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Matrix product operator algebras I

Autor(en): András Molnár, Alberto Ruiz de Alarcón, José Garre Rubio, Norbert Schuch, Juan Ignacio Cirac, David Perez-Garcia
Abstrakt: Matrix Product Operators (MPOs) are tensor networks representing operators acting on 1D systems. They model a wide variety of situations, including communication channels with memory effects, quantum cellular automata, mixed states in 1D quantum systems, or holographic boundary models associated to 2D quantum systems. A scenario where MPOs have proven particularly useful is to represent algebras of non-trivial symmetries. Concretely, the boundary of both symmetry protected and topologically ordered phases in 2D quantum systems exhibit symmetries in the form of MPOs.
In this paper, we develop a theory of MPOs as representations of algebraic structures. We establish a dictionary between algebra and MPO properties which allows to transfer results between both setups, covering the cases of pre-bialgebras, weak bialgebras, and weak Hopf algebras. We define the notion of pulling-through algebras, which abstracts the minimal requirements needed to define topologically ordered 2D tensor networks from MPO algebras. We show, as one of our main results, that any semisimple pivotal weak Hopf algebra is a pulling-trough algebra. We demonstrate the power of this framework by showing that they can be used to construct Kitaev's quantum double models for Hopf algebras solely from an MPO representation of the Hopf algebra, in the exact same way as MPO symmetries obtained from fusion categories can be used to construct Levin-Wen string-net models, and to explain all their topological features; it thus allows to describe both Kitaev and string-net models on the same formal footing.
Organisation(en): Institut für Mathematik, Quantenoptik, Quantennanophysik und Quanteninformation
Externe Organisation(en): Universidad Complutense De Madrid, Instituto de Ciencias Matemáticas, Max-Planck-Institut für Quantenoptik, Munich Center for Quantum Science and Technology (MCQST)
Seiten: 1-70
Publikationsdatum: 04-2022
ÖFOS 2012: 103036 Theoretische Physik, 103025 Quantenmechanik, 103019 Mathematische Physik
Link zum Portal: https://ucrisportal.univie.ac.at/de/publications/f7f9d7f3-82aa-47b3-832d-4ce31b2f535d