Litcius/Paper detail

Lindblad master equation approach to the topological phase transition in the disordered Su-Schrieffer-Heeger model

Andrea Nava, Gabriele Campagnano, Pasquale Sodano, Domenico Giuliano

2023Physical review. B./Physical review. B39 citationsDOI

Abstract

We use the Lindblad equation method to investigate the onset of a mobility edge and the topological phase transition in the disordered SSH chain connected to two external baths in the large bias limit. From the scaling properties of the nonequilibrium stationary current flowing across the system, we recover the localization/delocalization in the disordered chain. To probe the topological phase transition in the presence of disorder, we use the even-odd differential occupancy as a means to discriminate topologically trivial from topologically nontrival phases in the out-of-equilibrium system. Eventually, we argue how to generalize our method to other systems undergoing a topological phase transition in the presence of disorder.

Topics & Concepts

PhysicsPhase transitionChain (unit)Non-equilibrium thermodynamicsDelocalized electronPhase (matter)Limit (mathematics)Topology (electrical circuits)ScalingThermodynamic limitTopological orderStatistical physicsCondensed matter physicsQuantum mechanicsMathematicsQuantumGeometryMathematical analysisCombinatoricsQuantum many-body systemsTheoretical and Computational PhysicsQuantum and electron transport phenomena