Robust gap closing and reopening in topological-insulator Josephson junctions

Abstract

In the seminal proposal by Fu and Kane, the superconducting proximity effect is used to realize topological superconductivity in the topological surface state (TSS) of a 3D topological insulator (TI). In a line Josephson junction made on the TI surface, the spin-momentum locking of the TSS guarantees the existence of a pair of spin-non-degenerate, perfectly transmitted Andreev modes. These modes lead to robust gap closing and parity alteration as a function of the superconducting phase difference across the junction. Here, we report the observation of the predicted gap closing at = (2n+1)π in a TI Josephson junction (n integer), where the local density of states is probed via tunnel contacts and is controlled by a flux loop. This phenomenon is robust for a wide range of chemical potentials, supporting its TSS origin. Under an applied perpendicular magnetic field, Josephson vortices form, making position-dependent. In this case, the gap closing occurs locally at the Josephson vortex cores where = (2n+1)π, which we also observe. Our results confirm the fundamental role of spin-momentum locking in the Andreev physics in the TSS, which implies that the observed gap closing and reopening has a topological nature.