Quantum group approach to steady states of boundary-driven open quantum systems
Enej Ilievski, Bojan \v{Z}unkovi\v{c}
TL;DR
This paper develops a systematic quantum group-based method to construct steady states of boundary-driven open quantum systems, enabling new solutions and insights into integrable quantum chains with boundary dissipation.
Contribution
It introduces a quantum group approach for deriving steady states of open quantum chains, including new solutions for SU(N)-symmetric models and boundary conditions, extending previous methods.
Findings
Constructed steady state density operators using quantum Yang-Baxter solutions.
Derived known solutions for the anisotropic spin-1/2 Heisenberg chain from symmetry principles.
Generated new solutions for SU(N)-symmetric quantum gases with boundary dissipation.
Abstract
We present a systematic approach for constructing steady state density operators of Markovian dissipative evolution for open quantum chain models with integrable bulk interaction and boundary incoherent driving. The construction is based on fundamental solutions of the quantum Yang-Baxter equation pertaining to quantum algebra symmetries and their quantizations (q-deformations). In particular, we facilitate a matrix-product state description, by resorting to generic spin-s infinite-dimensional solutions associated with non-compact spins, serving as ancillary degrees of freedom. After formally deriving already known solutions for the anisotropic spin-1/2 Heisenberg chain from first symmetry principles, we obtain a class of solutions belonging to interacting quantum gases with SU(N)-symmetric Hamiltonians, using a restricted set of incoherent boundary jump processes, and point out how new…
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