Litcius/Paper detail

Classification of Matrix-Product Unitaries with Symmetries

Zongping Gong, Christoph Sünderhauf, Norbert Schuch, J. I. Cirac

2020Physical Review Letters37 citationsDOIOpen Access PDF

Abstract

We prove that matrix-product unitaries with on-site unitary symmetries are completely classified by the (chiral) index and the cohomology class of the symmetry group G, provided that we can add trivial and symmetric ancillas with arbitrary on-site representations of G. If the representations in both system and ancillas are fixed to be the same, we can define symmetry-protected indices (SPIs) which quantify the imbalance in the transport associated to each group element and greatly refines the classification. These SPIs are stable against disorder and measurable in interferometric experiments. Our results lead to a systematic construction of two-dimensional Floquet symmetry-protected topological phases beyond the standard classification, and thus shed new light on understanding nonequilibrium phases of quantum matter.

Topics & Concepts

Homogeneous spaceSymmetry (geometry)PhysicsProduct (mathematics)Matrix (chemical analysis)Group (periodic table)Unitary stateSymmetry groupPure mathematicsTheoretical physicsMathematical physicsQuantum mechanicsMathematicsGeometryLawPolitical scienceComposite materialMaterials scienceQuantum many-body systemsTopological Materials and PhenomenaQuantum and electron transport phenomena
Classification of Matrix-Product Unitaries with Symmetries | Litcius