Abstract:
Given a finite dimensional C *-Hopf algebra H and its dual Ĥ we construct the infinite crossed product and study its superselection sectors in the framework of algebraic quantum field theory. is the observable algebra of a generalized quantum spin chain with H-order and Ĥ-disorder symmetries, where by a duality transformation the role of order and disorder may also appear interchanged. If is a group algebra then becomes an ordinary G-spin model. We classify all DHR-sectors of – relative to some Haag dual vacuum representation – and prove that their symmetry is described by the Drinfeld double . To achieve this we construct localized coactions and use a certain compressibility property to prove that they are universal amplimorphisms on . In this way the double can be recovered from the observable algebra as a universal cosymmetry.
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Received: 4 September 1995\,/\,Accepted: 3 December 1996
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Nill, F., Szlachányi, K. Quantum Chains of Hopf Algebras with Quantum Double Cosymmetry . Comm Math Phys 187, 159–200 (1997). https://doi.org/10.1007/s002200050132
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DOI: https://doi.org/10.1007/s002200050132