Trinion conformal blocks from topological strings

Abstract In this paper we investigate the relation between conformal blocks of Liouville CFT and the topological string partition functions of the rank one trinion theory T2. The partition functions exhibit jumps when passing from one chamber in the parameter space to another. Such jumps can be attributed to a change of the integration contour in the free field representation of Liouville conformal blocks. We compare the partition functions of the T2 theories representing trifundamental half hypermultiplets in N = 2, d = 4 field theories to the partition functions associated to bifundamental hypermultiplets. We find that both are related to the same Liouville conformal blocks up to inessential factors. In order to establish this picture we combine and compare results obtained using topological vertex techniques, matrix models and topological recursion. We furthermore check that the partition functions obtained by gluing two T2 vertices can be represented in terms of a four point Liouville conformal block. Our results indicate that the T2 vertex offers a useful starting point for developing an analog of the instanton calculus for SUSY gauge theories with trifundamental hypermultiplets.

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BPS Quivers of Five-Dimensional SCFTs, Topological Strings and q-Painlevé Equations

Annales Henri Poincaré ◽

10.1007/s00023-021-01034-3 ◽

2021 ◽

Author(s):

Giulio Bonelli ◽

Fabrizio Del Monte ◽

Alessandro Tanzini

Keyword(s):

Topological String ◽

Cluster Algebra ◽

Painlevé Equations ◽

Partition Functions ◽

Quantum Field Theories ◽

Particle Spectrum ◽

Yang Mills ◽

Painleve Equations ◽

Rank One ◽

Bilinear Equations

AbstractWe study the discrete flows generated by the symmetry group of the BPS quivers for Calabi–Yau geometries describing five-dimensional superconformal quantum field theories on a circle. These flows naturally describe the BPS particle spectrum of such theories and at the same time generate bilinear equations of q-difference type which, in the rank one case, are q-Painlevé equations. The solutions of these equations are shown to be given by grand canonical topological string partition functions which we identify with $$\tau $$ τ -functions of the cluster algebra associated to the quiver. We exemplify our construction in the case corresponding to five-dimensional SU(2) pure super Yang–Mills and $$N_f=2$$ N f = 2 on a circle.

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WESS-ZUMINO-WITTEN MODEL AS A THEORY OF FREE FIELDS

International Journal of Modern Physics A ◽

10.1142/s0217751x9000115x ◽

1990 ◽

Vol 05 (13) ◽

pp. 2495-2589 ◽

Cited By ~ 171

Author(s):

A. GERASIMOV ◽

A. MOROZOV ◽

M. OLSHANETSKY ◽

A. MARSHAKOV ◽

S. SHATASHVILI

Keyword(s):

Riemann Surfaces ◽

Central Charge ◽

Free Field ◽

Heisenberg Algebra ◽

Momentum Tensor ◽

Point Of View ◽

Special Role ◽

Field Representation ◽

Conformal Blocks ◽

Free Fields

The free field representation or "bosonization" rule1 for Wess-Zumino-Witten model (WZWM) with arbitrary Kac-Moody algebra and arbitrary central charge is discussed. Energy-momentum tensor, arising from Sugawara construction, is quadratic in the fields. In this way, all known formulae for conformal blocks and correlators may be easily reproduced as certain linear combinations of correlators of these free fields. Generalization to conformal blocks on arbitrary Riemann surfaces is straightforward. However, projection rules in the spirit of Ref. 2 are not specified. The special role of βγ systems is emphasized. From the mathematical point of view, the construction involved represents generators of Kac-Moody (KM) algebra in terms of generators of a Heisenberg one. If WZW Lagrangian is considered as d−1 of Kirillov form on an orbit of KM algebra,3 then the free fields of interest (i.e. generators of the Heisenberg algebra) diagonalize Kirillov form and the action. Reduction of KM algebra within the same construction should naturally lead to arbitrary coset models.

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Toda Conformal Blocks, Quantum Groups, and Flat Connections

Communications in Mathematical Physics ◽

10.1007/s00220-019-03617-y ◽

2019 ◽

Vol 375 (2) ◽

pp. 1117-1158

Author(s):

Ioana Coman ◽

Elli Pomoni ◽

Jörg Teschner

Keyword(s):

