Invertible Bimodule Categories and Generalized Schur Orthogonality

Bridgeman, Jacob C.; Lootens, Laurens; Verstraete, Frank

doi:10.1007/s00220-023-04781-y

Commun. Math. Phys.

2023

DOI: 10.1007/s00220-023-04781-y

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Invertible Bimodule Categories and Generalized Schur Orthogonality

Jacob C. Bridgeman

Laurens Lootens

Frank Verstraete

Abstract: The Schur orthogonality relations are a cornerstone in the representation theory of groups. We utilize a generalization to weak Hopf algebras to provide a new, readily verifiable condition on the skeletal data for deciding whether a given bimodule category is invertible and therefore defines a Morita equivalence. As a first application, we provide an algorithm for the construction of the full skeletal data of the invertible bimodule category associated to a given module category, which is obtained in a unitary… Show more

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Weak Hopf symmetry and tube algebra of the generalized multifusion string-net model

Jia,

Tan,

Kaszlikowski

2024

J. High Energ. Phys.

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We investigate the multifusion generalization of string-net ground states and lattice Hamiltonians, delving into their associated weak Hopf symmetries. For the multifusion string-net, the gauge symmetry manifests as a general weak Hopf algebra, leading to a reducible vacuum string label; the charge symmetry, serving as a quantum double of gauge symmetry, constitutes a connected weak Hopf algebra. This implies that the associated topological phase retains its characterization by a unitary modular tensor category (UMTC). The bulk charge symmetry can also be captured by a weak Hopf tube algebra. We offer an explicit construction of the weak Hopf tube algebra structure and thoroughly discuss its properties. The gapped boundary and domain wall models are extensively discussed, with these 1d phases characterized by unitary multifusion categories (UMFCs). We delve into the gauge and charge symmetries of these 1d phases, as well as the construction of the boundary and domain wall tube algebras. Additionally, we illustrate that the domain wall tube algebra can be regarded as a cross product of two boundary tube algebras. As an application of our model, we elucidate how to interpret the defective string-net as a restricted multifusion string-net.

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Weak Hopf symmetry and tube algebra of the generalized multifusion string-net model

Jia,

Tan,

Kaszlikowski

2024

J. High Energ. Phys.

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Bulk-to-boundary anyon fusion from microscopic models

Magdalena de la Fuente,

Eisert,

Bauer

2023

Journal of Mathematical Physics

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Topological quantum error correction based on the manipulation of the anyonic defects constitutes one of the most promising frameworks towards realizing fault-tolerant quantum devices. Hence, it is crucial to understand how these defects interact with external defects such as boundaries or domain walls. Motivated by this line of thought, in this work, we study the fusion events between anyons in the bulk and at the boundary in fixed-point models of 2 + 1-dimensional non-chiral topological order defined by arbitrary fusion categories. Our construction uses generalized tube algebra techniques to construct a bi-representation of bulk and boundary defects. We explicitly derive a formula to calculate the fusion multiplicities of a bulk-to-boundary fusion event for twisted quantum double models and calculate some exemplary fusion events for Abelian models and the (twisted) quantum double model of S3, the simplest non-Abelian group-theoretical model. Moreover, we use the folding trick to study the anyonic behavior at non-trivial domain walls between twisted S3 and twisted Z2 as well as Z3 models. A recurring theme in our construction is an isomorphism relating twisted cohomology groups to untwisted ones. The results of this work can directly be applied to study logical operators in two-dimensional topological error correcting codes with boundaries described by a twisted gauge theory of a finite group.

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Invertible Bimodule Categories and Generalized Schur Orthogonality

Cited by 2 publications

References 46 publications

Weak Hopf symmetry and tube algebra of the generalized multifusion string-net model

Weak Hopf symmetry and tube algebra of the generalized multifusion string-net model

Bulk-to-boundary anyon fusion from microscopic models

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