On the extension of stringlike localised sectors in 2+1 dimensions
Abstract: In the framework of algebraic quantum field theory, we study the category \Delta_BFA of stringlike localised representations of a net of observables O \mapsto A(O) in three dimensions. It is shown that compactly localised (DHR) representations give rise to a non-trivial centre of \Delta_BFA with respect to the braiding. This implies that \Delta_BFA cannot be modular when non-trival DHR sectors exist. Modular tensor categories, however, are important for topological quantum computing. For this reason, we discuss a method to remove this obstruction to modularity. Indeed, the obstruction can be removed by passing from the observable net A(O) to the Doplicher-Roberts field net F(O). It is then shown that sectors of A can be extended to sectors of the field net that commute with the action of the corresponding symmetry group. Moreover, all such sectors are extensions of sectors of A. Finally, the category \Delta_BFF of sectors of F is studied by investigating the relation with the categorical crossed product of \Delta_BFA by the subcategory of DHR representations. Under appropriate conditions, this completely determines the category \Delta_BFF.
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