Moduli Spaces ◽

Free Field ◽

Field Theories ◽

Laurent Polynomials ◽

Field Representation ◽

Conformal Blocks ◽

Flat Connections ◽

Conformal Field ◽

The Matrix ◽

Elementary Operators

Abstract This paper investigates the relations between the Toda conformal field theories, quantum group theory and the quantisation of moduli spaces of flat connections. We use the free field representation of the $${{\mathcal {W}}}$$W-algebras to define natural bases for spaces of conformal blocks of the Toda conformal field theory associated to the Lie algebra $${\mathfrak {s}}{\mathfrak {l}}_3$$sl3 on the three-punctured sphere with representations of generic type associated to the three punctures. The operator-valued monodromies of degenerate fields can be used to describe the quantisation of the moduli spaces of flat $$\mathrm {SL}(3)$$SL(3)-connections. It is shown that the matrix elements of the monodromies can be expressed as Laurent polynomials of more elementary operators which have a simple definition in the free field representation. These operators are identified as quantised counterparts of natural higher rank analogs of the Fenchel–Nielsen coordinates from Teichmüller theory. Possible applications to the study of the non-Lagrangian SUSY field theories are briefly outlined.

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THE FREE FIELD REPRESENTATION OF SU(3) CONFORMAL FIELD THEORY

International Journal of Modern Physics A ◽

10.1142/s0217751x9300165x ◽

1993 ◽

Vol 08 (23) ◽

pp. 4031-4053

Author(s):

HOVIK D. TOOMASSIAN

Keyword(s):

Field Theory ◽

Conformal Field Theory ◽

Correlation Functions ◽

Free Field ◽

Field Representation ◽

Conformal Field ◽

Point Correlation

The structure of the free field representation and some four-point correlation functions of the SU(3) conformal field theory are considered.

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Free-field representation of permutation branes in Gepner models

Journal of Experimental and Theoretical Physics ◽

10.1134/s1063776106060045 ◽

2006 ◽

Vol 102 (6) ◽

pp. 902-919

Author(s):

S. E. Parkhomenko

Keyword(s):

Free Field ◽

Field Representation

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BRST COHOMOLOGY IN QUANTUM AFFINE ALGEBRA $U_q \left( {\widehat{sl_2 }} \right)$

Modern Physics Letters A ◽

10.1142/s0217732394001076 ◽

1994 ◽

Vol 09 (14) ◽

pp. 1253-1265 ◽

Cited By ~ 8

Author(s):

HITOSHI KONNO

Keyword(s):

Free Field ◽

Classical Case ◽

Explicit Construction ◽

Quantum Affine Algebra ◽

Affine Algebra ◽

Field Representation ◽

Highest Weight ◽

Brst Charge ◽

Brst Cohomology ◽

Highest Weight Representation

Using free field representation of quantum affine algebra [Formula: see text], we investigate the structure of the Fock modules over [Formula: see text]. The analysis is based on a q-analog of the BRST formalism given by Bernard and Felder in the affine Kac-Moody algebra [Formula: see text]. We give an explicit construction of the singular vectors using the BRST charge. By the same cohomology analysis as the classical case (q=1), we obtain the irreducible highest weight representation space as a non-trivial cohomology group. This enables us to calculate a trace of the q-vertex operators over this space.

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Extended Sugawara construction for the superalgebras SU(M+1‖N+1). I. Free-field representation and bosonization of super Kac-Moody currents

Physical Review D ◽

10.1103/physrevd.39.2971 ◽

1989 ◽

Vol 39 (10) ◽

pp. 2971-2986 ◽

Cited By ~ 15

Author(s):

P. Bouwknegt ◽

A. Ceresole ◽

J. G. McCarthy ◽

P. van Nieuwenhuizen

Keyword(s):

Free Field ◽

Field Representation

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THE $W^{(2)}_3$ CONFORMAL ALGEBRA AND THE BOUSSINESQ HIERARCHY

Modern Physics Letters A ◽

10.1142/s0217732391002827 ◽

1991 ◽

Vol 06 (26) ◽

pp. 2397-2409 ◽

Cited By ~ 11

Author(s):

P. MATHIEU ◽

W. OEVEL

Keyword(s):

Nonlinear Equations ◽

Poisson Structure ◽

Boussinesq Equation ◽

Free Field ◽

Conformal Algebra ◽

Integrable Hierarchy ◽

Classical Formula ◽

Field Representation ◽

Space And Time ◽

Time Variables

The classical [Formula: see text] algebra Polyakov is shown to be equivalent to the second Poisson structure of a new integrable hierarchy of nonlinear equations. The hierarchy is related to the Boussinesq hierarchy by interhcanging the roles of the space and time variables x and t in the Boussinesq equation. From this relation the Miura map, relating the new hierarchy to its modified version, can be derived systematically. It is found to be equivalent to the known free field representation of the [Formula: see text] algebra.

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