Virasoro constraint for Uglov matrix model

@article{Khlaif2022VirasoroCF,
  title={Virasoro constraint for Uglov matrix model},
  author={Osama Khlaif and Taro Kimura},
  journal={Journal of High Energy Physics},
  year={2022}
}
Abstract We study the root of unity limit of (q,t)-deformed Virasoro matrix models, for which we call the resulting model Uglov matrix model. We derive the associated Virasoro constraints on the partition function, and find agreement of the central charge with the expression obtained from the level-rank duality associated with the parafermion CFT. 
[PDF] Semantic Reader
1 Citations

One Citation

NSR singular vectors from Uglov polynomials
It was conjectured by Belavin et al. [J. High Energy Phys. 2013(3), 35] that bosonization of a singular vector (in the Neveu–Schwarz sector) of the [Formula: see text] super analog of the Virasoro

References

SHOWING 1-10 OF 46 REFERENCES
On the origin of Virasoro constraints in matrix model: lagrangian approach
q-Virasoro constraints in matrix models
A bstractThe Virasoro constraints play the important role in the study of matrix models and in understanding of the relation between matrix models and CFTs. Recently the localization calculations in
q-Virasoro/W algebra at root of unity and parafermions
Loop Equations and Virasoro Constraints in Non-perturbative 2-D Quantum Gravity
We give a derivation of the loop equation for two-dimensional gravity from the KdV equations and the string equation of the one matrix model. We find that the loop equation is equivalent to an
β-Ensembles for Toric Orbifold Partition Function
We investigate combinatorics of the instanton partition function for the generic four dimensional toric orbifolds. It is shown that the orbifold projection can be implemented by taking the
Integrability and matrix models
The theory of matrix models is reviewed from the point of view of its relation to integrable hierarchies. Discrete 1-matrix, 2-matrix, 'conformal' (multicomponent) and Kontsevich models are
2d–4d connection between q-Virasoro/W block at root of unity limit and instanton partition function on ALE space
Solving q-Virasoro constraints
AbstractWe show how q-Virasoro constraints can be derived for a large class of (q, t)-deformed eigenvalue matrix models by an elementary trick of inserting certain q-difference operators under the
Collective field theory, Calogero-Sutherland model and generalized matrix models
Holomorphic blocks and the 5d AGT correspondence
We review the holomorphic block factorisation of partition functions of supersymmetric theories on compact manifolds in various dimensions. We then show how to interpret 3d and 5d partition functions
...
...