Litcius/Paper detail

Unveiling the Stabilizer Group of a Matrix Product State

Guglielmo Lami, Mario Collura

2024Physical Review Letters36 citationsDOI

Abstract

We present a novel classical algorithm designed to learn the stabilizer group-namely, the group of Pauli strings for which a state is a ±1 eigenvector-of a given matrix product state (MPS). The algorithm is based on a clever and theoretically grounded biased sampling in the Pauli (or Bell) basis. Its output is a set of independent stabilizer generators whose total number is directly associated with the stabilizer nullity, notably a well-established nonstabilizer monotone. We benchmark our method on T-doped states randomly scrambled via Clifford unitary dynamics, demonstrating very accurate estimates up to highly entangled MPS with bond dimension χ∼10^{3}. Our method, thanks to a very favorable scaling O(χ^{3}), represents the first effective approach to obtain a genuine magic monotone for MPS, enabling systematic investigations of quantum many-body physics out of equilibrium.

Topics & Concepts

Stabilizer (aeronautics)Group (periodic table)Matrix (chemical analysis)Product (mathematics)State (computer science)Matrix product statePhysicsMatrix multiplicationMaterials scienceComputer scienceQuantum mechanicsMathematicsEngineeringQuantumAlgorithmGeometryComposite materialMechanical engineeringQuantum many-body systemsModel Reduction and Neural NetworksOpinion Dynamics and Social Influence