Rectangular W algebras and superalgebras and their representations

Self Cite

We examine rectangular W-algebras with so(M ) or sp(2M ) symmetry, which can be realized as the asymptotic symmetry of higher spin gravities with restricted matrix extensions. We compute the central charges of the algebras and the levels of so(M ) or sp(2M ) affine subalgebras by applying the Hamiltonian reductions of so or sp type Lie algebras. For simple cases with generators of spin up to two, we obtain their operator product expansions by requiring the associativity. We further claim that the W-algebras can be realized as the symmetry algebras of dual coset CFTs and provide several strong supports. The analysis can be regarded as a check of extended higher spin holographies including full quantum corrections. We also extend the analysis by introducing N = 1 supersymmetry. *

Section: Introductionmentioning

confidence: 70%

“…(A. 26) With this description, the subalgebras sp(2m) ⊗ ½ 2n+1|2n and ½ 2m ⊗ osp(2n + 1|2n) are manifestly realized. We principally embed osp(1|2) into the ½ 2m ⊗ osp(2n + 1|2n) algebra.…”

Section: Type Sp(2mn)mentioning

confidence: 99%

Rectangular W-algebras of types so(M) and sp(2M) and dual coset CFTs

Creutzig

Hikida

Uetoko

2019

Self Cite

“…It should be straightforward to find a proposal for all OPEs of W m|n×∞ by correctly recovering these (−1) # factors in the formulas of [48]. Algebras of type m|n = m|0 have been recently also studied in a different basis for example in [27,49,53,54] who used names rectangular W-algebras or W m+∞ . Furthermore, the algebra W 1+∞ is well-known to be isomorphic to the affine Yangian of gl(1) [16,28].…”

Section: Jhep01(2020)042mentioning

confidence: 99%

On extensions of $$ \mathfrak{gl}\widehat{\left(\left.m\right|n\right)} $$ Kac-Moody algebras and Calabi-Yau singularities

Rapčák

2020

We discuss a class of vertex operator algebras W m|n×∞ generated by a supermatrix of fields for each integral spin 1, 2, 3,. .. . The algebras admit a large family of truncations that are in correspondence with holomorphic functions on the Calabi-Yau singularity given by solutions to xy = z m w n. We propose a free-field realization of such truncations generalizing the Miura transformation for W N algebras. Relations in the ring of holomorphic functions lead to bosonization-like relations between different free-field realizations. The discussion provides a concrete example of a non-trivial interplay between vertex operator algebras, algebraic geometry and gauge theory.

“…It turns out that there is unique algebra (depending now on three parameters -the central charge c and the analogous parameter to λ as well as the matrix rank m) with this spin content. This algebra and its cousins were studied before in [22][23][24][25][26][27], where it was sometimes referred to as 'rectangular W-algebra'. Moreover, its geometric realizations are described in [28].…”

Section: Jhep12(2019)175mentioning

confidence: 99%

“…In this paper, we study a matrix-extended version of W 1+∞ [λ]. This algebra was studied previously in [23][24][25] and generalizations were considered in [26,27]. The purpose of this paper is to expose the structure of this algebra and to study its representation theory.…”

Section: Jhep12(2019)175mentioning

confidence: 99%

The matrix-extended $$ {\mathcal{W}}_{1+\infty } $$ algebra

Eberhardt

Procházka²

2019

We construct a quadratic basis of generators of matrix-extended W 1+∞ using a generalization of the Miura transformation. This makes it possible to conjecture a closed-form formula for the operator product expansions defining the algebra. We study truncations of the algebra. An explicit calculation at low levels shows that these are parametrized in a way consistent with the gluing description of the algebra. It is perhaps surprising that in spite of the fact that the algebras are rather complicated and non-linear, the structure of their truncations follows very simple gluing rules.