Litcius/Paper detail

Interplay between transport and quantum coherences in free fermionic systems

Tony Jin, Tristan Gautié, Alexandre Krajenbrink, Paola Ruggiero, Takato Yoshimura

2021Journal of Physics A Mathematical and Theoretical17 citationsDOIOpen Access PDF

Abstract

Abstract We study the quench dynamics in free fermionic systems in the prototypical bipartitioning protocol obtained by joining two semi-infinite subsystems prepared in different states, aiming at understanding the interplay between quantum coherences in space in the initial state and transport properties. Our findings reveal that, under reasonable assumptions, the more correlated the initial state, the slower the transport is. Such statement is first discussed at qualitative level, and then made quantitative by introducing proper measures of correlations and transport ‘speed’. Moreover, it is supported for fermions on a lattice by an exact solution starting from specific initial conditions, and in the continuous case by the explicit solution for a wider class of physically relevant initial states. In particular, for this class of states, we identify a function, that we dub transition map , which takes the value of the stationary current as input and gives the value of correlation as output, in a protocol-independent way. As an aside technical result, in the discrete case, we give an expression of the full counting statistics in terms of a continuous kernel for a general correlated domain wall initial state, thus extending the recent results in Moriya et al (2019 J. Stat. Mech. 2019 063105) on the one-dimensional XX spin chain.

Topics & Concepts

FermionPhysicsQuantumStatistical physicsLattice (music)Quantum mechanicsClass (philosophy)Kernel (algebra)Domain (mathematical analysis)Quantum systemSpace (punctuation)Spin (aerodynamics)MathematicsSteady state (chemistry)Theoretical physicsParameter spaceExact solutions in general relativityQuantum dynamicsInitial value problemQuantum statistical mechanicsStationary statePhase spaceState (computer science)Quantum many-body systemsQuantum and electron transport phenomenaPhysics of Superconductivity and Magnetism