorana modes when the external symmetry-breaking field varies one cycle in direction.