Topological Protection of Coherence in a Dissipative Environment

Abstract

One dimensional topological insulators are characterized by edge states with exponentially small energies. According to one generalization of topological phases to non-Hermitian systems, a finite system in a non-trivial topological phase displays surface states with exponentially long life times. In this work we explore the possibility of exploiting such non-Hermitian topological phases to enhance the quantum coherence of a fiducial qubit embedded in a dissipative environment. We first show that a network of qubits interacting with lossy cavities can be represented, in a suitable super-one-particle sector, by a non-Hermitian "Hamiltonian" of the desired form. We then study, both analytically and numerically, one-dimensional geometries with up to three sites per unit cell, and up to a topological winding number W=2. For finite-size systems the number of edge modes is a complicated function of W and the system size N. However we find that there are precisely W modes localized at one end of the chain. In such topological phases the quibt's coherence lifetime is exponentially large in the system size. We verify that, for W>1, at large times, the Lindbladian evolution is approximately a non-trivial unitary. For W=2 this results in Rabi-like oscillations of the qubit's coherence measure.