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Liouvillian skin effect in a one-dimensional open many-body quantum system with generalized boundary conditions

Liang Mao, Xuanpu Yang, Ming‐Jie Tao, Haiping Hu, Lei Pan

2024Physical review. B./Physical review. B17 citationsDOI

Abstract

The non-Hermitian skin effect, in which eigenstates of non-Hermitian Hamiltonians are localized at one boundary in the open boundary condition, has attracted great interest recently. In this paper, we investigate the skin effect in one-dimensional dissipative quantum many-body systems, which we call the Liouvillian skin effect (LSE). We rigorously identify the existence of the LSE for generalized boundary conditions by solving the Liouvillian superoperator of an exactly solvable model with the advantage of the Bethe ansatz. The LSE is sensitive to boundary conditions where the signature is reflected in eigenfunctions of the system. We confirm that the LSE is fragile to a tiny coflow boundary hopping with non-Hermitian current but can survive a counterflow boundary hopping in the thermodynamic limit. Our work provides a prototypical example of exactly solvable dissipative quantum many-body lattice systems exhibiting the LSE for generalized boundary conditions. It can be further extended to other integrable open quantum many-body models.

Topics & Concepts

Bethe ansatzEigenfunctionHermitian matrixIntegrable systemDissipative systemPhysicsQuantumBoundary value problemBoundary (topology)Lattice (music)AnsatzEigenvalues and eigenvectorsMathematical physicsMany-body problemQuantum mechanicsMathematicsMathematical analysisAcousticsQuantum Mechanics and Non-Hermitian PhysicsQuantum chaos and dynamical systemsQuantum, superfluid, helium dynamics
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