School of Mathematics and Statistics - Research Publications
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ItemNo Preview AvailableAdmissible-level sl3 minimal models(Springer Link, 2022-09-20)The first part of this work uses the algorithm recently detailed in Kawasetsu and Ridout (Commun Contemp Math 24:2150037, 2022. arXiv:1906.02935 [math.RT]) to classify the irreducible weight modules of the minimal model vertex operator algebra Lk(sl3) , when the level k is admissible. These are naturally described in terms of families parametrised by up to two complex numbers. We also determine the action of the relevant group of automorphisms of sl^ 3 on their isomorphism classes and compute explicitly the decomposition into irreducibles when a given family’s parameters are permitted to take certain limiting values. Along with certain character formulae, previously established in Kawasetsu (Adv Math 393:108079, 2021. arXiv:2003.10148 [math.RT]), these results form the input data required by the standard module formalism to consistently compute modular transformations and, assuming the validity of a natural conjecture, the Grothendieck fusion coefficients of the admissible-level sl3 minimal models. The second part of this work applies the standard module formalism to compute these explicitly when k=-32. This gives the first nontrivial test of this formalism for a nonrational vertex operator algebra of rank greater than 1 and confirms the expectation that the methodology developed here will apply in much greater generality.
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ItemNo Preview AvailableA Kazhdan–Lusztig Correspondence for L-32(sl3)(Springer Science and Business Media LLC, 2023-05-01)
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ItemModularity of Bershadsky-Polyakov minimal models(SPRINGER, 2022-06)Abstract The Bershadsky–Polyakov algebras are the original examples of nonregular W-algebras, obtained from the affine vertex operator algebras associated with $$\mathfrak {sl}_3$$ sl 3 by quantum Hamiltonian reduction. In Fehily et al. (Comm Math Phys 385:859–904, 2021), we explored the representation theories of the simple quotients of these algebras when the level $$\mathsf {k}$$ k is nondegenerate-admissible. Here, we combine these explorations with Adamović’s inverse quantum Hamiltonian reduction functors to study the modular properties of Bershadsky–Polyakov characters and deduce the associated Grothendieck fusion rules. The results are not dissimilar to those already known for the affine vertex operator algebras associated with $$\mathfrak {sl}_2$$ sl 2 , except that the role of the Virasoro minimal models in the latter is here played by the minimal models of Zamolodchikov’s $$\mathsf {W}_3$$ W 3 algebras.
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ItemNo Preview AvailableSingular vectors for the WN algebras(AMER INST PHYSICS, 2018-03)In this paper, we use free field realisations of the A-type principal, or Casimir, WN algebras to derive explicit formulae for singular vectors in Fock modules. These singular vectors are constructed by applying screening operators to Fock module highest weight vectors. The action of the screening operators is then explicitly evaluated in terms of Jack symmetric functions and their skew analogues. The resulting formulae depend on sequences of pairs of integers that completely determine the Fock module as well as the Jack symmetric functions.
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ItemNo Preview AvailableCosets, characters and fusion for admissible-level osp (1|2) minimal models(ELSEVIER, 2019-01)
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ItemModularity of logarithmic parafermion vertex algebras(SPRINGER, 2018-12)
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ItemNo Preview AvailableStaggered modules of N=2 superconformal minimal models(ELSEVIER, 2021-06)
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ItemBoundary algebras and Kac modules for logarithmic minimal models(ELSEVIER SCIENCE BV, 2015-10)
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ItemSuperconformal minimal models and admissible Jack polynomials(ACADEMIC PRESS INC ELSEVIER SCIENCE, 2017-07-09)
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