Proves equivalence (Rep^G(A))^G ≅ Rep(A^G) as balanced W*-tensor categories for general (not necessarily rational) conformal nets A with faithful finite group G action, generalizing the rational case and including balances.
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math.QA 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Rep^G(A) for a conformal net A with discrete group G action is canonically a G-crossed balanced W*-tensor category.
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Balanced tensor categories of representations of fixed-points conformal nets
Proves equivalence (Rep^G(A))^G ≅ Rep(A^G) as balanced W*-tensor categories for general (not necessarily rational) conformal nets A with faithful finite group G action, generalizing the rational case and including balances.
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Twisted representations of conformal nets and crossed balanced tensor categories
Rep^G(A) for a conformal net A with discrete group G action is canonically a G-crossed balanced W*-tensor category.