Invariant Neural Network Ansatz for weakly symmetric Open Quantum Lattices

Abstract

We consider d-dimensional open quantum lattices whose time evolution is governed by a master equation which is weakly symmetric under the action of a finite group G that is a subgroup of all the possible permutations of the lattice sites. We show that, whenever the steady state is unique, one can introduce a neural network representation for the system density operator that explicitly accounts for the system symmetries and can be efficiently optimized by exploring only a relevant subspace of the parameter space. In particular, as a proof of principle, we demonstrate the validity of our approach by determining the steady state structure of the one dimensional dissipative XYZ model in the presence of a uniform magnetic field.

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