A Kazhdan-Lusztig correspondence for $L_{-\frac{3}{2}}(\mathfrak{sl}_3)$

Abstract: The abelian and monoidal structure of the category of smooth weight modules over a non-integrable affine vertex algebra of rank greater than one is an interesting, difficult and essentially wide open problem. Even conjectures are lacking. This work details and tests such a conjecture for L − 3 2 (sl3) via a logarithmic Kazhdan-Lusztig correspondence.We first investigate the representation theory of U H i (sl3), the unrolled restricted quantum group of sl3 at fourth root of unity. In particular, we analyse its … Show more

“…Unfortunately, the structure of the known logarithmic L k (𝔰𝔩 3 )-modules remains mysterious -even their composition factors are unknown. However, a companion paper to this one [48] combines the results presented here with a conjectural logarithmic Kazhdan-Lusztig correspondence to posit not only composition factors but also complete Loewy diagrams and fusion rules (but only in the special case k = − 3 2 ). In this context, the work reported here represents an important part of a rapidly advancing program to understand the representation theory and modularity of higher-rank affine vertex operator algebras and W-algebras.…”

“…A closely related remark is that the Grothendieck fusion ring presented here has a one-dimensional representation which is constant on the D 6 -and spectral flow orbits, but otherwise takes the values This is also addressed in the companion paper [48] where the existence of a Kazhdan-Lusztig-type correspondence is discussed. This correspondence takes the form of a (conjectural) tensor equivalence between the category 𝒲 3,2 of weight A 2 (3, 2)-modules (with finite-dimensional weight spaces) and an appropriate modification of the category of ADMISSIBLE-LEVEL 𝔰𝔩 3 MINIMAL MODELS 35 finite-dimensional modules over a certain quantum group 𝑈 𝐻 𝑞 (𝔰𝔩 3 ) at 𝑞 = 𝔦.…”

“…These 𝐵 𝑄 (𝑝)-algebras are related to (higher-rank) singlet algebras by a parafermionic coset construction [55,76] and thence to triplet algebras. (This is discussed in more detail in the companion paper [48].) We mention that the automorphism groups of the corresponding triplet algebras are PSL 2 (ℂ) and PSL 3 (ℂ), respectively, which may be ultimately responsible for the appearance of adjoint weights in (5.54).…”

“…In fact, the 𝔰𝔩 3 minimal model A 2 (3, 2) is closely related to several other interesting logarithmic vertex operator algebras including the 𝑁 = 4 superconformal minimal model with 𝑐 = −9 [54], the Feigin-Tipunin algebra 𝑊 0 𝐴 2 (2) [55] and Semikhatov's octuplet algebra 𝑊 𝐴 2 (2) [56]. Further details concerning these relations may be found in the companion paper [48].…”

“…We shall not pursue the structures of these reducible but indecomposable A 2 (3, 2)-module here, though their existence is clear. Instead, we refer to a companion paper [48] in which conjectures for these structures are presented.…”

Admissible-level $$\mathfrak {sl}_3$$ minimal models

“…Unfortunately, the structure of the known logarithmic L k (𝔰𝔩 3 )-modules remains mysterious -even their composition factors are unknown. However, a companion paper to this one [48] combines the results presented here with a conjectural logarithmic Kazhdan-Lusztig correspondence to posit not only composition factors but also complete Loewy diagrams and fusion rules (but only in the special case k = − 3 2 ). In this context, the work reported here represents an important part of a rapidly advancing program to understand the representation theory and modularity of higher-rank affine vertex operator algebras and W-algebras.…”

“…A closely related remark is that the Grothendieck fusion ring presented here has a one-dimensional representation which is constant on the D 6 -and spectral flow orbits, but otherwise takes the values This is also addressed in the companion paper [48] where the existence of a Kazhdan-Lusztig-type correspondence is discussed. This correspondence takes the form of a (conjectural) tensor equivalence between the category 𝒲 3,2 of weight A 2 (3, 2)-modules (with finite-dimensional weight spaces) and an appropriate modification of the category of ADMISSIBLE-LEVEL 𝔰𝔩 3 MINIMAL MODELS 35 finite-dimensional modules over a certain quantum group 𝑈 𝐻 𝑞 (𝔰𝔩 3 ) at 𝑞 = 𝔦.…”

“…These 𝐵 𝑄 (𝑝)-algebras are related to (higher-rank) singlet algebras by a parafermionic coset construction [55,76] and thence to triplet algebras. (This is discussed in more detail in the companion paper [48].) We mention that the automorphism groups of the corresponding triplet algebras are PSL 2 (ℂ) and PSL 3 (ℂ), respectively, which may be ultimately responsible for the appearance of adjoint weights in (5.54).…”

“…In fact, the 𝔰𝔩 3 minimal model A 2 (3, 2) is closely related to several other interesting logarithmic vertex operator algebras including the 𝑁 = 4 superconformal minimal model with 𝑐 = −9 [54], the Feigin-Tipunin algebra 𝑊 0 𝐴 2 (2) [55] and Semikhatov's octuplet algebra 𝑊 𝐴 2 (2) [56]. Further details concerning these relations may be found in the companion paper [48].…”

“…We shall not pursue the structures of these reducible but indecomposable A 2 (3, 2)-module here, though their existence is clear. Instead, we refer to a companion paper [48] in which conjectures for these structures are presented.…”

Admissible-level $$\mathfrak {sl}_3$$ minimal models