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Abstract Originating in the work of A. M. Semikhatov and D. Adamović, inverse reductions are embeddings involving W-algebras corresponding to the same Lie algebra but different nilpotent orbits. Here, we show that an inverse reduction embedding between the affine sl₍+₁ sl n + 1 vertex operator algebra and the minimal sl₍+₁ sl n + 1 W-algebra exists. This generalises the realisations for n=1, 2 n = 1, 2 in Adamović (Commun Math Phys 366: 1025–1067, 2019), Adamović (Math Ann 1–44, 2023). A similar argument is then used to show that inverse reduction embeddings exists between all hook-type sl₍+₁ sl n + 1 W-algebras, which includes the principal/regular, subregular, minimal sl₍+₁ sl n + 1 W-algebras, and the affine sl₍+₁ sl n + 1 vertex operator algebra. This generalises the regular-to-subregular inverse reduction of Fehily (Commun Contemp Math 2250049, 2022), and similarly uses free-field realisations and their associated screening operators.
Zachary Fehily (Fri,) studied this question.
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